# Fit a curve using matplotlib on loglog scale

I am plotting simple 2D graph using loglog function in python as follows,

``````plt.loglog(x,y,label='X vs Y);
``````

X and Y are both lists of floating numbers of `n` size

I want to fit a line on same graph, I tried numpy.polyfit , but I am going nowhere,

How to fit a line using polyfit if your graph is already in loglog scale ?

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Can you show us what you have tried? – tcaswell Sep 12 '13 at 14:50

Numpy doesn't care what the axes of your matplotlib graph are.

I presume that you think `log(y)` is some polynomial function of `log(x)`, and you want to find that polynomial? If that is the case, then run `numpy.polyfit` on the logarithms of your data set:

``````import numpy as np
logx = np.log(x)
logy = np.log(y)
coeffs = np.polyfit(logx,logy,deg=3)
poly = np.poly1d(coeffs)
``````

`poly` is now a polynomial in `log(x)` that returns `log(y)`. To get the fit to predict `y` values, you can define a function that just exponentiates your polynomial:

``````yfit = lambda x: np.exp(poly(np.log(x))
``````

You can now plot your fitted line on your matplotlib `loglog` plot:

``````plt.loglog(x,yfit(x)))
``````

And show it like this

``````plt.show()
``````
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Thanks, I need to go through the basic of polynomial fitting, i was having trouble with coeff and yfit – pradeep Sep 13 '13 at 17:40
So here we took a 3rd degree polynomial in log x that fits with log y. and then calculated new values of y taking exponential of f(logx). I plotted using ax.plot so not on log scale. It actually worked on my data. But I don't get why? – Pretty Mar 6 '14 at 20:03
@Pretty I am not sure I understand your comment. You fitted a polynomial to (log(x), log(y)) data and then plotted x vs. y? Why would you expect that not to work? If log(y) = P(log(x)), where P is some polynomial, then y = exp(P(log(x)) = yfit(x), by definition of yfit. Plotting plt.plot(x,yfit(x)) will show a good fit, provided P itself is a good fit for the logs of the data. – Pascal Bugnion Mar 11 '14 at 14:57