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simple_continued_fraction #970

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@Tomaqa

Please provide this information in the documentation, it is available only in the source code:

// Deal with non-uniqueness of continued fractions: [a0; a1, ..., an, 1] = a0; a1, ..., an + 1].
// The shorter representation is considered the canonical representation,

Also, I am disappointed that I cannot acces particular coefficients of the continued fraction, so the whole class is useless in the case one does not want to use the provided public functions.
I want to use it for rational approxamations.
So I also need to convert it to rational afterwards.

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