python-peps/pep-0239.txt

PEP: 239
Title: Adding a Rational Type to Python
Version: $Revision$
Author: pep@zadka.site.co.il (Moshe Zadka)
Status: Draft
Type: Standards Track
Created: 11-Mar-2001
Python-Version: 2.2
Post-History: 16-Mar-2001


Abstract

    Python has no numeric type with the semantics of an unboundedly
    precise rational number.  This proposal explains the semantics of
    such a type, and suggests builtin functions and literals to
    support such a type.  This PEP suggests no literals for rational
    numbers; that is left for another PEP[1].


Rationale

    While sometimes slower and more memory intensive (in general,
    unboundedly so) rational arithmetic captures more closely the
    mathematical ideal of numbers, and tends to have behavior which is
    less surprising to newbies.  Though many Python implementations of
    rational numbers have been written, none of these exist in the
    core, or are documented in any way.  This has made them much less
    accessible to people who are less Python-savvy.


RationalType

    There will be a new numeric type added called RationalType.  Its
    unary operators will do the obvious thing.  Binary operators will
    coerce integers and long integers to rationals, and rationals to
    floats and complexes.

    The following attributes will be supported: .numerator and
    .denominator.  The language definition will promise that

        r.denominator * r == r.numerator

    that the GCD of the numerator and the denominator is 1 and that
    the denominator is positive.

    The method r.trim(max_denominator) will return the closest
    rational s to r such that abs(s.denominator) <= max_denominator.


The rational() Builtin

    This function will have the signature rational(n, d=1).  n and d
    must both be integers, long integers or rationals.  A guarantee is
    made that

        rational(n, d) * d == n


References

    [1] PEP 240, Adding a Rational Literal to Python, Zadka,
        http://python.sourceforge.net/peps/pep-0240.html


Copyright

    This document has been placed in the public domain.



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