# Finding the smoothest 15% of a curve

What would be the best way to find the smoothest 15% of a curve similar to the one below?

I need to know the beginning and ending x coordinates. I have thought about using a derivative function, but this will give me a point with the smallest derivative, which may or may not always be part of the smoothest 15%.

Any algorithms I should look at or suggestions?

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According to which definition of smoothness? –  Ben Voigt Aug 24 '11 at 22:03
Define smooth (uh, uh ... bad memories coming back). –  Rook Aug 24 '11 at 22:04
It might help to show on the graph above what you would consider to be the "smoothest" part. –  Kyle Heironimus Aug 24 '11 at 22:14

Unless my memory of calc fails me even more than usual today, what you'd want here would be the second derivative.

Alternatively, you could just use a sliding window of the correct size, and compute the variance for the window at each position, and the one with the smallest variance should be the smoothest.

Of course, it also depends on how you define "smooth". Do you mean the smallest change in the Y value, or would (for example) the almost perfectly straight (but also nearly vertical) line at the lest qualify as "smooth"?

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Thanks. I went with computing the variance. It's a real time application. The idea behind the function is to filter out noise spikes in the data (which theoretically should be a constant value). Whether that qualifies as smooth, or if it's the best way to do this... That is a question I probably can't answer. –  drinck Aug 24 '11 at 23:10