Definition:Sequence of Partial Denominators
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Definition
Let $F$ be a field.
Let $n \in \N\cup\{\infty\}$ be an extended natural number.
Let $C$ be a continued fraction in $F$ of length $n$.
The sequence of partial denominators of $C$ is just $C$ itself.
That is, a continued fraction equals its sequence of partial denominators.
Also see
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