# Chi square numpy.polyfit (numpy)

Could someone explain how to get Chi^2/doF using numpy.polyfit?

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Assume you have some data points

``````x = numpy.array([0.0, 1.0, 2.0, 3.0])
y = numpy.array([3.6, 1.3, 0.2, 0.9])
``````

To fit a parabola to those points, use `numpy.polyfit()`:

``````p = numpy.polyfit(x, y, 2)
``````

To get the chi-squared value for this fit, evaluate the polynomial at the `x` values of your data points, subtract the `y` values, square and sum:

``````chi_squared = numpy.sum((numpy.polyval(p, x) - y) ** 2)
``````

You can divide this number by the number of degrees of freedom if you like.

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Thank you very much, Sven Marnach. Your answer completely solves my question. – casper Mar 30 '11 at 15:24
@casper: Based on your comment above, please accept this answer :) – SabreWolfy Feb 17 '12 at 9:54
For reference: here unitary uncertainty is assumed. The formula for the chi_square having an array s with the uncertainty on the measure is chi_squared = numpy.sum(((numpy.polyval(p, x) - y)/s) ** 2) – Daniele Jun 11 '15 at 13:15