I recently came across this infinite series: $$sum_{n = 0}^{infty}left(frac{(ln(4n+3))^2}{4n+3}-frac{(ln(4n+5))^2}{4n+5}right)$$ Is it possible to express the series in closed-form? If so, how should I go about it? More generally, how could one express the following infinite series in closed form? $$sum_{n = 0}^{infty}left(frac{(ln(4n+3))^k}{4n+3}-frac{(ln(4n+5))^k}{4n+5}right),$$ where $k$ is a positive integer. For anyone who would like more context, I came across the first series in my solution to the following question: Choose $x$, $y$, $z$, and $w$ from $(0,1)$. Find the probability that $dfrac{x}{yzw}$ rounds to an even number Thank you!

Closed-form expression for $sum_{n = 0}^{infty}(frac{(ln(4n+3))^k}{4n+3}-frac{(ln(4n+5))^k}{4n+5}),$ where $k$ is a positive integer

Mathematics Asked on December 21, 2021

I recently came across this infinite series:
$$sum_{n = 0}^{infty}left(frac{(ln(4n+3))^2}{4n+3}-frac{(ln(4n+5))^2}{4n+5}right)$$
Is it possible to express the series in closed-form? If so, how should I go about it?
More generally, how could one express the following infinite series in closed form?
$$sum_{n = 0}^{infty}left(frac{(ln(4n+3))^k}{4n+3}-frac{(ln(4n+5))^k}{4n+5}right),$$
where $k$ is a positive integer.

For anyone who would like more context, I came across the first series in my solution to the following question: Choose $x$, $y$, $z$, and $w$ from $(0,1)$. Find the probability that $dfrac{x}{yzw}$ rounds to an even number

Thank you!

closed form sequences and series

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