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I saw this algorithm in an answer to this question.

Does this correctly calculate standard deviation? Can someone walk me through why this works mathematically? Preferably working back from this formula:

enter image description here

public class Statistics {

    private int n;
    private double sum;
    private double sumsq;

    public void reset() {
        this.n = 0;
        this.sum = 0.0;
        this.sumsq = 0.0;
    }

    public synchronized void addValue(double x) {
        ++this.n;
        this.sum += x;
        this.sumsq += x*x;
    }

    public synchronized double calculateMean() {
        double mean = 0.0;
        if (this.n > 0) {
            mean = this.sum/this.n;
        }
        return mean;
    }

    public synchronized double calculateStandardDeviation() {
        double deviation = 0.0;
        if (this.n > 1) {
            deviation = Math.sqrt((this.sumsq - this.sum*this.sum/this.n)/(this.n-1));
        }
        return deviation;
    }
}
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closed as not a real question by woodchips, Maxim Krizhanovsky, DuckMaestro, Maerlyn, Ashwini Chaudhary Jun 2 '13 at 8:27

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2 Answers 2

up vote 2 down vote accepted

There is a proof on wikipedia at the start of the section I linked to.

enter image description here

By the way, I remember from somewhere that calculating this way can produce more error. As you can see this.sumsq can become huge. Whereas calculating the normal way always has smaller intermediate values.

Anyway, I do use this online calculation a lot, because most of the time error didn't matter that much.

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Bingo. If you do start caring about numerical stability, you might work out a two-step update; to get (k+1)Var<sub>k+1</sub> from k Var<sub>k</sub>, add (x<sub>k+1</sub> - mu<sub>k</sub>)<sup>2</sup> then work out an update so that you get the sum of squares of differences from the new mean instead of the old. –  tmyklebu Jun 2 '13 at 5:39
    
Not sure how I missed this on the wikipedia page, but this totally make sense. Thanks! –  kingbob939 Jun 2 '13 at 20:14

I believe population standard deviation would substitute N-1 for N in that formula, because there's one degree of freedom less when the mean is given. I'm not a statistician, so I don't have the proof.

The formula is correct - standard deviation is the square root of the mean variance.

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