Doc/library/fractions.rst - platform/external/python/cpython3 - Gitiles


 :mod:`fractions` --- Rational numbers
 =====================================

 .. module:: fractions
    :synopsis: Rational numbers.
 .. moduleauthor:: Jeffrey Yasskin <jyasskin at gmail.com>
 .. sectionauthor:: Jeffrey Yasskin <jyasskin at gmail.com>
 .. versionadded:: 2.6


 The :mod:`fractions` module defines an immutable, infinite-precision
 Rational number class.


 .. class:: Fraction(numerator=0, denominator=1)
            Fraction(other_fraction)
            Fraction(string)

    The first version requires that *numerator* and *denominator* are
    instances of :class:`numbers.Integral` and returns a new
    ``Fraction`` representing ``numerator/denominator``. If
    *denominator* is :const:`0`, raises a :exc:`ZeroDivisionError`. The
    second version requires that *other_fraction* is an instance of
    :class:`numbers.Fraction` and returns an instance of
    :class:`Rational` with the same value. The third version expects a
    string of the form ``[-+]?[0-9]+(/[0-9]+)?``, optionally surrounded
    by spaces.

    Implements all of the methods and operations from
    :class:`numbers.Rational` and is immutable and hashable.


 .. method:: Fraction.from_float(flt)

    This classmethod constructs a :class:`Fraction` representing the
    exact value of *flt*, which must be a :class:`float`. Beware that
    ``Fraction.from_float(0.3)`` is not the same value as ``Rational(3,
    10)``


 .. method:: Fraction.from_decimal(dec)

    This classmethod constructs a :class:`Fraction` representing the
    exact value of *dec*, which must be a
    :class:`decimal.Decimal`.


 .. method:: Fraction.limit_denominator(max_denominator=1000000)

    Finds and returns the closest :class:`Fraction` to ``self`` that
    has denominator at most max_denominator.  This method is useful for
    finding rational approximations to a given floating-point number:

       >>> from fractions import Fraction
       >>> Fraction('3.1415926535897932').limit_denominator(1000)
       Fraction(355L, 113L)

    or for recovering a rational number that's represented as a float:

       >>> from math import pi, cos
       >>> Fraction.from_float(cos(pi/3))
       Fraction(4503599627370497L, 9007199254740992L)
       >>> Fraction.from_float(cos(pi/3)).limit_denominator()
       Fraction(1L, 2L)


 .. method:: Fraction.__floor__()

    Returns the greatest :class:`int` ``<= self``. Will be accessible
    through :func:`math.floor` in Py3k.


 .. method:: Fraction.__ceil__()

    Returns the least :class:`int` ``>= self``. Will be accessible
    through :func:`math.ceil` in Py3k.


 .. method:: Fraction.__round__()
             Fraction.__round__(ndigits)

    The first version returns the nearest :class:`int` to ``self``,
    rounding half to even. The second version rounds ``self`` to the
    nearest multiple of ``Fraction(1, 10**ndigits)`` (logically, if
    ``ndigits`` is negative), again rounding half toward even. Will be
    accessible through :func:`round` in Py3k.


 .. seealso::

    Module :mod:`numbers`
       The abstract base classes making up the numeric tower.

	:mod:`fractions` --- Rational numbers
	=====================================

	.. module:: fractions
	:synopsis: Rational numbers.
	.. moduleauthor:: Jeffrey Yasskin <jyasskin at gmail.com>
	.. sectionauthor:: Jeffrey Yasskin <jyasskin at gmail.com>
	.. versionadded:: 2.6


	The :mod:`fractions` module defines an immutable, infinite-precision
	Rational number class.


	.. class:: Fraction(numerator=0, denominator=1)
	Fraction(other_fraction)
	Fraction(string)

	The first version requires that numerator and denominator are
	instances of :class:`numbers.Integral` and returns a new
	``Fraction`` representing ``numerator/denominator``. If
	denominator is :const:`0`, raises a :exc:`ZeroDivisionError`. The
	second version requires that other_fraction is an instance of
	:class:`numbers.Fraction` and returns an instance of
	:class:`Rational` with the same value. The third version expects a
	string of the form ``[-+]?[0-9]+(/[0-9]+)?``, optionally surrounded
	by spaces.

	Implements all of the methods and operations from
	:class:`numbers.Rational` and is immutable and hashable.


	.. method:: Fraction.from_float(flt)

	This classmethod constructs a :class:`Fraction` representing the
	exact value of flt, which must be a :class:`float`. Beware that
	``Fraction.from_float(0.3)`` is not the same value as ``Rational(3,
	10)``


	.. method:: Fraction.from_decimal(dec)

	This classmethod constructs a :class:`Fraction` representing the
	exact value of dec, which must be a
	:class:`decimal.Decimal`.


	.. method:: Fraction.limit_denominator(max_denominator=1000000)

	Finds and returns the closest :class:`Fraction` to ``self`` that
	has denominator at most max_denominator. This method is useful for
	finding rational approximations to a given floating-point number:

	>>> from fractions import Fraction
	>>> Fraction('3.1415926535897932').limit_denominator(1000)
	Fraction(355L, 113L)

	or for recovering a rational number that's represented as a float:

	>>> from math import pi, cos
	>>> Fraction.from_float(cos(pi/3))
	Fraction(4503599627370497L, 9007199254740992L)
	>>> Fraction.from_float(cos(pi/3)).limit_denominator()
	Fraction(1L, 2L)


	.. method:: Fraction.__floor__()

	Returns the greatest :class:`int` ``<= self``. Will be accessible
	through :func:`math.floor` in Py3k.


	.. method:: Fraction.__ceil__()

	Returns the least :class:`int` ``>= self``. Will be accessible
	through :func:`math.ceil` in Py3k.


	.. method:: Fraction.__round__()
	Fraction.__round__(ndigits)

	The first version returns the nearest :class:`int` to ``self``,
	rounding half to even. The second version rounds ``self`` to the
	nearest multiple of ``Fraction(1, 10**ndigits)`` (logically, if
	``ndigits`` is negative), again rounding half toward even. Will be
	accessible through :func:`round` in Py3k.


	.. seealso::

	Module :mod:`numbers`
	The abstract base classes making up the numeric tower.