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1185 lines
43 KiB
ReStructuredText
:mod:`!statistics` --- Mathematical statistics functions
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========================================================
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.. module:: statistics
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:synopsis: Mathematical statistics functions
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.. moduleauthor:: Steven D'Aprano <steve+python@pearwood.info>
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.. sectionauthor:: Steven D'Aprano <steve+python@pearwood.info>
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.. versionadded:: 3.4
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**Source code:** :source:`Lib/statistics.py`
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.. testsetup:: *
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from statistics import *
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import math
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__name__ = '<doctest>'
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--------------
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This module provides functions for calculating mathematical statistics of
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numeric (:class:`~numbers.Real`-valued) data.
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The module is not intended to be a competitor to third-party libraries such
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as `NumPy <https://numpy.org>`_, `SciPy <https://scipy.org/>`_, or
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proprietary full-featured statistics packages aimed at professional
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statisticians such as Minitab, SAS and Matlab. It is aimed at the level of
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graphing and scientific calculators.
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Unless explicitly noted, these functions support :class:`int`,
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:class:`float`, :class:`~decimal.Decimal` and :class:`~fractions.Fraction`.
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Behaviour with other types (whether in the numeric tower or not) is
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currently unsupported. Collections with a mix of types are also undefined
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and implementation-dependent. If your input data consists of mixed types,
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you may be able to use :func:`map` to ensure a consistent result, for
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example: ``map(float, input_data)``.
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Some datasets use ``NaN`` (not a number) values to represent missing data.
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Since NaNs have unusual comparison semantics, they cause surprising or
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undefined behaviors in the statistics functions that sort data or that count
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occurrences. The functions affected are ``median()``, ``median_low()``,
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``median_high()``, ``median_grouped()``, ``mode()``, ``multimode()``, and
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``quantiles()``. The ``NaN`` values should be stripped before calling these
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functions::
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>>> from statistics import median
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>>> from math import isnan
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>>> from itertools import filterfalse
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>>> data = [20.7, float('NaN'),19.2, 18.3, float('NaN'), 14.4]
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>>> sorted(data) # This has surprising behavior
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[20.7, nan, 14.4, 18.3, 19.2, nan]
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>>> median(data) # This result is unexpected
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16.35
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>>> sum(map(isnan, data)) # Number of missing values
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2
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>>> clean = list(filterfalse(isnan, data)) # Strip NaN values
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>>> clean
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[20.7, 19.2, 18.3, 14.4]
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>>> sorted(clean) # Sorting now works as expected
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[14.4, 18.3, 19.2, 20.7]
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>>> median(clean) # This result is now well defined
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18.75
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Averages and measures of central location
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-----------------------------------------
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These functions calculate an average or typical value from a population
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or sample.
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======================= ===============================================================
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:func:`mean` Arithmetic mean ("average") of data.
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:func:`fmean` Fast, floating-point arithmetic mean, with optional weighting.
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:func:`geometric_mean` Geometric mean of data.
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:func:`harmonic_mean` Harmonic mean of data.
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:func:`kde` Estimate the probability density distribution of the data.
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:func:`kde_random` Random sampling from the PDF generated by kde().
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:func:`median` Median (middle value) of data.
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:func:`median_low` Low median of data.
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:func:`median_high` High median of data.
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:func:`median_grouped` Median (50th percentile) of grouped data.
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:func:`mode` Single mode (most common value) of discrete or nominal data.
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:func:`multimode` List of modes (most common values) of discrete or nominal data.
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:func:`quantiles` Divide data into intervals with equal probability.
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======================= ===============================================================
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Measures of spread
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------------------
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These functions calculate a measure of how much the population or sample
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tends to deviate from the typical or average values.
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======================= =============================================
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:func:`pstdev` Population standard deviation of data.
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:func:`pvariance` Population variance of data.
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:func:`stdev` Sample standard deviation of data.
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:func:`variance` Sample variance of data.
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======================= =============================================
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Statistics for relations between two inputs
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-------------------------------------------
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These functions calculate statistics regarding relations between two inputs.
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========================= =====================================================
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:func:`covariance` Sample covariance for two variables.
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:func:`correlation` Pearson and Spearman's correlation coefficients.
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:func:`linear_regression` Slope and intercept for simple linear regression.
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========================= =====================================================
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Function details
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----------------
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Note: The functions do not require the data given to them to be sorted.
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However, for reading convenience, most of the examples show sorted sequences.
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.. function:: mean(data)
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Return the sample arithmetic mean of *data* which can be a sequence or iterable.
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The arithmetic mean is the sum of the data divided by the number of data
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points. It is commonly called "the average", although it is only one of many
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different mathematical averages. It is a measure of the central location of
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the data.
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If *data* is empty, :exc:`StatisticsError` will be raised.
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Some examples of use:
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.. doctest::
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>>> mean([1, 2, 3, 4, 4])
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2.8
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>>> mean([-1.0, 2.5, 3.25, 5.75])
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2.625
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>>> from fractions import Fraction as F
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>>> mean([F(3, 7), F(1, 21), F(5, 3), F(1, 3)])
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Fraction(13, 21)
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>>> from decimal import Decimal as D
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>>> mean([D("0.5"), D("0.75"), D("0.625"), D("0.375")])
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Decimal('0.5625')
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.. note::
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The mean is strongly affected by `outliers
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<https://en.wikipedia.org/wiki/Outlier>`_ and is not necessarily a
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typical example of the data points. For a more robust, although less
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efficient, measure of `central tendency
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<https://en.wikipedia.org/wiki/Central_tendency>`_, see :func:`median`.
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The sample mean gives an unbiased estimate of the true population mean,
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so that when taken on average over all the possible samples,
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``mean(sample)`` converges on the true mean of the entire population. If
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*data* represents the entire population rather than a sample, then
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``mean(data)`` is equivalent to calculating the true population mean μ.
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.. function:: fmean(data, weights=None)
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Convert *data* to floats and compute the arithmetic mean.
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This runs faster than the :func:`mean` function and it always returns a
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:class:`float`. The *data* may be a sequence or iterable. If the input
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dataset is empty, raises a :exc:`StatisticsError`.
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.. doctest::
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>>> fmean([3.5, 4.0, 5.25])
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4.25
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Optional weighting is supported. For example, a professor assigns a
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grade for a course by weighting quizzes at 20%, homework at 20%, a
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midterm exam at 30%, and a final exam at 30%:
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.. doctest::
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>>> grades = [85, 92, 83, 91]
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>>> weights = [0.20, 0.20, 0.30, 0.30]
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>>> fmean(grades, weights)
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87.6
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If *weights* is supplied, it must be the same length as the *data* or
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a :exc:`ValueError` will be raised.
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.. versionadded:: 3.8
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.. versionchanged:: 3.11
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Added support for *weights*.
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.. function:: geometric_mean(data)
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Convert *data* to floats and compute the geometric mean.
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The geometric mean indicates the central tendency or typical value of the
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*data* using the product of the values (as opposed to the arithmetic mean
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which uses their sum).
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Raises a :exc:`StatisticsError` if the input dataset is empty,
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if it contains a zero, or if it contains a negative value.
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The *data* may be a sequence or iterable.
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No special efforts are made to achieve exact results.
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(However, this may change in the future.)
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.. doctest::
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>>> round(geometric_mean([54, 24, 36]), 1)
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36.0
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.. versionadded:: 3.8
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.. function:: harmonic_mean(data, weights=None)
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Return the harmonic mean of *data*, a sequence or iterable of
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real-valued numbers. If *weights* is omitted or ``None``, then
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equal weighting is assumed.
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The harmonic mean is the reciprocal of the arithmetic :func:`mean` of the
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reciprocals of the data. For example, the harmonic mean of three values *a*,
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*b* and *c* will be equivalent to ``3/(1/a + 1/b + 1/c)``. If one of the
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values is zero, the result will be zero.
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The harmonic mean is a type of average, a measure of the central
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location of the data. It is often appropriate when averaging
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ratios or rates, for example speeds.
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Suppose a car travels 10 km at 40 km/hr, then another 10 km at 60 km/hr.
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What is the average speed?
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.. doctest::
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>>> harmonic_mean([40, 60])
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48.0
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Suppose a car travels 40 km/hr for 5 km, and when traffic clears,
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speeds-up to 60 km/hr for the remaining 30 km of the journey. What
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is the average speed?
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.. doctest::
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>>> harmonic_mean([40, 60], weights=[5, 30])
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56.0
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:exc:`StatisticsError` is raised if *data* is empty, any element
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is less than zero, or if the weighted sum isn't positive.
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The current algorithm has an early-out when it encounters a zero
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in the input. This means that the subsequent inputs are not tested
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for validity. (This behavior may change in the future.)
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.. versionadded:: 3.6
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.. versionchanged:: 3.10
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Added support for *weights*.
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.. function:: kde(data, h, kernel='normal', *, cumulative=False)
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`Kernel Density Estimation (KDE)
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<https://www.itm-conferences.org/articles/itmconf/pdf/2018/08/itmconf_sam2018_00037.pdf>`_:
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Create a continuous probability density function or cumulative
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distribution function from discrete samples.
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The basic idea is to smooth the data using `a kernel function
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<https://en.wikipedia.org/wiki/Kernel_(statistics)>`_.
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to help draw inferences about a population from a sample.
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The degree of smoothing is controlled by the scaling parameter *h*
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which is called the bandwidth. Smaller values emphasize local
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features while larger values give smoother results.
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The *kernel* determines the relative weights of the sample data
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points. Generally, the choice of kernel shape does not matter
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as much as the more influential bandwidth smoothing parameter.
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Kernels that give some weight to every sample point include
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*normal* (*gauss*), *logistic*, and *sigmoid*.
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Kernels that only give weight to sample points within the bandwidth
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include *rectangular* (*uniform*), *triangular*, *parabolic*
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(*epanechnikov*), *quartic* (*biweight*), *triweight*, and *cosine*.
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If *cumulative* is true, will return a cumulative distribution function.
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A :exc:`StatisticsError` will be raised if the *data* sequence is empty.
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`Wikipedia has an example
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<https://en.wikipedia.org/wiki/Kernel_density_estimation#Example>`_
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where we can use :func:`kde` to generate and plot a probability
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density function estimated from a small sample:
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.. doctest::
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>>> sample = [-2.1, -1.3, -0.4, 1.9, 5.1, 6.2]
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>>> f_hat = kde(sample, h=1.5)
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>>> xarr = [i/100 for i in range(-750, 1100)]
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>>> yarr = [f_hat(x) for x in xarr]
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The points in ``xarr`` and ``yarr`` can be used to make a PDF plot:
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.. image:: kde_example.png
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:alt: Scatter plot of the estimated probability density function.
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.. versionadded:: 3.13
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.. function:: kde_random(data, h, kernel='normal', *, seed=None)
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Return a function that makes a random selection from the estimated
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probability density function produced by ``kde(data, h, kernel)``.
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Providing a *seed* allows reproducible selections. In the future, the
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values may change slightly as more accurate kernel inverse CDF estimates
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are implemented. The seed may be an integer, float, str, or bytes.
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A :exc:`StatisticsError` will be raised if the *data* sequence is empty.
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Continuing the example for :func:`kde`, we can use
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:func:`kde_random` to generate new random selections from an
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estimated probability density function:
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>>> data = [-2.1, -1.3, -0.4, 1.9, 5.1, 6.2]
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>>> rand = kde_random(data, h=1.5, seed=8675309)
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>>> new_selections = [rand() for i in range(10)]
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>>> [round(x, 1) for x in new_selections]
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[0.7, 6.2, 1.2, 6.9, 7.0, 1.8, 2.5, -0.5, -1.8, 5.6]
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.. versionadded:: 3.13
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.. function:: median(data)
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Return the median (middle value) of numeric data, using the common "mean of
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middle two" method. If *data* is empty, :exc:`StatisticsError` is raised.
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*data* can be a sequence or iterable.
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The median is a robust measure of central location and is less affected by
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the presence of outliers. When the number of data points is odd, the
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middle data point is returned:
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.. doctest::
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>>> median([1, 3, 5])
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3
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When the number of data points is even, the median is interpolated by taking
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the average of the two middle values:
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.. doctest::
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>>> median([1, 3, 5, 7])
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4.0
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This is suited for when your data is discrete, and you don't mind that the
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median may not be an actual data point.
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If the data is ordinal (supports order operations) but not numeric (doesn't
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support addition), consider using :func:`median_low` or :func:`median_high`
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instead.
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.. function:: median_low(data)
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Return the low median of numeric data. If *data* is empty,
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:exc:`StatisticsError` is raised. *data* can be a sequence or iterable.
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The low median is always a member of the data set. When the number of data
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points is odd, the middle value is returned. When it is even, the smaller of
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the two middle values is returned.
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.. doctest::
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>>> median_low([1, 3, 5])
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3
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>>> median_low([1, 3, 5, 7])
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3
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Use the low median when your data are discrete and you prefer the median to
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be an actual data point rather than interpolated.
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.. function:: median_high(data)
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Return the high median of data. If *data* is empty, :exc:`StatisticsError`
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is raised. *data* can be a sequence or iterable.
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The high median is always a member of the data set. When the number of data
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points is odd, the middle value is returned. When it is even, the larger of
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the two middle values is returned.
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.. doctest::
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>>> median_high([1, 3, 5])
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3
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>>> median_high([1, 3, 5, 7])
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5
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Use the high median when your data are discrete and you prefer the median to
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be an actual data point rather than interpolated.
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.. function:: median_grouped(data, interval=1.0)
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Estimates the median for numeric data that has been `grouped or binned
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<https://en.wikipedia.org/wiki/Data_binning>`_ around the midpoints
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of consecutive, fixed-width intervals.
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The *data* can be any iterable of numeric data with each value being
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exactly the midpoint of a bin. At least one value must be present.
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The *interval* is the width of each bin.
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For example, demographic information may have been summarized into
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consecutive ten-year age groups with each group being represented
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by the 5-year midpoints of the intervals:
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.. doctest::
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>>> from collections import Counter
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>>> demographics = Counter({
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... 25: 172, # 20 to 30 years old
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... 35: 484, # 30 to 40 years old
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... 45: 387, # 40 to 50 years old
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... 55: 22, # 50 to 60 years old
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... 65: 6, # 60 to 70 years old
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... })
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...
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The 50th percentile (median) is the 536th person out of the 1071
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member cohort. That person is in the 30 to 40 year old age group.
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The regular :func:`median` function would assume that everyone in the
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tricenarian age group was exactly 35 years old. A more tenable
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assumption is that the 484 members of that age group are evenly
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distributed between 30 and 40. For that, we use
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:func:`median_grouped`:
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.. doctest::
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>>> data = list(demographics.elements())
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>>> median(data)
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35
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>>> round(median_grouped(data, interval=10), 1)
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37.5
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The caller is responsible for making sure the data points are separated
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by exact multiples of *interval*. This is essential for getting a
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correct result. The function does not check this precondition.
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Inputs may be any numeric type that can be coerced to a float during
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the interpolation step.
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.. function:: mode(data)
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Return the single most common data point from discrete or nominal *data*.
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The mode (when it exists) is the most typical value and serves as a
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measure of central location.
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If there are multiple modes with the same frequency, returns the first one
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encountered in the *data*. If the smallest or largest of those is
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desired instead, use ``min(multimode(data))`` or ``max(multimode(data))``.
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If the input *data* is empty, :exc:`StatisticsError` is raised.
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``mode`` assumes discrete data and returns a single value. This is the
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standard treatment of the mode as commonly taught in schools:
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.. doctest::
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>>> mode([1, 1, 2, 3, 3, 3, 3, 4])
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3
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The mode is unique in that it is the only statistic in this package that
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also applies to nominal (non-numeric) data:
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.. doctest::
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>>> mode(["red", "blue", "blue", "red", "green", "red", "red"])
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'red'
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Only hashable inputs are supported. To handle type :class:`set`,
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consider casting to :class:`frozenset`. To handle type :class:`list`,
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consider casting to :class:`tuple`. For mixed or nested inputs, consider
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using this slower quadratic algorithm that only depends on equality tests:
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``max(data, key=data.count)``.
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.. versionchanged:: 3.8
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Now handles multimodal datasets by returning the first mode encountered.
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Formerly, it raised :exc:`StatisticsError` when more than one mode was
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found.
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.. function:: multimode(data)
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Return a list of the most frequently occurring values in the order they
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were first encountered in the *data*. Will return more than one result if
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there are multiple modes or an empty list if the *data* is empty:
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.. doctest::
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>>> multimode('aabbbbccddddeeffffgg')
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['b', 'd', 'f']
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>>> multimode('')
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[]
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.. versionadded:: 3.8
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.. function:: pstdev(data, mu=None)
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Return the population standard deviation (the square root of the population
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variance). See :func:`pvariance` for arguments and other details.
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.. doctest::
|
|
|
|
>>> pstdev([1.5, 2.5, 2.5, 2.75, 3.25, 4.75])
|
|
0.986893273527251
|
|
|
|
|
|
.. function:: pvariance(data, mu=None)
|
|
|
|
Return the population variance of *data*, a non-empty sequence or iterable
|
|
of real-valued numbers. Variance, or second moment about the mean, is a
|
|
measure of the variability (spread or dispersion) of data. A large
|
|
variance indicates that the data is spread out; a small variance indicates
|
|
it is clustered closely around the mean.
|
|
|
|
If the optional second argument *mu* is given, it should be the *population*
|
|
mean of the *data*. It can also be used to compute the second moment around
|
|
a point that is not the mean. If it is missing or ``None`` (the default),
|
|
the arithmetic mean is automatically calculated.
|
|
|
|
Use this function to calculate the variance from the entire population. To
|
|
estimate the variance from a sample, the :func:`variance` function is usually
|
|
a better choice.
|
|
|
|
Raises :exc:`StatisticsError` if *data* is empty.
|
|
|
|
Examples:
|
|
|
|
.. doctest::
|
|
|
|
>>> data = [0.0, 0.25, 0.25, 1.25, 1.5, 1.75, 2.75, 3.25]
|
|
>>> pvariance(data)
|
|
1.25
|
|
|
|
If you have already calculated the mean of your data, you can pass it as the
|
|
optional second argument *mu* to avoid recalculation:
|
|
|
|
.. doctest::
|
|
|
|
>>> mu = mean(data)
|
|
>>> pvariance(data, mu)
|
|
1.25
|
|
|
|
Decimals and Fractions are supported:
|
|
|
|
.. doctest::
|
|
|
|
>>> from decimal import Decimal as D
|
|
>>> pvariance([D("27.5"), D("30.25"), D("30.25"), D("34.5"), D("41.75")])
|
|
Decimal('24.815')
|
|
|
|
>>> from fractions import Fraction as F
|
|
>>> pvariance([F(1, 4), F(5, 4), F(1, 2)])
|
|
Fraction(13, 72)
|
|
|
|
.. note::
|
|
|
|
When called with the entire population, this gives the population variance
|
|
σ². When called on a sample instead, this is the biased sample variance
|
|
s², also known as variance with N degrees of freedom.
|
|
|
|
If you somehow know the true population mean μ, you may use this
|
|
function to calculate the variance of a sample, giving the known
|
|
population mean as the second argument. Provided the data points are a
|
|
random sample of the population, the result will be an unbiased estimate
|
|
of the population variance.
|
|
|
|
|
|
.. function:: stdev(data, xbar=None)
|
|
|
|
Return the sample standard deviation (the square root of the sample
|
|
variance). See :func:`variance` for arguments and other details.
|
|
|
|
.. doctest::
|
|
|
|
>>> stdev([1.5, 2.5, 2.5, 2.75, 3.25, 4.75])
|
|
1.0810874155219827
|
|
|
|
|
|
.. function:: variance(data, xbar=None)
|
|
|
|
Return the sample variance of *data*, an iterable of at least two real-valued
|
|
numbers. Variance, or second moment about the mean, is a measure of the
|
|
variability (spread or dispersion) of data. A large variance indicates that
|
|
the data is spread out; a small variance indicates it is clustered closely
|
|
around the mean.
|
|
|
|
If the optional second argument *xbar* is given, it should be the *sample*
|
|
mean of *data*. If it is missing or ``None`` (the default), the mean is
|
|
automatically calculated.
|
|
|
|
Use this function when your data is a sample from a population. To calculate
|
|
the variance from the entire population, see :func:`pvariance`.
|
|
|
|
Raises :exc:`StatisticsError` if *data* has fewer than two values.
|
|
|
|
Examples:
|
|
|
|
.. doctest::
|
|
|
|
>>> data = [2.75, 1.75, 1.25, 0.25, 0.5, 1.25, 3.5]
|
|
>>> variance(data)
|
|
1.3720238095238095
|
|
|
|
If you have already calculated the sample mean of your data, you can pass it
|
|
as the optional second argument *xbar* to avoid recalculation:
|
|
|
|
.. doctest::
|
|
|
|
>>> m = mean(data)
|
|
>>> variance(data, m)
|
|
1.3720238095238095
|
|
|
|
This function does not attempt to verify that you have passed the actual mean
|
|
as *xbar*. Using arbitrary values for *xbar* can lead to invalid or
|
|
impossible results.
|
|
|
|
Decimal and Fraction values are supported:
|
|
|
|
.. doctest::
|
|
|
|
>>> from decimal import Decimal as D
|
|
>>> variance([D("27.5"), D("30.25"), D("30.25"), D("34.5"), D("41.75")])
|
|
Decimal('31.01875')
|
|
|
|
>>> from fractions import Fraction as F
|
|
>>> variance([F(1, 6), F(1, 2), F(5, 3)])
|
|
Fraction(67, 108)
|
|
|
|
.. note::
|
|
|
|
This is the sample variance s² with Bessel's correction, also known as
|
|
variance with N-1 degrees of freedom. Provided that the data points are
|
|
representative (e.g. independent and identically distributed), the result
|
|
should be an unbiased estimate of the true population variance.
|
|
|
|
If you somehow know the actual population mean μ you should pass it to the
|
|
:func:`pvariance` function as the *mu* parameter to get the variance of a
|
|
sample.
|
|
|
|
.. function:: quantiles(data, *, n=4, method='exclusive')
|
|
|
|
Divide *data* into *n* continuous intervals with equal probability.
|
|
Returns a list of ``n - 1`` cut points separating the intervals.
|
|
|
|
Set *n* to 4 for quartiles (the default). Set *n* to 10 for deciles. Set
|
|
*n* to 100 for percentiles which gives the 99 cuts points that separate
|
|
*data* into 100 equal sized groups. Raises :exc:`StatisticsError` if *n*
|
|
is not least 1.
|
|
|
|
The *data* can be any iterable containing sample data. For meaningful
|
|
results, the number of data points in *data* should be larger than *n*.
|
|
Raises :exc:`StatisticsError` if there is not at least one data point.
|
|
|
|
The cut points are linearly interpolated from the
|
|
two nearest data points. For example, if a cut point falls one-third
|
|
of the distance between two sample values, ``100`` and ``112``, the
|
|
cut-point will evaluate to ``104``.
|
|
|
|
The *method* for computing quantiles can be varied depending on
|
|
whether the *data* includes or excludes the lowest and
|
|
highest possible values from the population.
|
|
|
|
The default *method* is "exclusive" and is used for data sampled from
|
|
a population that can have more extreme values than found in the
|
|
samples. The portion of the population falling below the *i-th* of
|
|
*m* sorted data points is computed as ``i / (m + 1)``. Given nine
|
|
sample values, the method sorts them and assigns the following
|
|
percentiles: 10%, 20%, 30%, 40%, 50%, 60%, 70%, 80%, 90%.
|
|
|
|
Setting the *method* to "inclusive" is used for describing population
|
|
data or for samples that are known to include the most extreme values
|
|
from the population. The minimum value in *data* is treated as the 0th
|
|
percentile and the maximum value is treated as the 100th percentile.
|
|
The portion of the population falling below the *i-th* of *m* sorted
|
|
data points is computed as ``(i - 1) / (m - 1)``. Given 11 sample
|
|
values, the method sorts them and assigns the following percentiles:
|
|
0%, 10%, 20%, 30%, 40%, 50%, 60%, 70%, 80%, 90%, 100%.
|
|
|
|
.. doctest::
|
|
|
|
# Decile cut points for empirically sampled data
|
|
>>> data = [105, 129, 87, 86, 111, 111, 89, 81, 108, 92, 110,
|
|
... 100, 75, 105, 103, 109, 76, 119, 99, 91, 103, 129,
|
|
... 106, 101, 84, 111, 74, 87, 86, 103, 103, 106, 86,
|
|
... 111, 75, 87, 102, 121, 111, 88, 89, 101, 106, 95,
|
|
... 103, 107, 101, 81, 109, 104]
|
|
>>> [round(q, 1) for q in quantiles(data, n=10)]
|
|
[81.0, 86.2, 89.0, 99.4, 102.5, 103.6, 106.0, 109.8, 111.0]
|
|
|
|
.. versionadded:: 3.8
|
|
|
|
.. versionchanged:: 3.13
|
|
No longer raises an exception for an input with only a single data point.
|
|
This allows quantile estimates to be built up one sample point
|
|
at a time becoming gradually more refined with each new data point.
|
|
|
|
.. function:: covariance(x, y, /)
|
|
|
|
Return the sample covariance of two inputs *x* and *y*. Covariance
|
|
is a measure of the joint variability of two inputs.
|
|
|
|
Both inputs must be of the same length (no less than two), otherwise
|
|
:exc:`StatisticsError` is raised.
|
|
|
|
Examples:
|
|
|
|
.. doctest::
|
|
|
|
>>> x = [1, 2, 3, 4, 5, 6, 7, 8, 9]
|
|
>>> y = [1, 2, 3, 1, 2, 3, 1, 2, 3]
|
|
>>> covariance(x, y)
|
|
0.75
|
|
>>> z = [9, 8, 7, 6, 5, 4, 3, 2, 1]
|
|
>>> covariance(x, z)
|
|
-7.5
|
|
>>> covariance(z, x)
|
|
-7.5
|
|
|
|
.. versionadded:: 3.10
|
|
|
|
.. function:: correlation(x, y, /, *, method='linear')
|
|
|
|
Return the `Pearson's correlation coefficient
|
|
<https://en.wikipedia.org/wiki/Pearson_correlation_coefficient>`_
|
|
for two inputs. Pearson's correlation coefficient *r* takes values
|
|
between -1 and +1. It measures the strength and direction of a linear
|
|
relationship.
|
|
|
|
If *method* is "ranked", computes `Spearman's rank correlation coefficient
|
|
<https://en.wikipedia.org/wiki/Spearman%27s_rank_correlation_coefficient>`_
|
|
for two inputs. The data is replaced by ranks. Ties are averaged so that
|
|
equal values receive the same rank. The resulting coefficient measures the
|
|
strength of a monotonic relationship.
|
|
|
|
Spearman's correlation coefficient is appropriate for ordinal data or for
|
|
continuous data that doesn't meet the linear proportion requirement for
|
|
Pearson's correlation coefficient.
|
|
|
|
Both inputs must be of the same length (no less than two), and need
|
|
not to be constant, otherwise :exc:`StatisticsError` is raised.
|
|
|
|
Example with `Kepler's laws of planetary motion
|
|
<https://en.wikipedia.org/wiki/Kepler's_laws_of_planetary_motion>`_:
|
|
|
|
.. doctest::
|
|
|
|
>>> # Mercury, Venus, Earth, Mars, Jupiter, Saturn, Uranus, and Neptune
|
|
>>> orbital_period = [88, 225, 365, 687, 4331, 10_756, 30_687, 60_190] # days
|
|
>>> dist_from_sun = [58, 108, 150, 228, 778, 1_400, 2_900, 4_500] # million km
|
|
|
|
>>> # Show that a perfect monotonic relationship exists
|
|
>>> correlation(orbital_period, dist_from_sun, method='ranked')
|
|
1.0
|
|
|
|
>>> # Observe that a linear relationship is imperfect
|
|
>>> round(correlation(orbital_period, dist_from_sun), 4)
|
|
0.9882
|
|
|
|
>>> # Demonstrate Kepler's third law: There is a linear correlation
|
|
>>> # between the square of the orbital period and the cube of the
|
|
>>> # distance from the sun.
|
|
>>> period_squared = [p * p for p in orbital_period]
|
|
>>> dist_cubed = [d * d * d for d in dist_from_sun]
|
|
>>> round(correlation(period_squared, dist_cubed), 4)
|
|
1.0
|
|
|
|
.. versionadded:: 3.10
|
|
|
|
.. versionchanged:: 3.12
|
|
Added support for Spearman's rank correlation coefficient.
|
|
|
|
.. function:: linear_regression(x, y, /, *, proportional=False)
|
|
|
|
Return the slope and intercept of `simple linear regression
|
|
<https://en.wikipedia.org/wiki/Simple_linear_regression>`_
|
|
parameters estimated using ordinary least squares. Simple linear
|
|
regression describes the relationship between an independent variable *x* and
|
|
a dependent variable *y* in terms of this linear function:
|
|
|
|
*y = slope \* x + intercept + noise*
|
|
|
|
where ``slope`` and ``intercept`` are the regression parameters that are
|
|
estimated, and ``noise`` represents the
|
|
variability of the data that was not explained by the linear regression
|
|
(it is equal to the difference between predicted and actual values
|
|
of the dependent variable).
|
|
|
|
Both inputs must be of the same length (no less than two), and
|
|
the independent variable *x* cannot be constant;
|
|
otherwise a :exc:`StatisticsError` is raised.
|
|
|
|
For example, we can use the `release dates of the Monty
|
|
Python films <https://en.wikipedia.org/wiki/Monty_Python#Films>`_
|
|
to predict the cumulative number of Monty Python films
|
|
that would have been produced by 2019
|
|
assuming that they had kept the pace.
|
|
|
|
.. doctest::
|
|
|
|
>>> year = [1971, 1975, 1979, 1982, 1983]
|
|
>>> films_total = [1, 2, 3, 4, 5]
|
|
>>> slope, intercept = linear_regression(year, films_total)
|
|
>>> round(slope * 2019 + intercept)
|
|
16
|
|
|
|
If *proportional* is true, the independent variable *x* and the
|
|
dependent variable *y* are assumed to be directly proportional.
|
|
The data is fit to a line passing through the origin.
|
|
Since the *intercept* will always be 0.0, the underlying linear
|
|
function simplifies to:
|
|
|
|
*y = slope \* x + noise*
|
|
|
|
Continuing the example from :func:`correlation`, we look to see
|
|
how well a model based on major planets can predict the orbital
|
|
distances for dwarf planets:
|
|
|
|
.. doctest::
|
|
|
|
>>> model = linear_regression(period_squared, dist_cubed, proportional=True)
|
|
>>> slope = model.slope
|
|
|
|
>>> # Dwarf planets: Pluto, Eris, Makemake, Haumea, Ceres
|
|
>>> orbital_periods = [90_560, 204_199, 111_845, 103_410, 1_680] # days
|
|
>>> predicted_dist = [math.cbrt(slope * (p * p)) for p in orbital_periods]
|
|
>>> list(map(round, predicted_dist))
|
|
[5912, 10166, 6806, 6459, 414]
|
|
|
|
>>> [5_906, 10_152, 6_796, 6_450, 414] # actual distance in million km
|
|
[5906, 10152, 6796, 6450, 414]
|
|
|
|
.. versionadded:: 3.10
|
|
|
|
.. versionchanged:: 3.11
|
|
Added support for *proportional*.
|
|
|
|
Exceptions
|
|
----------
|
|
|
|
A single exception is defined:
|
|
|
|
.. exception:: StatisticsError
|
|
|
|
Subclass of :exc:`ValueError` for statistics-related exceptions.
|
|
|
|
|
|
:class:`NormalDist` objects
|
|
---------------------------
|
|
|
|
:class:`NormalDist` is a tool for creating and manipulating normal
|
|
distributions of a `random variable
|
|
<http://www.stat.yale.edu/Courses/1997-98/101/ranvar.htm>`_. It is a
|
|
class that treats the mean and standard deviation of data
|
|
measurements as a single entity.
|
|
|
|
Normal distributions arise from the `Central Limit Theorem
|
|
<https://en.wikipedia.org/wiki/Central_limit_theorem>`_ and have a wide range
|
|
of applications in statistics.
|
|
|
|
.. class:: NormalDist(mu=0.0, sigma=1.0)
|
|
|
|
Returns a new *NormalDist* object where *mu* represents the `arithmetic
|
|
mean <https://en.wikipedia.org/wiki/Arithmetic_mean>`_ and *sigma*
|
|
represents the `standard deviation
|
|
<https://en.wikipedia.org/wiki/Standard_deviation>`_.
|
|
|
|
If *sigma* is negative, raises :exc:`StatisticsError`.
|
|
|
|
.. attribute:: mean
|
|
|
|
A read-only property for the `arithmetic mean
|
|
<https://en.wikipedia.org/wiki/Arithmetic_mean>`_ of a normal
|
|
distribution.
|
|
|
|
.. attribute:: median
|
|
|
|
A read-only property for the `median
|
|
<https://en.wikipedia.org/wiki/Median>`_ of a normal
|
|
distribution.
|
|
|
|
.. attribute:: mode
|
|
|
|
A read-only property for the `mode
|
|
<https://en.wikipedia.org/wiki/Mode_(statistics)>`_ of a normal
|
|
distribution.
|
|
|
|
.. attribute:: stdev
|
|
|
|
A read-only property for the `standard deviation
|
|
<https://en.wikipedia.org/wiki/Standard_deviation>`_ of a normal
|
|
distribution.
|
|
|
|
.. attribute:: variance
|
|
|
|
A read-only property for the `variance
|
|
<https://en.wikipedia.org/wiki/Variance>`_ of a normal
|
|
distribution. Equal to the square of the standard deviation.
|
|
|
|
.. classmethod:: NormalDist.from_samples(data)
|
|
|
|
Makes a normal distribution instance with *mu* and *sigma* parameters
|
|
estimated from the *data* using :func:`fmean` and :func:`stdev`.
|
|
|
|
The *data* can be any :term:`iterable` and should consist of values
|
|
that can be converted to type :class:`float`. If *data* does not
|
|
contain at least two elements, raises :exc:`StatisticsError` because it
|
|
takes at least one point to estimate a central value and at least two
|
|
points to estimate dispersion.
|
|
|
|
.. method:: NormalDist.samples(n, *, seed=None)
|
|
|
|
Generates *n* random samples for a given mean and standard deviation.
|
|
Returns a :class:`list` of :class:`float` values.
|
|
|
|
If *seed* is given, creates a new instance of the underlying random
|
|
number generator. This is useful for creating reproducible results,
|
|
even in a multi-threading context.
|
|
|
|
.. versionchanged:: 3.13
|
|
|
|
Switched to a faster algorithm. To reproduce samples from previous
|
|
versions, use :func:`random.seed` and :func:`random.gauss`.
|
|
|
|
.. method:: NormalDist.pdf(x)
|
|
|
|
Using a `probability density function (pdf)
|
|
<https://en.wikipedia.org/wiki/Probability_density_function>`_, compute
|
|
the relative likelihood that a random variable *X* will be near the
|
|
given value *x*. Mathematically, it is the limit of the ratio ``P(x <=
|
|
X < x+dx) / dx`` as *dx* approaches zero.
|
|
|
|
The relative likelihood is computed as the probability of a sample
|
|
occurring in a narrow range divided by the width of the range (hence
|
|
the word "density"). Since the likelihood is relative to other points,
|
|
its value can be greater than ``1.0``.
|
|
|
|
.. method:: NormalDist.cdf(x)
|
|
|
|
Using a `cumulative distribution function (cdf)
|
|
<https://en.wikipedia.org/wiki/Cumulative_distribution_function>`_,
|
|
compute the probability that a random variable *X* will be less than or
|
|
equal to *x*. Mathematically, it is written ``P(X <= x)``.
|
|
|
|
.. method:: NormalDist.inv_cdf(p)
|
|
|
|
Compute the inverse cumulative distribution function, also known as the
|
|
`quantile function <https://en.wikipedia.org/wiki/Quantile_function>`_
|
|
or the `percent-point
|
|
<https://web.archive.org/web/20190203145224/https://www.statisticshowto.datasciencecentral.com/inverse-distribution-function/>`_
|
|
function. Mathematically, it is written ``x : P(X <= x) = p``.
|
|
|
|
Finds the value *x* of the random variable *X* such that the
|
|
probability of the variable being less than or equal to that value
|
|
equals the given probability *p*.
|
|
|
|
.. method:: NormalDist.overlap(other)
|
|
|
|
Measures the agreement between two normal probability distributions.
|
|
Returns a value between 0.0 and 1.0 giving `the overlapping area for
|
|
the two probability density functions
|
|
<https://www.rasch.org/rmt/rmt101r.htm>`_.
|
|
|
|
.. method:: NormalDist.quantiles(n=4)
|
|
|
|
Divide the normal distribution into *n* continuous intervals with
|
|
equal probability. Returns a list of (n - 1) cut points separating
|
|
the intervals.
|
|
|
|
Set *n* to 4 for quartiles (the default). Set *n* to 10 for deciles.
|
|
Set *n* to 100 for percentiles which gives the 99 cuts points that
|
|
separate the normal distribution into 100 equal sized groups.
|
|
|
|
.. method:: NormalDist.zscore(x)
|
|
|
|
Compute the
|
|
`Standard Score <https://www.statisticshowto.com/probability-and-statistics/z-score/>`_
|
|
describing *x* in terms of the number of standard deviations
|
|
above or below the mean of the normal distribution:
|
|
``(x - mean) / stdev``.
|
|
|
|
.. versionadded:: 3.9
|
|
|
|
Instances of :class:`NormalDist` support addition, subtraction,
|
|
multiplication and division by a constant. These operations
|
|
are used for translation and scaling. For example:
|
|
|
|
.. doctest::
|
|
|
|
>>> temperature_february = NormalDist(5, 2.5) # Celsius
|
|
>>> temperature_february * (9/5) + 32 # Fahrenheit
|
|
NormalDist(mu=41.0, sigma=4.5)
|
|
|
|
Dividing a constant by an instance of :class:`NormalDist` is not supported
|
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because the result wouldn't be normally distributed.
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Since normal distributions arise from additive effects of independent
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variables, it is possible to `add and subtract two independent normally
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distributed random variables
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<https://en.wikipedia.org/wiki/Sum_of_normally_distributed_random_variables>`_
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represented as instances of :class:`NormalDist`. For example:
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.. doctest::
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>>> birth_weights = NormalDist.from_samples([2.5, 3.1, 2.1, 2.4, 2.7, 3.5])
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>>> drug_effects = NormalDist(0.4, 0.15)
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>>> combined = birth_weights + drug_effects
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>>> round(combined.mean, 1)
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3.1
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>>> round(combined.stdev, 1)
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0.5
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.. versionadded:: 3.8
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Examples and Recipes
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--------------------
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Classic probability problems
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****************************
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:class:`NormalDist` readily solves classic probability problems.
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For example, given `historical data for SAT exams
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<https://nces.ed.gov/programs/digest/d17/tables/dt17_226.40.asp>`_ showing
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that scores are normally distributed with a mean of 1060 and a standard
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deviation of 195, determine the percentage of students with test scores
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between 1100 and 1200, after rounding to the nearest whole number:
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.. doctest::
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>>> sat = NormalDist(1060, 195)
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>>> fraction = sat.cdf(1200 + 0.5) - sat.cdf(1100 - 0.5)
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>>> round(fraction * 100.0, 1)
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18.4
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Find the `quartiles <https://en.wikipedia.org/wiki/Quartile>`_ and `deciles
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<https://en.wikipedia.org/wiki/Decile>`_ for the SAT scores:
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.. doctest::
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>>> list(map(round, sat.quantiles()))
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[928, 1060, 1192]
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>>> list(map(round, sat.quantiles(n=10)))
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[810, 896, 958, 1011, 1060, 1109, 1162, 1224, 1310]
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Monte Carlo inputs for simulations
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**********************************
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To estimate the distribution for a model that isn't easy to solve
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analytically, :class:`NormalDist` can generate input samples for a `Monte
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Carlo simulation <https://en.wikipedia.org/wiki/Monte_Carlo_method>`_:
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.. doctest::
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>>> def model(x, y, z):
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... return (3*x + 7*x*y - 5*y) / (11 * z)
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...
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>>> n = 100_000
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>>> X = NormalDist(10, 2.5).samples(n, seed=3652260728)
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>>> Y = NormalDist(15, 1.75).samples(n, seed=4582495471)
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>>> Z = NormalDist(50, 1.25).samples(n, seed=6582483453)
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>>> quantiles(map(model, X, Y, Z)) # doctest: +SKIP
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[1.4591308524824727, 1.8035946855390597, 2.175091447274739]
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Approximating binomial distributions
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************************************
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Normal distributions can be used to approximate `Binomial
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distributions <https://mathworld.wolfram.com/BinomialDistribution.html>`_
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when the sample size is large and when the probability of a successful
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trial is near 50%.
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For example, an open source conference has 750 attendees and two rooms with a
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500 person capacity. There is a talk about Python and another about Ruby.
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In previous conferences, 65% of the attendees preferred to listen to Python
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talks. Assuming the population preferences haven't changed, what is the
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probability that the Python room will stay within its capacity limits?
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.. doctest::
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>>> n = 750 # Sample size
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>>> p = 0.65 # Preference for Python
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>>> q = 1.0 - p # Preference for Ruby
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>>> k = 500 # Room capacity
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>>> # Approximation using the cumulative normal distribution
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>>> from math import sqrt
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>>> round(NormalDist(mu=n*p, sigma=sqrt(n*p*q)).cdf(k + 0.5), 4)
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0.8402
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>>> # Exact solution using the cumulative binomial distribution
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>>> from math import comb, fsum
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>>> round(fsum(comb(n, r) * p**r * q**(n-r) for r in range(k+1)), 4)
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0.8402
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>>> # Approximation using a simulation
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>>> from random import seed, binomialvariate
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>>> seed(8675309)
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>>> mean(binomialvariate(n, p) <= k for i in range(10_000))
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0.8406
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Naive bayesian classifier
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*************************
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Normal distributions commonly arise in machine learning problems.
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Wikipedia has a `nice example of a Naive Bayesian Classifier
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<https://en.wikipedia.org/wiki/Naive_Bayes_classifier#Person_classification>`_.
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The challenge is to predict a person's gender from measurements of normally
|
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distributed features including height, weight, and foot size.
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We're given a training dataset with measurements for eight people. The
|
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measurements are assumed to be normally distributed, so we summarize the data
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with :class:`NormalDist`:
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|
|
.. doctest::
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|
>>> height_male = NormalDist.from_samples([6, 5.92, 5.58, 5.92])
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>>> height_female = NormalDist.from_samples([5, 5.5, 5.42, 5.75])
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|
>>> weight_male = NormalDist.from_samples([180, 190, 170, 165])
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>>> weight_female = NormalDist.from_samples([100, 150, 130, 150])
|
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>>> foot_size_male = NormalDist.from_samples([12, 11, 12, 10])
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>>> foot_size_female = NormalDist.from_samples([6, 8, 7, 9])
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|
|
Next, we encounter a new person whose feature measurements are known but whose
|
|
gender is unknown:
|
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|
|
.. doctest::
|
|
|
|
>>> ht = 6.0 # height
|
|
>>> wt = 130 # weight
|
|
>>> fs = 8 # foot size
|
|
|
|
Starting with a 50% `prior probability
|
|
<https://en.wikipedia.org/wiki/Prior_probability>`_ of being male or female,
|
|
we compute the posterior as the prior times the product of likelihoods for the
|
|
feature measurements given the gender:
|
|
|
|
.. doctest::
|
|
|
|
>>> prior_male = 0.5
|
|
>>> prior_female = 0.5
|
|
>>> posterior_male = (prior_male * height_male.pdf(ht) *
|
|
... weight_male.pdf(wt) * foot_size_male.pdf(fs))
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|
|
|
>>> posterior_female = (prior_female * height_female.pdf(ht) *
|
|
... weight_female.pdf(wt) * foot_size_female.pdf(fs))
|
|
|
|
The final prediction goes to the largest posterior. This is known as the
|
|
`maximum a posteriori
|
|
<https://en.wikipedia.org/wiki/Maximum_a_posteriori_estimation>`_ or MAP:
|
|
|
|
.. doctest::
|
|
|
|
>>> 'male' if posterior_male > posterior_female else 'female'
|
|
'female'
|
|
|
|
|
|
..
|
|
# This modelines must appear within the last ten lines of the file.
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|
kate: indent-width 3; remove-trailing-space on; replace-tabs on; encoding utf-8;
|