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Basic statistics module.

This module provides functions for calculating statistics of data, including
averages, variance, and standard deviation.

Calculating averages
--------------------

==================  =============================================
Function            Description
==================  =============================================
mean                Arithmetic mean (average) of data.
harmonic_mean       Harmonic mean of data.
median              Median (middle value) of data.
median_low          Low median of data.
median_high         High median of data.
median_grouped      Median, or 50th percentile, of grouped data.
mode                Mode (most common value) of data.
==================  =============================================

Calculate the arithmetic mean ("the average") of data:

>>> mean([-1.0, 2.5, 3.25, 5.75])
2.625


Calculate the standard median of discrete data:

>>> median([2, 3, 4, 5])
3.5


Calculate the median, or 50th percentile, of data grouped into class intervals
centred on the data values provided. E.g. if your data points are rounded to
the nearest whole number:

>>> median_grouped([2, 2, 3, 3, 3, 4])  #doctest: +ELLIPSIS
2.8333333333...

This should be interpreted in this way: you have two data points in the class
interval 1.5-2.5, three data points in the class interval 2.5-3.5, and one in
the class interval 3.5-4.5. The median of these data points is 2.8333...


Calculating variability or spread
---------------------------------

==================  =============================================
Function            Description
==================  =============================================
pvariance           Population variance of data.
variance            Sample variance of data.
pstdev              Population standard deviation of data.
stdev               Sample standard deviation of data.
==================  =============================================

Calculate the standard deviation of sample data:

>>> stdev([2.5, 3.25, 5.5, 11.25, 11.75])  #doctest: +ELLIPSIS
4.38961843444...

If you have previously calculated the mean, you can pass it as the optional
second argument to the four "spread" functions to avoid recalculating it:

>>> data = [1, 2, 2, 4, 4, 4, 5, 6]
>>> mu = mean(data)
>>> pvariance(data, mu)
2.5


Exceptions
----------

A single exception is defined: StatisticsError is a subclass of ValueError.

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    Return a high-precision sum of the given numeric data as a fraction,
    together with the type to be converted to and the count of items.

    If optional argument ``start`` is given, it is added to the total.
    If ``data`` is empty, ``start`` (defaulting to 0) is returned.


    Examples
    --------

    >>> _sum([3, 2.25, 4.5, -0.5, 1.0], 0.75)
    (<class 'float'>, Fraction(11, 1), 5)

    Some sources of round-off error will be avoided:

    # Built-in sum returns zero.
    >>> _sum([1e50, 1, -1e50] * 1000)
    (<class 'float'>, Fraction(1000, 1), 3000)

    Fractions and Decimals are also supported:

    >>> from fractions import Fraction as F
    >>> _sum([F(2, 3), F(7, 5), F(1, 4), F(5, 6)])
    (<class 'fractions.Fraction'>, Fraction(63, 20), 4)

    >>> from decimal import Decimal as D
    >>> data = [D("0.1375"), D("0.2108"), D("0.3061"), D("0.0419")]
    >>> _sum(data)
    (<class 'decimal.Decimal'>, Fraction(6963, 10000), 4)

    Mixed types are currently treated as an error, except that int is
    allowed.
    r
�Ncss|]\}}t||�VqdS)N)r)�.0�d�nrrr�	<genexpr>�sz_sum.<locals>.<genexpr>)�_exact_ratio�get�_coerce�int�typer�map�	_isfinite�AssertionError�sum�sorted�items)�data�start�countrrZpartialsZpartials_get�T�typ�values�totalrrr�_sumis$
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r"tj|�SXdS)N)Z	is_finite�AttributeError�mathZisfinite)�xrrrr$�sr$cCs�|tk	std��||kr|S|tks,|tkr0|S|tkr<|St||�rJ|St||�rX|St|t�rf|St|t�rt|St|t�r�t|t�r�|St|t�r�t|t�r�|Sd}t||j|jf��dS)z�Coerce types T and S to a common type, or raise TypeError.

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    zinitial type T is boolz"don't know how to coerce %s and %sN)�boolr%r!�
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rAcCs`tjt|��j�}|s|S|dd}x4tdt|��D]"}||d|kr6|d|�}Pq6W|S)Nr
r)�collections�Counter�iter�most_common�range�len)r)�tableZmaxfreq�irrr�_counts�srJcCs.t||�}|t|�kr&|||kr&|St�dS)z,Locate the leftmost value exactly equal to xN)rrGr>)�ar3rIrrr�
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rRcCsTt|�|krt|�}t|�}|dkr,td��t|�\}}}||ksFt�t|||�S)a�Return the sample arithmetic mean of data.

    >>> mean([1, 2, 3, 4, 4])
    2.8

    >>> from fractions import Fraction as F
    >>> mean([F(3, 7), F(1, 21), F(5, 3), F(1, 3)])
    Fraction(13, 21)

    >>> from decimal import Decimal as D
    >>> mean([D("0.5"), D("0.75"), D("0.625"), D("0.375")])
    Decimal('0.5625')

    If ``data`` is empty, StatisticsError will be raised.
    rz%mean requires at least one data point)rD�listrGrr0r%rA)r)rr,r/r+rrrr
#scCs�t|�|krt|�}d}t|�}|dkr2td��n<|dkrn|d}t|tjtf�rf|dkrbt|��|Std��y"t	dd�t
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|||�S)aReturn the harmonic mean of data.

    The harmonic mean, sometimes called the subcontrary mean, is the
    reciprocal of the arithmetic mean of the reciprocals of the data,
    and is often appropriate when averaging quantities which are rates
    or ratios, for example speeds. Example:

    Suppose an investor purchases an equal value of shares in each of
    three companies, with P/E (price/earning) ratios of 2.5, 3 and 10.
    What is the average P/E ratio for the investor's portfolio?

    >>> harmonic_mean([2.5, 3, 10])  # For an equal investment portfolio.
    3.6

    Using the arithmetic mean would give an average of about 5.167, which
    is too high.

    If ``data`` is empty, or any element is less than zero,
    ``harmonic_mean`` will raise ``StatisticsError``.
    z.harmonic mean does not support negative valuesrz.harmonic_mean requires at least one data pointr
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"cCs\t|�}t|�}|dkr td��|ddkr8||dS|d}||d||dSdS)aBReturn the median (middle value) of numeric data.

    When the number of data points is odd, return the middle data point.
    When the number of data points is even, the median is interpolated by
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    >>> median([1, 3, 5])
    3
    >>> median([1, 3, 5, 7])
    4.0

    r
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cCsLt|�}t|�}|dkr td��|ddkr8||dS||ddSdS)a	Return the low median of numeric data.

    When the number of data points is odd, the middle value is returned.
    When it is even, the smaller of the two middle values is returned.

    >>> median_low([1, 3, 5])
    3
    >>> median_low([1, 3, 5, 7])
    3

    r
zno median for empty datarWrN)r'rGr)r)rrrrr�scCs,t|�}t|�}|dkr td��||dS)aReturn the high median of data.

    When the number of data points is odd, the middle value is returned.
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    >>> median_high([1, 3, 5])
    3
    >>> median_high([1, 3, 5, 7])
    5

    r
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r�t|�t|�d}YnXt||�}t	|||�}|}||d}	|||d||	S)a�Return the 50th percentile (median) of grouped continuous data.

    >>> median_grouped([1, 2, 2, 3, 4, 4, 4, 4, 4, 5])
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    >>> median_grouped([52, 52, 53, 54])
    52.5

    This calculates the median as the 50th percentile, and should be
    used when your data is continuous and grouped. In the above example,
    the values 1, 2, 3, etc. actually represent the midpoint of classes
    0.5-1.5, 1.5-2.5, 2.5-3.5, etc. The middle value falls somewhere in
    class 3.5-4.5, and interpolation is used to estimate it.

    Optional argument ``interval`` represents the class interval, and
    defaults to 1. Changing the class interval naturally will change the
    interpolated 50th percentile value:

    >>> median_grouped([1, 3, 3, 5, 7], interval=1)
    3.25
    >>> median_grouped([1, 3, 3, 5, 7], interval=2)
    3.5

    This function does not check whether the data points are at least
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cCsBt|�}t|�dkr |ddS|r6tdt|���ntd��dS)a�Return the most common data point from discrete or nominal data.

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    3

    This also works with nominal (non-numeric) data:

    >>> mode(["red", "blue", "blue", "red", "green", "red", "red"])
    'red'

    If there is not exactly one most common value, ``mode`` will raise
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    Nc3s|]}|�dVqdS)rWNr)rr3)�crrrsz_ss.<locals>.<genexpr>c3s|]}|�VqdS)Nr)rr3)r_rrrsrWr
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    Use this function when your data is a sample from a population. To
    calculate the variance from the entire population, see ``pvariance``.

    Examples:

    >>> 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 mean of your data, you can pass it as
    the optional second argument ``xbar`` to avoid recalculating it:

    >>> m = mean(data)
    >>> variance(data, m)
    1.3720238095238095

    This function does not check that ``xbar`` is actually the mean of
    ``data``. Giving arbitrary values for ``xbar`` may lead to invalid or
    impossible results.

    Decimals and Fractions are supported:

    >>> 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)

    rWz*variance requires at least two data pointsr)rDrSrGrrarA)r)�xbarrr,�ssrrrr"s&cCsHt|�|krt|�}t|�}|dkr,td��t||�\}}t|||�S)a�Return the population variance of ``data``.

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    the data. If it is missing or None, the mean is automatically calculated.

    Use this function to calculate the variance from the entire population.
    To estimate the variance from a sample, the ``variance`` function is
    usually a better choice.

    Examples:

    >>> 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 the data, you can pass it as
    the optional second argument to avoid recalculating it:

    >>> mu = mean(data)
    >>> pvariance(data, mu)
    1.25

    This function does not check that ``mu`` is actually the mean of ``data``.
    Giving arbitrary values for ``mu`` may lead to invalid or impossible
    results.

    Decimals and Fractions are supported:

    >>> 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)

    rz*pvariance requires at least one data point)rDrSrGrrarA)r)�murr,rcrrrrQs'cCs2t||�}y|j�Stk
r,tj|�SXdS)z�Return the square root of the sample variance.

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    1.0810874155219827

    N)r�sqrtr1r2)r)rb�varrrrr�s
	
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r,tj|�SXdS)z�Return the square root of the population variance.

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    >>> pstdev([1.5, 2.5, 2.5, 2.75, 3.25, 4.75])
    0.986893273527251

    N)rrer1r2)r)rdrfrrrr�s
	
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