# How to plot empirical CDF (ECDF)

How can I plot the empirical CDF of an array of numbers with Matplotlib in Python? I'm looking for the CDF analog of Pylab’s `hist` function.

One thing I can think of is:

``````from scipy.stats import cumfreq
a = array([...]) # my array of numbers
num_bins =  20
b = cumfreq(a, num_bins)
plt.plot(b)
``````

If you like `linspace` and prefer one-liners, you can do:

``````plt.plot(np.sort(a), np.linspace(0, 1, len(a), endpoint=False))
``````

Given my tastes, I almost always do:

``````# a is the data array
x = np.sort(a)
y = np.arange(len(x))/float(len(x))
plt.plot(x, y)
``````

Which works for me even if there are `>O(1e6)` data values. If you really need to downsample I'd set

``````x = np.sort(a)[::down_sampling_step]
``````

Edit to respond to comment/edit on why I use `endpoint=False` or the `y` as defined above. The following are some technical details.

The empirical CDF is usually formally defined as

``````CDF(x) = "number of samples <= x"/"number of samples"
``````

in order to exactly match this formal definition you would need to use `y = np.arange(1,len(x)+1)/float(len(x))` so that we get `y = [1/N, 2/N ... 1]`. This estimator is an unbiased estimator that will converge to the true CDF in the limit of infinite samples Wikipedia ref..

I tend to use `y = [0, 1/N, 2/N ... (N-1)/N]` since:

(a) it is easier to code/more idiomatic,

(b) but is still formally justified since one can always exchange `CDF(x)` with `1-CDF(x)` in the convergence proof, and

(c) works with the (easy) downsampling method described above.

In some particular cases, it is useful to define

``````y = (arange(len(x))+0.5)/len(x)
``````

which is intermediate between these two conventions. Which, in effect, says "there is a `1/(2N)` chance of a value less than the lowest one I've seen in my sample, and a `1/(2N)` chance of a value greater than the largest one I've seen so far.

Note that the selection of this convention interacts with the `where` parameter used in the `plt.step` if it seems more useful to display the CDF as a piecewise constant function. In order to exactly match the formal definition mentioned above, one would need to use `where=pre` the suggested `y=[0,1/N..., 1-1/N]` convention, or `where=post` with the `y=[1/N, 2/N ... 1]` convention, but not the other way around.

However, for large samples, and reasonable distributions, the convention is given in the main body of the answer is easy to write, is an unbiased estimator of the true CDF, and works with the downsampling methodology.

• This answer should receive more upvotes, since it is the only one so far that does not impose binning. I only simplified the code a little bit, using linspace. Commented Feb 20, 2014 at 9:56
• @hans_meine your edit, i.e. `yvals=linspace(0,1,len(sorted))`, produces `yvals` that are not an unbiased estimator of the true CDF.
– Dave
Commented Feb 20, 2014 at 13:03
• Then, we should've used linspace with `endpoint = False`, right? Commented Feb 21, 2014 at 11:49
• @Dave Would it be maybe better to use the plt.step instead of plt.plot? Are there any problems if we do so? Commented Aug 24, 2020 at 7:53
• @EzequielCastaño mostly I'd see that as a style thing, but you'd want to pay attention to the selection of the `where` parameter in relation to the definition of the `y` parameter. What makes most sense to me would be to use `where=pre` the suggested `y=np.arange(0,len(x))/len(x)`, or you could do `y=np.arange(1,len(x)+1)/len(x)` and to use `where=post`, but switching around the "where"'s between them would (ever so slightly) misrepresent the CDF.
– Dave
Commented Aug 24, 2020 at 14:19

You can use the `ECDF` function from the scikits.statsmodels library:

``````import numpy as np
import scikits.statsmodels as sm
import matplotlib.pyplot as plt

sample = np.random.uniform(0, 1, 50)
ecdf = sm.tools.ECDF(sample)

x = np.linspace(min(sample), max(sample))
y = ecdf(x)
plt.step(x, y)
``````

With version 0.4 `scicits.statsmodels` was renamed to `statsmodels`. `ECDF` is now located in the `distributions` module (while `statsmodels.tools.tools.ECDF` is depreciated).

``````import numpy as np
import statsmodels.api as sm # recommended import according to the docs
import matplotlib.pyplot as plt

sample = np.random.uniform(0, 1, 50)
ecdf = sm.distributions.ECDF(sample)

x = np.linspace(min(sample), max(sample))
y = ecdf(x)
plt.step(x, y)
plt.show()
``````
• @bmu (and @Luca): awesome; thank you for kindly making the code current with the current statsmodel!
– ars
Commented Jun 7, 2012 at 4:15
• For scikits.statsmodels v0.3.1 had to `import scikits.statsmodels.tools as smtools` and `ecdf = smtools.tools.EDCF(...)` Commented Aug 8, 2015 at 17:25
• This still imposes a binning through `x = np.linspace(…)`. You can bypass this by using `plt.step(ecdf.x,ecdf.y)`. Commented Jan 28, 2020 at 15:12
• In statsmodels v12.2 you can get ECDF from `from statsmodels.distributions.empirical_distribution import ECDF` (statsmodels.org/stable/generated/…) Commented Apr 10, 2021 at 14:57

That looks to be (almost) exactly what you want. Two things:

First, the results are a tuple of four items. The third is the size of the bins. The second is the starting point of the smallest bin. The first is the number of points in the in or below each bin. (The last is the number of points outside the limits, but since you haven't set any, all points will be binned.)

Second, you'll want to rescale the results so the final value is 1, to follow the usual conventions of a CDF, but otherwise it's right.

Here's what it does under the hood:

``````def cumfreq(a, numbins=10, defaultreallimits=None):
# docstring omitted
h,l,b,e = histogram(a,numbins,defaultreallimits)
cumhist = np.cumsum(h*1, axis=0)
return cumhist,l,b,e
``````

It does the histogramming, then produces a cumulative sum of the counts in each bin. So the ith value of the result is the number of array values less than or equal to the the maximum of the ith bin. So, the final value is just the size of the initial array.

Finally, to plot it, you'll need to use the initial value of the bin, and the bin size to determine what x-axis values you'll need.

Another option is to use `numpy.histogram` which can do the normalization and returns the bin edges. You'll need to do the cumulative sum of the resulting counts yourself.

``````a = array([...]) # your array of numbers
num_bins = 20
counts, bin_edges = numpy.histogram(a, bins=num_bins, normed=True)
cdf = numpy.cumsum(counts)
pylab.plot(bin_edges[1:], cdf)
``````

(`bin_edges[1:]` is the upper edge of each bin.)

• Just a quick note: this code doesn't actually give you the Empirical CDF (a step function increasing by 1/n at each of n datapoints). Instead, this code gives an estimate of the CDF based on a histogram-based estimate of the PDF. This histogram-based estimate can be manipulated/biased by careful/improper selection of the bins, so it's not as good a characterization of the true CDF as the actual ECDF. Commented May 23, 2012 at 2:02
• I also dislike the point that this imposes binning; see Dave's short answer, which simply uses `numpy.sort` for plotting the CDF without binning. Commented Feb 20, 2014 at 9:58

Have you tried the cumulative=True argument to pyplot.hist?

• Nice and easy option, but the downside is limited customization of the resulting line plot, e.g. couldn't figure out how to add markers. Went for `scikits.statsmodels` answer. Commented Aug 8, 2015 at 17:27

``````plt.plot(np.sort(arr), np.linspace(0, 1, len(arr), endpoint=False))
``````

Edit: this was also suggested by hans_meine in the comments.

Assuming that vals holds your values, then you can simply plot the CDF as follows:

``````y = numpy.arange(0, 101)
x = numpy.percentile(vals, y)
plot(x, y)
``````

To scale it between 0 and 1, just divide y by 100.

I have a trivial addition to AFoglia's method, to normalize the CDF

``````n_counts,bin_edges = np.histogram(myarray,bins=11,normed=True)
cdf = np.cumsum(n_counts)  # cdf not normalized, despite above
scale = 1.0/cdf[-1]
ncdf = scale * cdf
``````

Normalizing the histo makes its integral unity, which means the cdf will not be normalized. You've got to scale it yourself.

If you want to display the actual true ECDF (which as David B noted is a step function that increases 1/n at each of n datapoints), my suggestion is to write code to generate two "plot" points for each datapoint:

``````a = array([...]) # your array of numbers
sorted=np.sort(a)
x2 = []
y2 = []
y = 0
for x in sorted:
x2.extend([x,x])
y2.append(y)
y += 1.0 / len(a)
y2.append(y)
plt.plot(x2,y2)
``````

This way you will get a plot with the n steps that are characteristic of an ECDF, which is nice especially for data sets that are small enough for the steps to be visible. Also, there is no no need to do any binning with histograms (which risk introducing bias to the drawn ECDF).

We can just use the `step` function from `matplotlib`, which makes a step-wise plot, which is the definition of the empirical CDF:

``````import numpy as np
from matplotlib import pyplot as plt

data = np.random.randn(11)

levels = np.linspace(0, 1, len(data) + 1)  # endpoint 1 is included by default
plt.step(sorted(list(data) + [max(data)]), levels)
``````

The final vertical line at `max(data)` was added manually. Otherwise the plot just stops at level `1 - 1/len(data)`.

Alternatively we can use the `where='post'` option to `step()`

``````levels = np.linspace(1. / len(data), 1, len(data))
plt.step(sorted(data), levels, where='post')
``````

in which case the initial vertical line from zero is not plotted.

It's a one-liner in seaborn using the cumulative=True parameter. Here you go,

``````import seaborn as sns
sns.kdeplot(a, cumulative=True)
``````
• Note that this does give you the true ECDF, but a smoothed version thereof. Commented Sep 16, 2023 at 11:50

Although, there are many great answers here, though I would include a more customized ECDF plot

Generate values for the empirical cumulative distribution function

``````import matplotlib.pyplot as plt

def ecdf_values(x):
"""
Generate values for empirical cumulative distribution function

Params
--------
x (array or list of numeric values): distribution for ECDF

Returns
--------
x (array): x values
y (array): percentile values
"""

# Sort values and find length
x = np.sort(x)
n = len(x)
# Create percentiles
y = np.arange(1, n + 1, 1) / n
return x, y
``````
``````def ecdf_plot(x, name = 'Value', plot_normal = True, log_scale=False, save=False, save_name='Default'):
"""
ECDF plot of x

Params
--------
x (array or list of numerics): distribution for ECDF
name (str): name of the distribution, used for labeling
plot_normal (bool): plot the normal distribution (from mean and std of data)
log_scale (bool): transform the scale to logarithmic
save (bool) : save/export plot
save_name (str) : filename to save the plot

Returns
--------
none, displays plot

"""
xs, ys = ecdf_values(x)
fig = plt.figure(figsize = (10, 6))
ax = plt.subplot(1, 1, 1)
plt.step(xs, ys, linewidth = 2.5, c= 'b');

plot_range = ax.get_xlim()[1] - ax.get_xlim()[0]
fig_sizex = fig.get_size_inches()[0]
data_inch = plot_range / fig_sizex
right = 0.6 * data_inch + max(xs)
gap = right - max(xs)
left = min(xs) - gap

if log_scale:
ax.set_xscale('log')

if plot_normal:
gxs, gys = ecdf_values(np.random.normal(loc = xs.mean(),
scale = xs.std(),
size = 100000))
plt.plot(gxs, gys, 'g');

plt.vlines(x=min(xs),
ymin=0,
ymax=min(ys),
color = 'b',
linewidth = 2.5)

plt.xticks(size = 16)
plt.yticks(size = 16)
plt.xlabel(f'{name}', size = 18)
plt.ylabel('Percentile', size = 18)

plt.vlines(x=min(xs),
ymin = min(ys),
ymax=0.065,
color = 'r',
linestyle = '-',
alpha = 0.8,
linewidth = 1.7)

plt.vlines(x=max(xs),
ymin=0.935,
ymax=max(ys),
color = 'r',
linestyle = '-',
alpha = 0.8,
linewidth = 1.7)

plt.annotate(s = f'{min(xs):.2f}',
xy = (min(xs),
0.065),
horizontalalignment = 'center',
verticalalignment = 'bottom',
size = 15)
plt.annotate(s = f'{max(xs):.2f}',
xy = (max(xs),
0.935),
horizontalalignment = 'center',
verticalalignment = 'top',
size = 15)

ps = [0.25, 0.5, 0.75]

for p in ps:

ax.set_xlim(left = left, right = right)
ax.set_ylim(bottom = 0)

value = xs[np.where(ys > p)[0][0] - 1]
pvalue = ys[np.where(ys > p)[0][0] - 1]

plt.hlines(y=p, xmin=left, xmax = value,
linestyles = ':', colors = 'r', linewidth = 1.4);

plt.vlines(x=value, ymin=0, ymax = pvalue,
linestyles = ':', colors = 'r', linewidth = 1.4)

plt.text(x = p / 3, y = p - 0.01,
transform = ax.transAxes,
s = f'{int(100*p)}%', size = 15,
color = 'r', alpha = 0.7)

plt.text(x = value, y = 0.01, size = 15,
horizontalalignment = 'left',
s = f'{value:.2f}', color = 'r', alpha = 0.8);

# fit the labels into the figure
plt.title(f'ECDF of {name}', size = 20)
plt.tight_layout()

if save:
plt.savefig(save_name + '.png')

``````
``````ecdf_plot(np.random.randn(100), name='Normal Distribution', save=True, save_name="ecdf")
``````

• Nice program, but although the y-axis value specifies the level of a quantile/percentile (e.g. the "50%" of a 50th percentile), the quantile/percentile itself is the corresponding value on the x-axis. Thus, in an eCDF, the y-axis label is usually "Cumulative Probability" or "Percent". Commented May 16 at 21:57

Since Version 3.8.0, Matplotlib has a native method for plotting cumulative distribution functions:

``````import numpy as np
from matplotlib.pyplot import subplots

data = np.random.exponential(size=20)

fig,axes = subplots()
axes.ecdf(data)
axes.set_xlabel("my observable")
axes.set_ylabel("CDF")
``````

In contrast to `hist(…,cumulative=True)`, this does not rely on any spurious binning and uses an exact step plot.

What do you want to do with the CDF ? To plot it, that's a start. You could try a few different values, like this:

``````from __future__ import division
import numpy as np
from scipy.stats import cumfreq
import pylab as plt

hi = 100.
a = np.arange(hi) ** 2
for nbins in ( 2, 20, 100 ):
cf = cumfreq(a, nbins)  # bin values, lowerlimit, binsize, extrapoints
w = hi / nbins
x = np.linspace( w/2, hi - w/2, nbins )  # care
# print x, cf
plt.plot( x, cf[0], label=str(nbins) )

plt.legend()
plt.show()
``````

Histogram lists various rules for the number of bins, e.g. `num_bins ~ sqrt( len(a) )`.

(Fine print: two quite different things are going on here,

• binning / histogramming the raw data
• `plot` interpolates a smooth curve through the say 20 binned values.

Either of these can go way off on data that's "clumpy" or has long tails, even for 1d data -- 2d, 3d data gets increasingly difficult.

This is using bokeh

``````from bokeh.plotting import figure, show
from statsmodels.distributions.empirical_distribution import ECDF
ecdf = ECDF(pd_series)
p = figure(title="tests", tools="save", background_fill_color="#E8DDCB")
p.line(ecdf.x,ecdf.y)
show(p)
``````

(This is a copy of my answer to the question: Plotting CDF of a pandas series in python)

A CDF or cumulative distribution function plot is basically a graph with on the X-axis the sorted values and on the Y-axis the cumulative distribution. So, I would create a new series with the sorted values as index and the cumulative distribution as values.

First create an example series:

``````import pandas as pd
import numpy as np
ser = pd.Series(np.random.normal(size=100))
``````

Sort the series:

``````ser = ser.order()
``````

Now, before proceeding, append again the last (and largest) value. This step is important especially for small sample sizes in order to get an unbiased CDF:

``````ser[len(ser)] = ser.iloc[-1]
``````

Create a new series with the sorted values as index and the cumulative distribution as values

``````cum_dist = np.linspace(0.,1.,len(ser))
ser_cdf = pd.Series(cum_dist, index=ser)
``````

Finally, plot the function as steps:

``````ser_cdf.plot(drawstyle='steps')
``````

None of the answers so far covers what I wanted when I landed here, which is:

``````def empirical_cdf(x, data):
"evaluate ecdf of data at points x"
return np.mean(data[None, :] <= x[:, None], axis=1)
``````

It evaluates the empirical CDF of a given dataset at an array of points x, which do not have to be sorted. There is no intermediate binning and no external libraries.

An equivalent method that scales better for large x is to sort the data and use np.searchsorted:

``````def empirical_cdf(x, data):
"evaluate ecdf of data at points x"
data = np.sort(data)
return np.searchsorted(data, x)/float(data.size)
``````

In my opinion, none of the previous methods do the complete (and strict) job of plotting the empirical CDF, which was the asker's original question. I post my proposal for any lost and sympathetic souls.

My proposal has the following: 1) it considers the empirical CDF defined as in the first expression here, i.e., like in A. W. Van der Waart's Asymptotic statistics (1998), 2) it explicitly shows the step behavior of the function, 3) it explicitly shows that the empirical CDF is continuous from the right by showing marks to resolve discontinuities, 4) it extends the zero and one values at the extremes up to user-defined margins. I hope it helps someone:

``````def plot_cdf( data, xaxis = None, figsize = (20,10), line_style = 'b-',
ball_style = 'bo', xlabel = r"Random variable \$X\$", ylabel = "\$N\$-samples
empirical CDF \$F_{X,N}(x)\$" ):
# Contribution of each data point to the empirical distribution
weights = 1/data.size * np.ones_like( data )
# CDF estimation
cdf = np.cumsum( weights )
# Plot central part of the CDF
plt.figure( figsize = (20,10) )
plt.step( np.sort( a ), cdf, line_style, where = 'post' )
# Plot valid points at discontinuities
plt.plot( np.sort( a ), cdf, ball_style )
# Extract plot axis and extend outside the data range
if not xaxis == None:
(xmin, xmax, ymin, ymax) = plt.axis( )
xmin = xaxis[0]
xmax = xaxis[1]
plt.axis( [xmin, xmax, ymin, ymax] )
else:
(xmin,xmax,_,_) = plt.axis()
plt.plot( [xmin, a.min(), a.min()], np.zeros( 3 ), line_style )
plt.plot( [a.max(), xmax], np.ones( 2 ), line_style )
plt.xlabel( xlabel )
plt.ylabel( ylabel )
``````
• NameError: name 'a' is not defined Commented Mar 15 at 19:08
• Yes, it would seem I forgot to change every instance of `a` to `data` when writing it up to share. I hope that works out for you. Commented Mar 17 at 12:26

What I did to evaluate cdf for large dataset -

1. Find the unique values

unique_values = np.sort(pd.Series)

2. Make the rank array for these sorted and unique values in the dataset -

ranks = np.arange(0,len(unique_values))/(len(unique_values)-1)

3. Plot unique_values vs ranks

Example The code below plots the cdf of population dataset from kaggle -

``````us_census_data = pd.read_csv('acs2015_census_tract_data.csv')

population = us_census_data['TotalPop'].dropna()

## sort the unique values using pandas unique function
unique_pop = np.sort(population.unique())
cdf = np.arange(0,len(unique_pop),step=1)/(len(unique_pop)-1)

## plotting
plt.plot(unique_pop,cdf)
plt.show()
``````

• This can easily be done with `seaborn`, which is a high-level API for `matplotlib`.
• See How to use markers with ECDF plot for other options.
• It’s also possible to plot the empirical complementary CDF (1 - CDF) by specifying `complementary=True`.
• Tested in `python 3.11`, `pandas 1.5.2`, `matplotlib 3.6.2`, `seaborn 0.12.1`
``````import seaborn as sns
import matplotlib.pyplot as plt

species     island  bill_length_mm  bill_depth_mm  flipper_length_mm  body_mass_g     sex
0  Adelie  Torgersen            39.1           18.7              181.0       3750.0    Male
1  Adelie  Torgersen            39.5           17.4              186.0       3800.0  Female
2  Adelie  Torgersen            40.3           18.0              195.0       3250.0  Female

# plot ecdf
fig, (ax1, ax2) = plt.subplots(1, 2, figsize=(10, 4))

sns.ecdfplot(data=df, x='bill_length_mm', ax=ax1)
ax1.set_title('Without hue')

sns.ecdfplot(data=df, x='bill_length_mm', hue='species', ax=ax2)
ax2.set_title('Separated species by hue')
``````

### CDF: `complementary=True`

``````g = sns.displot(data=df, kind='ecdf', x='bill_length_mm', hue='species', col='island')
``````

``````g = sns.displot(data=df, kind='ecdf', y='bill_length_mm', hue='species', row='island', height=3.5)
``````