For a regular continued fraction that converges to $\alpha $ we have $\vert \alpha - \frac {A_n}{B_n} \vert < \frac {A_n}{B_n^2}$. Is there a similar result for generalized continued fractions? I need to estimate the accuracy of my $ \frac {A_n}{B_n} $, and faiked to find a similar result.
2026-03-24 23:50:57.1774396257
Bounding error for a generalized continued fraction partial sum
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