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Rational Numbers


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The rational numbers consist of signed fractions of integers:

$\displaystyle {\mathbb{Q}} = \left\{\frac{p}{q}:\
p\in{\mathbb{Z}},\, q\in\mathbb{N},\,
\operatorname{gcd}(p,q)=1 \right\}
\,,
$

where $ \operatorname{gcd}$ denotes the greatest common divisor. The set of rational numbers forms a field with the standard arithmetic operations (addition/subtravtion and multiplication/division).

As is illustrated in the figure, $ \mathbb{Q}$ is countable. With the so-called diagonal method, we can enumerate all positive fractions. Uncancelled fractions are skipped in the count.

Finally, the rational numbers form a dense subset of the real line. Between any two different rational numbers there are infinitely many rational numbers.

(Authors: Höllig/Kimmerle/Abele)

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  automatically generated 6/11/2007