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Series for even powers of Pi by generalization Euler's method for solving the Basel Problem

General Mathematics 2024-03-18 v1

Abstract

The purpose of this paper is to present series expansions for even powers of the number π\pi. This is accomplished by generalizing Euler's method for solving the Basel Problem, which was published in 1735. We employ elementary symmetric polynomials, transform them into nested sums, and thereby derive nice series formulas for even powers of the number π\pi such as π23!=1=1112  ;π45!=2=21=12111222  ;π67!=3=32=2311=1211122232  ; \frac{\pi^2}{3!}= \sum_{\ell_1=1}^\infty\frac{1}{\ell_1^2} \;;\quad\quad \frac{\pi^4}{5!} = \sum_{\ell_2=2}^\infty \sum_{\ell_1=1}^{\ell_2-1} \frac{1}{\ell_1^2\cdot\ell_2^2} \;;\quad\quad \frac{\pi^6}{7!}= \sum_{\ell_3=3}^\infty \sum_{\ell_2=2}^{\ell_3-1} \sum_{\ell_1=1}^{\ell_2-1}\frac{1}{\ell_1^2\cdot\ell_2^2\cdot\ell_3^2} \;;\quad\cdots Many of these formulas do not seem to be widely known. -- In dieser Abhandlung stellen wir ein Verfahren vor, das die Berechnung von Reihen f\"ur geradzahlige Potenzen von π\pi erm\"oglicht. Die Grundidee ist eine Verallgemeinerung des Verfahrens von Euler, mit dem er 1735 das Basler Problem l\"oste. Wir stellen elementar-symmetrische Polynome durch mehrfach verschachtelte Summen dar und leiten davon Reihen f\"ur geradzahlige Potenzen der Kreiszahl π\pi ab. Die meisten der angegebenen Reihen scheinen nicht so bekannt zu sein.

Keywords

Cite

@article{arxiv.2403.09754,
  title  = {Series for even powers of Pi by generalization Euler's method for solving the Basel Problem},
  author = {Alois Schiessl},
  journal= {arXiv preprint arXiv:2403.09754},
  year   = {2024}
}

Comments

bilingual: English (17 pages) and German (17 pages)

R2 v1 2026-06-28T15:20:44.114Z