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Alephnull

Aleph-null, also written aleph0 or aleph-zero and denoted by the symbol ℵ0, is the smallest infinite cardinal number. It is the cardinality of the set of natural numbers N, and therefore the size of any countably infinite set (for example Z, the integers, and Q, the rationals).

In set theory, aleph-null is the first in the sequence of aleph numbers and is an initial

Cantor's diagonal argument shows that the set of real numbers R has cardinality 2^ℵ0, which is strictly

Some standard closure properties: the union of countably many countable sets is countable; the Cartesian product

Thus aleph-null is fundamental in set theory as the size of the most basic infinite set and

cardinal.
Its
corresponding
initial
ordinal
is
ω,
the
first
infinite
ordinal;
while
ω
has
cardinality
aleph-null.
greater
than
aleph-null;
thus
the
real
numbers
form
an
uncountable
set.
The
continuum
c
is
often
used
for
2^aleph0
and
is
the
cardinality
of
the
set
of
real
numbers.
The
continuum
hypothesis
asks
whether
2^aleph0
equals
aleph1,
and
this
is
independent
of
ZFC.
of
two
countable
sets
is
countable;
there
exist
countable
infinite
sets
besides
N,
all
having
cardinal
aleph-null.
In
mathematics,
aleph-null
serves
as
a
baseline
for
measuring
the
size
of
infinity.
as
a
reference
point
for
comparing
infinite
sizes.