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réelles

Réelles, in mathematics, refers to the set of real numbers, usually denoted by ℝ. They include all rational numbers and all irrational numbers, such as √2 and π. On the real number line, each real number corresponds to a point, and between any two distinct real numbers there are infinitely many others, giving a continuous continuum of values.

Real numbers form a complete ordered field: they support the usual addition, subtraction, multiplication, and division

Construction and uniqueness: Real numbers can be constructed from the rationals by methods such as Dedekind

Topological and size properties: The real numbers carry the standard metric d(x,y)=|x−y|; the resulting space is

Applications and relations: The reals are foundational to calculus, analysis, probability, and measure theory. They form

by
nonzero
numbers,
and
the
natural
order
is
compatible
with
these
operations.
They
contain
the
rational
numbers
as
a
dense
subfield,
and
every
real
can
be
approximated
by
rationals
arbitrarily
well.
cuts
or
Cauchy
sequences.
By
a
standard
theorem,
this
structure
is
unique
up
to
isomorphism
among
complete
ordered
fields.
complete,
archimedean,
and
connected.
The
real
line
is
uncountable
with
cardinality
equal
to
the
continuum.
the
real
part
of
the
complex
numbers,
which
extend
the
structure
to
include
a
imaginary
component.