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I'm trying to do a little bit of distribution plotting and fitting in Python using SciPy for stats and matplotlib for the plotting. I'm having good luck with some things like creating a histogram:

seed(2)
alpha=5
loc=100
beta=22
data=ss.gamma.rvs(alpha,loc=loc,scale=beta,size=5000)
myHist = hist(data, 100, normed=True)

enter image description here

Brilliant!

I can even take the same gamma parameters and plot the line function of the probability distribution function (after some googling):

rv = ss.gamma(5,100,22)
x = np.linspace(0,600)
h = plt.plot(x, rv.pdf(x))

enter image description here

How would I go about plotting the histogram myHist with the PDF line h superimposed on top of the histogram? I'm hoping this is trivial, but I have been unable to figure it out.

4

3 Answers 3

20

just put both pieces together.

import scipy.stats as ss
import numpy as np
import matplotlib.pyplot as plt
alpha, loc, beta=5, 100, 22
data=ss.gamma.rvs(alpha,loc=loc,scale=beta,size=5000)
myHist = plt.hist(data, 100, normed=True)
rv = ss.gamma(alpha,loc,beta)
x = np.linspace(0,600) 
h = plt.plot(x, rv.pdf(x), lw=2)
plt.show()

enter image description here

to make sure you get what you want in any specific plot instance, try to create a figure object first

import scipy.stats as ss
import numpy as np
import matplotlib.pyplot as plt
# setting up the axes
fig = plt.figure(figsize=(8,8))
ax  = fig.add_subplot(111)
# now plot
alpha, loc, beta=5, 100, 22
data=ss.gamma.rvs(alpha,loc=loc,scale=beta,size=5000)
myHist = ax.hist(data, 100, normed=True)
rv = ss.gamma(alpha,loc,beta)
x = np.linspace(0,600)
h = ax.plot(x, rv.pdf(x), lw=2)
# show
plt.show()
1
  • 3
    the problem I was running into was that I am using ipython notebook so I'd run one plot, it would plot interactively then I would do some stuff and plot another, and it would end up in a new plot. Thanks for helping me figure this out!
    – JD Long
    Jul 3, 2012 at 21:08
10

One could be interested in plotting the distibution function of any histogram. This can be done using seaborn kde function

import numpy as np # for random data
import pandas as pd  # for convinience
import matplotlib.pyplot as plt  # for graphics
import seaborn as sns  # for nicer graphics

v1 = pd.Series(np.random.normal(0,10,1000), name='v1')
v2 = pd.Series(2*v1 + np.random.normal(60,15,1000), name='v2')

# plot a kernel density estimation over a stacked barchart
plt.figure()
plt.hist([v1, v2], histtype='barstacked', normed=True);
v3 = np.concatenate((v1,v2))
sns.kdeplot(v3);
plt.show()

enter image description here from a coursera course on data visualization with python

6

Expanding on Malik's answer, and trying to stick with vanilla NumPy, SciPy and Matplotlib. I've pulled in Seaborn, but it's only used to provide nicer defaults and small visual tweaks:

import numpy as np
import scipy.stats as sps
import matplotlib.pyplot as plt

import seaborn as sns
sns.set(style='ticks')

# parameterise our distributions
d1 = sps.norm(0, 10)
d2 = sps.norm(60, 15)

# sample values from above distributions
y1 = d1.rvs(300)
y2 = d2.rvs(200)
# combine mixture
ys = np.concatenate([y1, y2])

# create new figure with size given explicitly
plt.figure(figsize=(10, 6))

# add histogram showing individual components
plt.hist([y1, y2], 31, histtype='barstacked', density=True, alpha=0.4, edgecolor='none')

# get X limits and fix them
mn, mx = plt.xlim()
plt.xlim(mn, mx)

# add our distributions to figure
x = np.linspace(mn, mx, 301)
plt.plot(x, d1.pdf(x) * (len(y1) / len(ys)), color='C0', ls='--', label='d1')
plt.plot(x, d2.pdf(x) * (len(y2) / len(ys)), color='C1', ls='--', label='d2')

# estimate Kernel Density and plot
kde = sps.gaussian_kde(ys)
plt.plot(x, kde.pdf(x), label='KDE')

# finish up
plt.legend()
plt.ylabel('Probability density')
sns.despine()

gives us the following plot:

money shot

I've tried to stick with a minimal feature set while producing relatively nice output, notably using SciPy to estimate the KDE is very easy.

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