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Any Set which can be put in a One-to-One correspondence with the Natural Numbers
(or Integers), and so has Cardinal Number 
. Examples of countable sets include the
Integers and Algebraic Numbers. Georg Cantor 
showed that
the number of Real Numbers is rigorously larger than a countably infinite set, and the postulate
that this number, the ``Continuum,'' is equal to Aleph-1 is called the Continuum
Hypothesis.
See also Aleph-0, Aleph-1, Cantor Diagonal Slash, Cardinal Number, Continuum Hypothesis, Countable Set