numbers — Numeric abstract base classes
Source code: Lib/numbers.py
The numbers
module (PEP 3141) defines a hierarchy of numeric abstract base classes which progressively define more operations. None of the types defined in this module can be instantiated.

class numbers.Number

The root of the numeric hierarchy. If you just want to check if an argument x is a number, without caring what kind, use
isinstance(x, Number)
.
The numeric tower

class numbers.Complex

Subclasses of this type describe complex numbers and include the operations that work on the builtin
complex
type. These are: conversions tocomplex
andbool
,real
,imag
,+
,
,*
,/
,abs()
,conjugate()
,==
, and!=
. All except
and!=
are abstract.
real

Abstract. Retrieves the real component of this number.

imag

Abstract. Retrieves the imaginary component of this number.

abstractmethod conjugate()

Abstract. Returns the complex conjugate. For example,
(1+3j).conjugate() == (13j)
.


class numbers.Real

To
Complex
,Real
adds the operations that work on real numbers.In short, those are: a conversion to
float
,math.trunc()
,round()
,math.floor()
,math.ceil()
,divmod()
,//
,%
,<
,<=
,>
, and>=
.Real also provides defaults for
complex()
,real
,imag
, andconjugate()
.

class numbers.Rational

Subtypes
Real
and addsnumerator
anddenominator
properties, which should be in lowest terms. With these, it provides a default forfloat()
.
numerator

Abstract.

denominator

Abstract.


class numbers.Integral

Subtypes
Rational
and adds a conversion toint
. Provides defaults forfloat()
,numerator
, anddenominator
. Adds abstract methods for**
and bitstring operations:<<
,>>
,&
,^
,
,~
.
Notes for type implementors
Implementors should be careful to make equal numbers equal and hash them to the same values. This may be subtle if there are two different extensions of the real numbers. For example, fractions.Fraction
implements hash()
as follows:
def __hash__(self): if self.denominator == 1: # Get integers right. return hash(self.numerator) # Expensive check, but definitely correct. if self == float(self): return hash(float(self)) else: # Use tuple's hash to avoid a high collision rate on # simple fractions. return hash((self.numerator, self.denominator))
Adding More Numeric ABCs
There are, of course, more possible ABCs for numbers, and this would be a poor hierarchy if it precluded the possibility of adding those. You can add MyFoo
between Complex
and Real
with:
class MyFoo(Complex): ... MyFoo.register(Real)
Implementing the arithmetic operations
We want to implement the arithmetic operations so that mixedmode operations either call an implementation whose author knew about the types of both arguments, or convert both to the nearest built in type and do the operation there. For subtypes of Integral
, this means that __add__()
and __radd__()
should be defined as:
class MyIntegral(Integral): def __add__(self, other): if isinstance(other, MyIntegral): return do_my_adding_stuff(self, other) elif isinstance(other, OtherTypeIKnowAbout): return do_my_other_adding_stuff(self, other) else: return NotImplemented def __radd__(self, other): if isinstance(other, MyIntegral): return do_my_adding_stuff(other, self) elif isinstance(other, OtherTypeIKnowAbout): return do_my_other_adding_stuff(other, self) elif isinstance(other, Integral): return int(other) + int(self) elif isinstance(other, Real): return float(other) + float(self) elif isinstance(other, Complex): return complex(other) + complex(self) else: return NotImplemented
There are 5 different cases for a mixedtype operation on subclasses of Complex
. I’ll refer to all of the above code that doesn’t refer to MyIntegral
and OtherTypeIKnowAbout
as “boilerplate”. a
will be an instance of A
, which is a subtype of Complex
(a : A <: Complex
), and b : B <:
Complex
. I’ll consider a + b
:
 If
A
defines an__add__()
which acceptsb
, all is well.  If
A
falls back to the boilerplate code, and it were to return a value from__add__()
, we’d miss the possibility thatB
defines a more intelligent__radd__()
, so the boilerplate should returnNotImplemented
from__add__()
. (OrA
may not implement__add__()
at all.)  Then
B
’s__radd__()
gets a chance. If it acceptsa
, all is well.  If it falls back to the boilerplate, there are no more possible methods to try, so this is where the default implementation should live.
 If
B <: A
, Python triesB.__radd__
beforeA.__add__
. This is ok, because it was implemented with knowledge ofA
, so it can handle those instances before delegating toComplex
.
If A <: Complex
and B <: Real
without sharing any other knowledge, then the appropriate shared operation is the one involving the built in complex
, and both __radd__()
s land there, so a+b
== b+a
.
Because most of the operations on any given type will be very similar, it can be useful to define a helper function which generates the forward and reverse instances of any given operator. For example, fractions.Fraction
uses:
def _operator_fallbacks(monomorphic_operator, fallback_operator): def forward(a, b): if isinstance(b, (int, Fraction)): return monomorphic_operator(a, b) elif isinstance(b, float): return fallback_operator(float(a), b) elif isinstance(b, complex): return fallback_operator(complex(a), b) else: return NotImplemented forward.__name__ = '__' + fallback_operator.__name__ + '__' forward.__doc__ = monomorphic_operator.__doc__ def reverse(b, a): if isinstance(a, Rational): # Includes ints. return monomorphic_operator(a, b) elif isinstance(a, numbers.Real): return fallback_operator(float(a), float(b)) elif isinstance(a, numbers.Complex): return fallback_operator(complex(a), complex(b)) else: return NotImplemented reverse.__name__ = '__r' + fallback_operator.__name__ + '__' reverse.__doc__ = monomorphic_operator.__doc__ return forward, reverse def _add(a, b): """a + b""" return Fraction(a.numerator * b.denominator + b.numerator * a.denominator, a.denominator * b.denominator) __add__, __radd__ = _operator_fallbacks(_add, operator.add) # ...
License
© 2001–2021 Python Software Foundation
Licensed under the PSF License.
https://docs.python.org/3.9/library/numbers.html