496 lines
19 KiB
ReStructuredText
496 lines
19 KiB
ReStructuredText
:mod:`random` --- Generate pseudo-random numbers
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================================================
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.. module:: random
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:synopsis: Generate pseudo-random numbers with various common distributions.
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**Source code:** :source:`Lib/random.py`
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--------------
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This module implements pseudo-random number generators for various
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distributions.
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For integers, there is uniform selection from a range. For sequences, there is
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uniform selection of a random element, a function to generate a random
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permutation of a list in-place, and a function for random sampling without
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replacement.
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On the real line, there are functions to compute uniform, normal (Gaussian),
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lognormal, negative exponential, gamma, and beta distributions. For generating
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distributions of angles, the von Mises distribution is available.
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Almost all module functions depend on the basic function :func:`.random`, which
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generates a random float uniformly in the semi-open range [0.0, 1.0). Python
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uses the Mersenne Twister as the core generator. It produces 53-bit precision
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floats and has a period of 2\*\*19937-1. The underlying implementation in C is
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both fast and threadsafe. The Mersenne Twister is one of the most extensively
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tested random number generators in existence. However, being completely
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deterministic, it is not suitable for all purposes, and is completely unsuitable
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for cryptographic purposes.
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The functions supplied by this module are actually bound methods of a hidden
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instance of the :class:`random.Random` class. You can instantiate your own
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instances of :class:`Random` to get generators that don't share state.
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Class :class:`Random` can also be subclassed if you want to use a different
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basic generator of your own devising: in that case, override the :meth:`~Random.random`,
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:meth:`~Random.seed`, :meth:`~Random.getstate`, and :meth:`~Random.setstate` methods.
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Optionally, a new generator can supply a :meth:`~Random.getrandbits` method --- this
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allows :meth:`randrange` to produce selections over an arbitrarily large range.
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The :mod:`random` module also provides the :class:`SystemRandom` class which
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uses the system function :func:`os.urandom` to generate random numbers
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from sources provided by the operating system.
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.. warning::
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The pseudo-random generators of this module should not be used for
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security purposes. For security or cryptographic uses, see the
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:mod:`secrets` module.
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.. seealso::
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M. Matsumoto and T. Nishimura, "Mersenne Twister: A 623-dimensionally
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equidistributed uniform pseudorandom number generator", ACM Transactions on
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Modeling and Computer Simulation Vol. 8, No. 1, January pp.3--30 1998.
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`Complementary-Multiply-with-Carry recipe
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<https://code.activestate.com/recipes/576707/>`_ for a compatible alternative
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random number generator with a long period and comparatively simple update
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operations.
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Bookkeeping functions
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---------------------
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.. function:: seed(a=None, version=2)
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Initialize the random number generator.
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If *a* is omitted or ``None``, the current system time is used. If
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randomness sources are provided by the operating system, they are used
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instead of the system time (see the :func:`os.urandom` function for details
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on availability).
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If *a* is an int, it is used directly.
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With version 2 (the default), a :class:`str`, :class:`bytes`, or :class:`bytearray`
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object gets converted to an :class:`int` and all of its bits are used.
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With version 1 (provided for reproducing random sequences from older versions
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of Python), the algorithm for :class:`str` and :class:`bytes` generates a
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narrower range of seeds.
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.. versionchanged:: 3.2
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Moved to the version 2 scheme which uses all of the bits in a string seed.
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.. function:: getstate()
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Return an object capturing the current internal state of the generator. This
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object can be passed to :func:`setstate` to restore the state.
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.. function:: setstate(state)
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*state* should have been obtained from a previous call to :func:`getstate`, and
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:func:`setstate` restores the internal state of the generator to what it was at
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the time :func:`getstate` was called.
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.. function:: getrandbits(k)
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Returns a Python integer with *k* random bits. This method is supplied with
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the MersenneTwister generator and some other generators may also provide it
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as an optional part of the API. When available, :meth:`getrandbits` enables
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:meth:`randrange` to handle arbitrarily large ranges.
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Functions for integers
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----------------------
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.. function:: randrange(stop)
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randrange(start, stop[, step])
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Return a randomly selected element from ``range(start, stop, step)``. This is
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equivalent to ``choice(range(start, stop, step))``, but doesn't actually build a
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range object.
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The positional argument pattern matches that of :func:`range`. Keyword arguments
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should not be used because the function may use them in unexpected ways.
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.. versionchanged:: 3.2
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:meth:`randrange` is more sophisticated about producing equally distributed
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values. Formerly it used a style like ``int(random()*n)`` which could produce
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slightly uneven distributions.
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.. function:: randint(a, b)
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Return a random integer *N* such that ``a <= N <= b``. Alias for
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``randrange(a, b+1)``.
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Functions for sequences
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-----------------------
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.. function:: choice(seq)
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Return a random element from the non-empty sequence *seq*. If *seq* is empty,
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raises :exc:`IndexError`.
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.. function:: choices(population, weights=None, *, cum_weights=None, k=1)
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Return a *k* sized list of elements chosen from the *population* with replacement.
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If the *population* is empty, raises :exc:`IndexError`.
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If a *weights* sequence is specified, selections are made according to the
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relative weights. Alternatively, if a *cum_weights* sequence is given, the
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selections are made according to the cumulative weights (perhaps computed
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using :func:`itertools.accumulate`). For example, the relative weights
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``[10, 5, 30, 5]`` are equivalent to the cumulative weights
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``[10, 15, 45, 50]``. Internally, the relative weights are converted to
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cumulative weights before making selections, so supplying the cumulative
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weights saves work.
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If neither *weights* nor *cum_weights* are specified, selections are made
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with equal probability. If a weights sequence is supplied, it must be
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the same length as the *population* sequence. It is a :exc:`TypeError`
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to specify both *weights* and *cum_weights*.
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The *weights* or *cum_weights* can use any numeric type that interoperates
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with the :class:`float` values returned by :func:`random` (that includes
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integers, floats, and fractions but excludes decimals).
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For a given seed, the :func:`choices` function with equal weighting
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typically produces a different sequence than repeated calls to
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:func:`choice`. The algorithm used by :func:`choices` uses floating
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point arithmetic for internal consistency and speed. The algorithm used
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by :func:`choice` defaults to integer arithmetic with repeated selections
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to avoid small biases from round-off error.
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.. versionadded:: 3.6
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.. function:: shuffle(x[, random])
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Shuffle the sequence *x* in place.
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The optional argument *random* is a 0-argument function returning a random
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float in [0.0, 1.0); by default, this is the function :func:`.random`.
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To shuffle an immutable sequence and return a new shuffled list, use
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``sample(x, k=len(x))`` instead.
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Note that even for small ``len(x)``, the total number of permutations of *x*
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can quickly grow larger than the period of most random number generators.
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This implies that most permutations of a long sequence can never be
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generated. For example, a sequence of length 2080 is the largest that
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can fit within the period of the Mersenne Twister random number generator.
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.. function:: sample(population, k)
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Return a *k* length list of unique elements chosen from the population sequence
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or set. Used for random sampling without replacement.
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Returns a new list containing elements from the population while leaving the
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original population unchanged. The resulting list is in selection order so that
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all sub-slices will also be valid random samples. This allows raffle winners
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(the sample) to be partitioned into grand prize and second place winners (the
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subslices).
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Members of the population need not be :term:`hashable` or unique. If the population
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contains repeats, then each occurrence is a possible selection in the sample.
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To choose a sample from a range of integers, use a :func:`range` object as an
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argument. This is especially fast and space efficient for sampling from a large
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population: ``sample(range(10000000), k=60)``.
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If the sample size is larger than the population size, a :exc:`ValueError`
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is raised.
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Real-valued distributions
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-------------------------
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The following functions generate specific real-valued distributions. Function
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parameters are named after the corresponding variables in the distribution's
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equation, as used in common mathematical practice; most of these equations can
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be found in any statistics text.
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.. function:: random()
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Return the next random floating point number in the range [0.0, 1.0).
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.. function:: uniform(a, b)
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Return a random floating point number *N* such that ``a <= N <= b`` for
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``a <= b`` and ``b <= N <= a`` for ``b < a``.
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The end-point value ``b`` may or may not be included in the range
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depending on floating-point rounding in the equation ``a + (b-a) * random()``.
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.. function:: triangular(low, high, mode)
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Return a random floating point number *N* such that ``low <= N <= high`` and
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with the specified *mode* between those bounds. The *low* and *high* bounds
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default to zero and one. The *mode* argument defaults to the midpoint
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between the bounds, giving a symmetric distribution.
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.. function:: betavariate(alpha, beta)
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Beta distribution. Conditions on the parameters are ``alpha > 0`` and
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``beta > 0``. Returned values range between 0 and 1.
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.. function:: expovariate(lambd)
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Exponential distribution. *lambd* is 1.0 divided by the desired
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mean. It should be nonzero. (The parameter would be called
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"lambda", but that is a reserved word in Python.) Returned values
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range from 0 to positive infinity if *lambd* is positive, and from
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negative infinity to 0 if *lambd* is negative.
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.. function:: gammavariate(alpha, beta)
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Gamma distribution. (*Not* the gamma function!) Conditions on the
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parameters are ``alpha > 0`` and ``beta > 0``.
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The probability distribution function is::
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x ** (alpha - 1) * math.exp(-x / beta)
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pdf(x) = --------------------------------------
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math.gamma(alpha) * beta ** alpha
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.. function:: gauss(mu, sigma)
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Gaussian distribution. *mu* is the mean, and *sigma* is the standard
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deviation. This is slightly faster than the :func:`normalvariate` function
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defined below.
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.. function:: lognormvariate(mu, sigma)
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Log normal distribution. If you take the natural logarithm of this
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distribution, you'll get a normal distribution with mean *mu* and standard
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deviation *sigma*. *mu* can have any value, and *sigma* must be greater than
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zero.
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.. function:: normalvariate(mu, sigma)
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Normal distribution. *mu* is the mean, and *sigma* is the standard deviation.
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.. function:: vonmisesvariate(mu, kappa)
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*mu* is the mean angle, expressed in radians between 0 and 2\*\ *pi*, and *kappa*
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is the concentration parameter, which must be greater than or equal to zero. If
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*kappa* is equal to zero, this distribution reduces to a uniform random angle
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over the range 0 to 2\*\ *pi*.
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.. function:: paretovariate(alpha)
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Pareto distribution. *alpha* is the shape parameter.
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.. function:: weibullvariate(alpha, beta)
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Weibull distribution. *alpha* is the scale parameter and *beta* is the shape
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parameter.
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Alternative Generator
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---------------------
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.. class:: Random([seed])
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Class that implements the default pseudo-random number generator used by the
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:mod:`random` module.
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.. class:: SystemRandom([seed])
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Class that uses the :func:`os.urandom` function for generating random numbers
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from sources provided by the operating system. Not available on all systems.
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Does not rely on software state, and sequences are not reproducible. Accordingly,
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the :meth:`seed` method has no effect and is ignored.
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The :meth:`getstate` and :meth:`setstate` methods raise
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:exc:`NotImplementedError` if called.
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Notes on Reproducibility
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------------------------
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Sometimes it is useful to be able to reproduce the sequences given by a pseudo
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random number generator. By re-using a seed value, the same sequence should be
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reproducible from run to run as long as multiple threads are not running.
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Most of the random module's algorithms and seeding functions are subject to
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change across Python versions, but two aspects are guaranteed not to change:
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* If a new seeding method is added, then a backward compatible seeder will be
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offered.
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* The generator's :meth:`~Random.random` method will continue to produce the same
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sequence when the compatible seeder is given the same seed.
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.. _random-examples:
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Examples and Recipes
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--------------------
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Basic examples::
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>>> random() # Random float: 0.0 <= x < 1.0
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0.37444887175646646
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>>> uniform(2.5, 10.0) # Random float: 2.5 <= x < 10.0
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3.1800146073117523
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>>> expovariate(1 / 5) # Interval between arrivals averaging 5 seconds
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5.148957571865031
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>>> randrange(10) # Integer from 0 to 9 inclusive
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7
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>>> randrange(0, 101, 2) # Even integer from 0 to 100 inclusive
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26
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>>> choice(['win', 'lose', 'draw']) # Single random element from a sequence
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'draw'
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>>> deck = 'ace two three four'.split()
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>>> shuffle(deck) # Shuffle a list
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>>> deck
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['four', 'two', 'ace', 'three']
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>>> sample([10, 20, 30, 40, 50], k=4) # Four samples without replacement
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[40, 10, 50, 30]
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Simulations::
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>>> # Six roulette wheel spins (weighted sampling with replacement)
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>>> choices(['red', 'black', 'green'], [18, 18, 2], k=6)
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['red', 'green', 'black', 'black', 'red', 'black']
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>>> # Deal 20 cards without replacement from a deck of 52 playing cards
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>>> # and determine the proportion of cards with a ten-value
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>>> # (a ten, jack, queen, or king).
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>>> deck = collections.Counter(tens=16, low_cards=36)
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>>> seen = sample(list(deck.elements()), k=20)
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>>> seen.count('tens') / 20
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0.15
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>>> # Estimate the probability of getting 5 or more heads from 7 spins
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>>> # of a biased coin that settles on heads 60% of the time.
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>>> def trial():
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... return choices('HT', cum_weights=(0.60, 1.00), k=7).count('H') >= 5
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...
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>>> sum(trial() for i in range(10000)) / 10000
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0.4169
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>>> # Probability of the median of 5 samples being in middle two quartiles
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>>> def trial():
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... return 2500 <= sorted(choices(range(10000), k=5))[2] < 7500
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...
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>>> sum(trial() for i in range(10000)) / 10000
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0.7958
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Example of `statistical bootstrapping
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<https://en.wikipedia.org/wiki/Bootstrapping_(statistics)>`_ using resampling
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with replacement to estimate a confidence interval for the mean of a sample of
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size five::
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# http://statistics.about.com/od/Applications/a/Example-Of-Bootstrapping.htm
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from statistics import fmean as mean
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from random import choices
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data = 1, 2, 4, 4, 10
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means = sorted(mean(choices(data, k=5)) for i in range(20))
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print(f'The sample mean of {mean(data):.1f} has a 90% confidence '
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f'interval from {means[1]:.1f} to {means[-2]:.1f}')
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Example of a `resampling permutation test
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<https://en.wikipedia.org/wiki/Resampling_(statistics)#Permutation_tests>`_
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to determine the statistical significance or `p-value
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<https://en.wikipedia.org/wiki/P-value>`_ of an observed difference
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between the effects of a drug versus a placebo::
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# Example from "Statistics is Easy" by Dennis Shasha and Manda Wilson
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from statistics import fmean as mean
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from random import shuffle
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drug = [54, 73, 53, 70, 73, 68, 52, 65, 65]
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placebo = [54, 51, 58, 44, 55, 52, 42, 47, 58, 46]
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observed_diff = mean(drug) - mean(placebo)
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n = 10000
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count = 0
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combined = drug + placebo
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for i in range(n):
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shuffle(combined)
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new_diff = mean(combined[:len(drug)]) - mean(combined[len(drug):])
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count += (new_diff >= observed_diff)
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print(f'{n} label reshufflings produced only {count} instances with a difference')
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print(f'at least as extreme as the observed difference of {observed_diff:.1f}.')
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print(f'The one-sided p-value of {count / n:.4f} leads us to reject the null')
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print(f'hypothesis that there is no difference between the drug and the placebo.')
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Simulation of arrival times and service deliveries in a single server queue::
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from random import expovariate, gauss
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from statistics import mean, median, stdev
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average_arrival_interval = 5.6
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average_service_time = 5.0
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stdev_service_time = 0.5
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num_waiting = 0
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arrivals = []
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starts = []
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arrival = service_end = 0.0
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for i in range(20000):
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if arrival <= service_end:
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num_waiting += 1
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arrival += expovariate(1.0 / average_arrival_interval)
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arrivals.append(arrival)
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else:
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num_waiting -= 1
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service_start = service_end if num_waiting else arrival
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service_time = gauss(average_service_time, stdev_service_time)
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service_end = service_start + service_time
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starts.append(service_start)
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waits = [start - arrival for arrival, start in zip(arrivals, starts)]
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print(f'Mean wait: {mean(waits):.1f}. Stdev wait: {stdev(waits):.1f}.')
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print(f'Median wait: {median(waits):.1f}. Max wait: {max(waits):.1f}.')
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.. seealso::
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`Statistics for Hackers <https://www.youtube.com/watch?v=Iq9DzN6mvYA>`_
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a video tutorial by
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`Jake Vanderplas <https://us.pycon.org/2016/speaker/profile/295/>`_
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on statistical analysis using just a few fundamental concepts
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including simulation, sampling, shuffling, and cross-validation.
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`Economics Simulation
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<http://nbviewer.jupyter.org/url/norvig.com/ipython/Economics.ipynb>`_
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a simulation of a marketplace by
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`Peter Norvig <http://norvig.com/bio.html>`_ that shows effective
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use of many of the tools and distributions provided by this module
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(gauss, uniform, sample, betavariate, choice, triangular, and randrange).
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`A Concrete Introduction to Probability (using Python)
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<http://nbviewer.jupyter.org/url/norvig.com/ipython/Probability.ipynb>`_
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a tutorial by `Peter Norvig <http://norvig.com/bio.html>`_ covering
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the basics of probability theory, how to write simulations, and
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how to perform data analysis using Python.
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