path: root/Doc/library/random.rst

:mod:`random` --- Generate pseudo-random numbers
================================================

.. module:: random
   :synopsis: Generate pseudo-random numbers with various common distributions.

**Source code:** :source:`Lib/random.py`

--------------

This module implements pseudo-random number generators for various
distributions.

For integers, there is uniform selection from a range. For sequences, there is
uniform selection of a random element, a function to generate a random
permutation of a list in-place, and a function for random sampling without
replacement.

On the real line, there are functions to compute uniform, normal (Gaussian),
lognormal, negative exponential, gamma, and beta distributions. For generating
distributions of angles, the von Mises distribution is available.

Almost all module functions depend on the basic function :func:`.random`, which
generates a random float uniformly in the semi-open range [0.0, 1.0).  Python
uses the Mersenne Twister as the core generator.  It produces 53-bit precision
floats and has a period of 2\*\*19937-1.  The underlying implementation in C is
both fast and threadsafe.  The Mersenne Twister is one of the most extensively
tested random number generators in existence.  However, being completely
deterministic, it is not suitable for all purposes, and is completely unsuitable
for cryptographic purposes.

The functions supplied by this module are actually bound methods of a hidden
instance of the :class:`random.Random` class.  You can instantiate your own
instances of :class:`Random` to get generators that don't share state.

Class :class:`Random` can also be subclassed if you want to use a different
basic generator of your own devising: in that case, override the :meth:`~Random.random`,
:meth:`~Random.seed`, :meth:`~Random.getstate`, and :meth:`~Random.setstate` methods.
Optionally, a new generator can supply a :meth:`~Random.getrandbits` method --- this
allows :meth:`randrange` to produce selections over an arbitrarily large range.

The :mod:`random` module also provides the :class:`SystemRandom` class which
uses the system function :func:`os.urandom` to generate random numbers
from sources provided by the operating system.

.. warning::

   The pseudo-random generators of this module should not be used for
   security purposes.  For security or cryptographic uses, see the
   :mod:`secrets` module.

.. seealso::

   M. Matsumoto and T. Nishimura, "Mersenne Twister: A 623-dimensionally
   equidistributed uniform pseudorandom number generator", ACM Transactions on
   Modeling and Computer Simulation Vol. 8, No. 1, January pp.3--30 1998.


   `Complementary-Multiply-with-Carry recipe
   <https://code.activestate.com/recipes/576707/>`_ for a compatible alternative
   random number generator with a long period and comparatively simple update
   operations.


Bookkeeping functions
---------------------

.. function:: seed(a=None, version=2)

   Initialize the random number generator.

   If *a* is omitted or ``None``, the current system time is used.  If
   randomness sources are provided by the operating system, they are used
   instead of the system time (see the :func:`os.urandom` function for details
   on availability).

   If *a* is an int, it is used directly.

   With version 2 (the default), a :class:`str`, :class:`bytes`, or :class:`bytearray`
   object gets converted to an :class:`int` and all of its bits are used.

   With version 1 (provided for reproducing random sequences from older versions
   of Python), the algorithm for :class:`str` and :class:`bytes` generates a
   narrower range of seeds.

   .. versionchanged:: 3.2
      Moved to the version 2 scheme which uses all of the bits in a string seed.

.. function:: getstate()

   Return an object capturing the current internal state of the generator.  This
   object can be passed to :func:`setstate` to restore the state.


.. function:: setstate(state)

   *state* should have been obtained from a previous call to :func:`getstate`, and
   :func:`setstate` restores the internal state of the generator to what it was at
   the time :func:`getstate` was called.


.. function:: getrandbits(k)

   Returns a Python integer with *k* random bits. This method is supplied with
   the MersenneTwister generator and some other generators may also provide it
   as an optional part of the API. When available, :meth:`getrandbits` enables
   :meth:`randrange` to handle arbitrarily large ranges.


Functions for integers
----------------------

.. function:: randrange(stop)
              randrange(start, stop[, step])

   Return a randomly selected element from ``range(start, stop, step)``.  This is
   equivalent to ``choice(range(start, stop, step))``, but doesn't actually build a
   range object.

   The positional argument pattern matches that of :func:`range`.  Keyword arguments
   should not be used because the function may use them in unexpected ways.

   .. versionchanged:: 3.2
      :meth:`randrange` is more sophisticated about producing equally distributed
      values.  Formerly it used a style like ``int(random()*n)`` which could produce
      slightly uneven distributions.

.. function:: randint(a, b)

   Return a random integer *N* such that ``a <= N <= b``.  Alias for
   ``randrange(a, b+1)``.


Functions for sequences
-----------------------

.. function:: choice(seq)

   Return a random element from the non-empty sequence *seq*. If *seq* is empty,
   raises :exc:`IndexError`.

.. function:: choices(population, weights=None, *, cum_weights=None, k=1)

   Return a *k* sized list of elements chosen from the *population* with replacement.
   If the *population* is empty, raises :exc:`IndexError`.

   If a *weights* sequence is specified, selections are made according to the
   relative weights.  Alternatively, if a *cum_weights* sequence is given, the
   selections are made according to the cumulative weights (perhaps computed
   using :func:`itertools.accumulate`).  For example, the relative weights
   ``[10, 5, 30, 5]`` are equivalent to the cumulative weights
   ``[10, 15, 45, 50]``.  Internally, the relative weights are converted to
   cumulative weights before making selections, so supplying the cumulative
   weights saves work.

   If neither *weights* nor *cum_weights* are specified, selections are made
   with equal probability.  If a weights sequence is supplied, it must be
   the same length as the *population* sequence.  It is a :exc:`TypeError`
   to specify both *weights* and *cum_weights*.

   The *weights* or *cum_weights* can use any numeric type that interoperates
   with the :class:`float` values returned by :func:`random` (that includes
   integers, floats, and fractions but excludes decimals).

   .. versionadded:: 3.6


.. function:: shuffle(x[, random])

   Shuffle the sequence *x* in place.

   The optional argument *random* is a 0-argument function returning a random
   float in [0.0, 1.0); by default, this is the function :func:`.random`.

   To shuffle an immutable sequence and return a new shuffled list, use
   ``sample(x, k=len(x))`` instead.

   Note that even for small ``len(x)``, the total number of permutations of *x*
   can quickly grow larger than the period of most random number generators.
   This implies that most permutations of a long sequence can never be
   generated.  For example, a sequence of length 2080 is the largest that
   can fit within the period of the Mersenne Twister random number generator.


.. function:: sample(population, k)

   Return a *k* length list of unique elements chosen from the population sequence
   or set. Used for random sampling without replacement.

   Returns a new list containing elements from the population while leaving the
   original population unchanged.  The resulting list is in selection order so that
   all sub-slices will also be valid random samples.  This allows raffle winners
   (the sample) to be partitioned into grand prize and second place winners (the
   subslices).

   Members of the population need not be :term:`hashable` or unique.  If the population
   contains repeats, then each occurrence is a possible selection in the sample.

   To choose a sample from a range of integers, use a :func:`range` object as an
   argument.  This is especially fast and space efficient for sampling from a large
   population:  ``sample(range(10000000), k=60)``.

   If the sample size is larger than the population size, a :exc:`ValueError`
   is raised.

Real-valued distributions
-------------------------

The following functions generate specific real-valued distributions. Function
parameters are named after the corresponding variables in the distribution's
equation, as used in common mathematical practice; most of these equations can
be found in any statistics text.


.. function:: random()

   Return the next random floating point number in the range [0.0, 1.0).


.. function:: uniform(a, b)

   Return a random floating point number *N* such that ``a <= N <= b`` for
   ``a <= b`` and ``b <= N <= a`` for ``b < a``.

   The end-point value ``b`` may or may not be included in the range
   depending on floating-point rounding in the equation ``a + (b-a) * random()``.


.. function:: triangular(low, high, mode)

   Return a random floating point number *N* such that ``low <= N <= high`` and
   with the specified *mode* between those bounds.  The *low* and *high* bounds
   default to zero and one.  The *mode* argument defaults to the midpoint
   between the bounds, giving a symmetric distribution.


.. function:: betavariate(alpha, beta)

   Beta distribution.  Conditions on the parameters are ``alpha > 0`` and
   ``beta > 0``. Returned values range between 0 and 1.


.. function:: expovariate(lambd)

   Exponential distribution.  *lambd* is 1.0 divided by the desired
   mean.  It should be nonzero.  (The parameter would be called
   "lambda", but that is a reserved word in Python.)  Returned values
   range from 0 to positive infinity if *lambd* is positive, and from
   negative infinity to 0 if *lambd* is negative.


.. function:: gammavariate(alpha, beta)

   Gamma distribution.  (*Not* the gamma function!)  Conditions on the
   parameters are ``alpha > 0`` and ``beta > 0``.

   The probability distribution function is::

                 x ** (alpha - 1) * math.exp(-x / beta)
       pdf(x) =  --------------------------------------
                   math.gamma(alpha) * beta ** alpha


.. function:: gauss(mu, sigma)

   Gaussian distribution.  *mu* is the mean, and *sigma* is the standard
   deviation.  This is slightly faster than the :func:`normalvariate` function
   defined below.


.. function:: lognormvariate(mu, sigma)

   Log normal distribution.  If you take the natural logarithm of this
   distribution, you'll get a normal distribution with mean *mu* and standard
   deviation *sigma*.  *mu* can have any value, and *sigma* must be greater than
   zero.


.. function:: normalvariate(mu, sigma)

   Normal distribution.  *mu* is the mean, and *sigma* is the standard deviation.


.. function:: vonmisesvariate(mu, kappa)

   *mu* is the mean angle, expressed in radians between 0 and 2\*\ *pi*, and *kappa*
   is the concentration parameter, which must be greater than or equal to zero.  If
   *kappa* is equal to zero, this distribution reduces to a uniform random angle
   over the range 0 to 2\*\ *pi*.


.. function:: paretovariate(alpha)

   Pareto distribution.  *alpha* is the shape parameter.


.. function:: weibullvariate(alpha, beta)

   Weibull distribution.  *alpha* is the scale parameter and *beta* is the shape
   parameter.


Alternative Generator
---------------------

.. class:: SystemRandom([seed])

   Class that uses the :func:`os.urandom` function for generating random numbers
   from sources provided by the operating system. Not available on all systems.
   Does not rely on software state, and sequences are not reproducible. Accordingly,
   the :meth:`seed` method has no effect and is ignored.
   The :meth:`getstate` and :meth:`setstate` methods raise
   :exc:`NotImplementedError` if called.


Notes on Reproducibility
------------------------

Sometimes it is useful to be able to reproduce the sequences given by a pseudo
random number generator.  By re-using a seed value, the same sequence should be
reproducible from run to run as long as multiple threads are not running.

Most of the random module's algorithms and seeding functions are subject to
change across Python versions, but two aspects are guaranteed not to change:

* If a new seeding method is added, then a backward compatible seeder will be
  offered.

* The generator's :meth:`~Random.random` method will continue to produce the same
  sequence when the compatible seeder is given the same seed.

.. _random-examples:

Examples and Recipes
--------------------

Basic examples::

   >>> random()                             # Random float:  0.0 <= x < 1.0
   0.37444887175646646

   >>> uniform(2.5, 10.0)                   # Random float:  2.5 <= x < 10.0
   3.1800146073117523

   >>> expovariate(1 / 5)                   # Interval between arrivals averaging 5 seconds
   5.148957571865031

   >>> randrange(10)                        # Integer from 0 to 9 inclusive
   7

   >>> randrange(0, 101, 2)                 # Even integer from 0 to 100 inclusive
   26

   >>> choice(['win', 'lose', 'draw'])      # Single random element from a sequence
   'draw'

   >>> deck = 'ace two three four'.split()
   >>> shuffle(deck)                        # Shuffle a list
   >>> deck
   ['four', 'two', 'ace', 'three']

   >>> sample([10, 20, 30, 40, 50], k=4)    # Four samples without replacement
   [40, 10, 50, 30]

Simulations::

   >>> # Six roulette wheel spins (weighted sampling with replacement)
   >>> choices(['red', 'black', 'green'], [18, 18, 2], k=6)
   ['red', 'green', 'black', 'black', 'red', 'black']

   >>> # Deal 20 cards without replacement from a deck of 52 playing cards
   >>> # and determine the proportion of cards with a ten-value
   >>> # (a ten, jack, queen, or king).
   >>> deck = collections.Counter(tens=16, low_cards=36)
   >>> seen = sample(list(deck.elements()), k=20)
   >>> seen.count('tens') / 20
   0.15

   >>> # Estimate the probability of getting 5 or more heads from 7 spins
   >>> # of a biased coin that settles on heads 60% of the time.
   >>> trial = lambda: choices('HT', cum_weights=(0.60, 1.00), k=7).count('H') >= 5
   >>> sum(trial() for i in range(10000)) / 10000
   0.4169

   >>> # Probability of the median of 5 samples being in middle two quartiles
   >>> trial = lambda : 2500 <= sorted(choices(range(10000), k=5))[2]  < 7500
   >>> sum(trial() for i in range(10000)) / 10000
   0.7958

Example of `statistical bootstrapping
<https://en.wikipedia.org/wiki/Bootstrapping_(statistics)>`_ using resampling
with replacement to estimate a confidence interval for the mean of a sample of
size five::

   # http://statistics.about.com/od/Applications/a/Example-Of-Bootstrapping.htm
   from statistics import mean
   from random import choices

   data = 1, 2, 4, 4, 10
   means = sorted(mean(choices(data, k=5)) for i in range(20))
   print(f'The sample mean of {mean(data):.1f} has a 90% confidence '
         f'interval from {means[1]:.1f} to {means[-2]:.1f}')

Example of a `resampling permutation test
<https://en.wikipedia.org/wiki/Resampling_(statistics)#Permutation_tests>`_
to determine the statistical significance or `p-value
<https://en.wikipedia.org/wiki/P-value>`_ of an observed difference
between the effects of a drug versus a placebo::

    # Example from "Statistics is Easy" by Dennis Shasha and Manda Wilson
    from statistics import mean
    from random import shuffle

    drug = [54, 73, 53, 70, 73, 68, 52, 65, 65]
    placebo = [54, 51, 58, 44, 55, 52, 42, 47, 58, 46]
    observed_diff = mean(drug) - mean(placebo)

    n = 10000
    count = 0
    combined = drug + placebo
    for i in range(n):
        shuffle(combined)
        new_diff = mean(combined[:len(drug)]) - mean(combined[len(drug):])
        count += (new_diff >= observed_diff)

    print(f'{n} label reshufflings produced only {count} instances with a difference')
    print(f'at least as extreme as the observed difference of {observed_diff:.1f}.')
    print(f'The one-sided p-value of {count / n:.4f} leads us to reject the null')
    print(f'hypothesis that there is no difference between the drug and the placebo.')

Simulation of arrival times and service deliveries in a single server queue::

    from random import expovariate, gauss
    from statistics import mean, median, stdev

    average_arrival_interval = 5.6
    average_service_time = 5.0
    stdev_service_time = 0.5

    num_waiting = 0
    arrivals = []
    starts = []
    arrival = service_end = 0.0
    for i in range(20000):
        if arrival <= service_end:
            num_waiting += 1
            arrival += expovariate(1.0 / average_arrival_interval)
            arrivals.append(arrival)
        else:
            num_waiting -= 1
            service_start = service_end if num_waiting else arrival
            service_time = gauss(average_service_time, stdev_service_time)
            service_end = service_start + service_time
            starts.append(service_start)

    waits = [start - arrival for arrival, start in zip(arrivals, starts)]
    print(f'Mean wait: {mean(waits):.1f}.  Stdev wait: {stdev(waits):.1f}.')
    print(f'Median wait: {median(waits):.1f}.  Max wait: {max(waits):.1f}.')

.. seealso::

   `Statistics for Hackers <https://www.youtube.com/watch?v=Iq9DzN6mvYA>`_
   a video tutorial by
   `Jake Vanderplas <https://us.pycon.org/2016/speaker/profile/295/>`_
   on statistical analysis using just a few fundamental concepts
   including simulation, sampling, shuffling, and cross-validation.

   `Economics Simulation
   <http://nbviewer.jupyter.org/url/norvig.com/ipython/Economics.ipynb>`_
   a simulation of a marketplace by
   `Peter Norvig <http://norvig.com/bio.html>`_ that shows effective
   use of many of the tools and distributions provided by this module
   (gauss, uniform, sample, betavariate, choice, triangular, and randrange).

   `A Concrete Introduction to Probability (using Python)
   <http://nbviewer.jupyter.org/url/norvig.com/ipython/Probability.ipynb>`_
   a tutorial by `Peter Norvig <http://norvig.com/bio.html>`_ covering
   the basics of probability theory, how to write simulations, and
   how to perform data analysis using Python.