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I have a simple problem to fit a straight line on log-log scale. My code is,

polycoeffs = scipy.polyfit(xdata, ydata, 1)
yfit = scipy.polyval(polycoeffs, xdata)
pylab.plot(xdata, ydata, 'k.')
pylab.plot(xdata, yfit, 'r-')

Now I need to plot fit line on log scale so I just change x and y axis,


then its not plotting correct fit line. So how can I change fit function (in log scale) so that it can plot fit line on log-log scale?

share|improve this question
I don't see any problem in your code. Are your ranges including the zero? In this case you cannot plot in log scale. Try to modify the ranges of the axes. – Ruggero Turra Sep 29 '12 at 9:41
up vote 2 down vote accepted


from scipy import polyfit
data = loadtxt("data.txt")
xdata,ydata = data[:,0],data[:,1]
xdata,ydata = zip(*sorted(zip(xdata,ydata))) # sorts the two lists after the xdata    

xd,yd = log10(xdata),log10(ydata)
polycoef = polyfit(xd, yd, 1)
yfit = 10**( polycoef[0]*xd+polycoef[1] )

share|improve this answer
Yes. I tried that option too but fit line is not different. Still problem there. – physics_for_all Sep 27 '12 at 14:29
It may be because you fit with a linear fit polyval(xdata,ydata,1). How does the theoretical fit looks like? And does it even looks okay in an ordinary plt.plot(...) – Daniel Thaagaard Andreasen Sep 27 '12 at 14:31
xdata= [2.55845319601,3.42711901085,5.3426745947,3.6095268123,4.2562007078,4.7455147894‌​1,4.74924625755,3.79708949677,3.91314611276,4.78042443192,2.93958035272,3.2102798‌​029,3.78540075621,4.79463055418,3.26432292903,2.53434657812,4.17502180186,3.88450‌​72931,2.5459527268,2.93449693734,2.80126746798,4.03149023239,4.59230662026,3.0585‌​9058784,6.6980093253,4.23015139045,4.24947012686,6.25955209328,6.04066595196,4.71‌​369938479,3.88714628311,3.54209919333,3.26209216123,2.54650573646,2.21561145226,2‌​.1101195414,2.27520552298,2.8226227057,1.80334547413,1.743133602,3.58106715145,3.‌​07269650714,2.70146456011] – physics_for_all Sep 27 '12 at 15:11
ydata=[2.13,0.6,0.31,0.47,0.51,0.43,0.61,1.68,0.51,0.41,2.36,8.22,0.86,0.47,0.7,‌​1.18,0.37,3.63,3.62,2.68,12.46,1.25,0.88,10.99,0.42,0.47,1.53,0.59,0.25,0.53,1.94‌​,5.15,8.81,1.69,17.04,7.62,14.03,0.84,16.59,12.66,1.34,1.0,6.14] – physics_for_all Sep 27 '12 at 15:12
Okay, I've tried to fit it now. The proble is that you are trying to fit with a linear fit with something that is only linear in a loglog scale. See my edited answer for how I did a loglog plot and so on – Daniel Thaagaard Andreasen Sep 27 '12 at 15:36

you want

log(y) = k log(x) + q, so

y = exp(k log(x) + q) = exp(k log(x)) * exp(q) = exp(log(x^k)) * exp(q) = A x^k

as you can see one requirement is y(0) = 0.

From the code point of view, you are plotting the fit function using only the x of the data, probably it is better to add points:

xfit = scipy.linspace(min(xdata), max(xdata), 50)
yfit = scipy.polyval(polycoeffs, xfit)
ax.plot(xfit, yfit, 'r-')
share|improve this answer
if my xdata are all negative values then how can I perform above fitting? I tried with 'symlog' but its not plotting the straight line. Do you know how to change linear fit function for symlog? – physics_for_all Oct 1 '12 at 9:44
what's the problem about negative value? The problem is if you intersect the zero – Ruggero Turra Oct 1 '12 at 13:21

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