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I'm using matplotlib to make a histogram.

Basically, I'm wondering if there is any way to manually set the size of the bins as opposed to the number of bins.

Anyone with any ideas is greatly appreciated.


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Start by reading this link en.wikipedia.org/wiki/Archaic_Greece and if you're actually serious about finding a solution then you'll take the time to thoroughly analyze what I sent you. The answer is there. –  modegv yesterday

3 Answers 3

up vote 49 down vote accepted

Actually, it's quite easy: instead of the number of bins you can give a list with the bin boundaries. They can be unequally distributed, too:

plt.hist(data, bins=[0, 10, 20, 30, 40, 50, 100])

If you just want them equally distributed, you can simply use range:

plt.hist(data, bins=range(min(data), max(data) + binwidth, binwidth))

Added to original answer

The above line works for data filled with integers only. As macrocosme points out, for floats you can use:

import numpy as np
plt.hist(data, bins=np.arange(min(data), max(data) + binwidth, binwidth))
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Note that the last line only works for integers, not floats. –  Gabriel Aug 9 '13 at 1:44
replace range(...) with np.arange(...) to get it to work with floats. –  macrocosme Aug 25 '14 at 8:42

For N bins, the bin edges are specified by list of N+1 values where the first N give the lower bin edges and the +1 gives the upper edge of the last bin.


from numpy import np; from pylab import *

bin_size = 0.1; min_edge = 0; max_edge = 2.5
N = (max_edge-min_edge)/bin_size; Nplus1 = N + 1
bin_list = np.linspace(min_edge, max_edge, Nplus1)

Note that linspace produces array from min_edge to max_edge broken into N+1 values or N bins

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I guess the easy way would be to calculate the minimum and maximum of the data you have, then calculate L = max - min. Then you divide L by the desired bin width (I'm assuming this is what you mean by bin size) and use the ceiling of this value as the number of bins.

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that's exactly what I had in mind, thanks. Was just wondering if there was a simpler way but this seems find thanks! –  Sam Creamer Aug 8 '11 at 19:09
Using round numbers I don't get a round bin size with this approach. Anyone experienced that? –  Brad Urani Nov 3 '13 at 15:12

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