# Normalize vector by zero

I am working on designing a new sensor, and so I have a vector of measured values and a vector of truth values. To represent error, it's simply `measured - truth`. Since there's a lot of variation in the truth, I would like to represent the normalized error. My initial thought would be `error./truth` to get percent error, but there are many cases where my truth value is zero! Can anyone think of a better way to represent the normalized data while avoiding the divide-by-zero? I'm working in Matlab, though the question is a bit language-agnostic as well.

PS, feel free to push this to another stackexchange if you think it's better suited

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Try `error = (measured-truth)/norm2(truth)` for each vector.

Where `norm2()` is the forbenious norm.

``````norm2(x) =SQRT( SUM( x[i]^2, i=1..N ) )
``````

This can only fail is all the values of `truth` are zero. You can mitigate this by adding a small positive number like `1e-12` to the norm, or to avoid the division when the norm is less than a threshold number.

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All this really does is scale all of my values by the same number. I want to somehow scale each measured point by it's corresponding truth point. –  David K Apr 26 '13 at 15:24
Well, if your truth point can be `0`, you can't always get what you want. So, try and spend some time rethinking what you actually need... –  comingstorm Apr 27 '13 at 0:30
@DavidK - Do not do that. It will be far to unstable and the error estimates will be way off. It is best to normalize the differences against a standard value (either typical, or norm2() or a max(), or arbitrary). –  ja72 Apr 27 '13 at 13:04