%0 Generic %1 citeulike:3036019 %A Euler, Leonhard %D 2008 %K Vor1900 available-in-tex-format mathematics number-theory pre1900 %T Finding the sum of any series from a given general term %U http://arxiv.org/abs/0806.4096 %X Translation from the Latin original, "Inventio summae cuiusque seriei ex dato termino generali" (1735). E47 in the Enestrom index. In this paper Euler derives the Euler-Maclaurin summation formula, by expressing y(x-1) with the Taylor expansion of y about x. In sections 21 to 23 Euler uses the formula to find expressions for the sums of the nth powers of the first x integers. He gives the general formula for this, and works it out explicitly up to n=16. In sections 25 to 28 he applies the summation formula to getting approximations to partial sums of the harmonic series, and in sections 29 to 30 to partial sums of the reciprocals of the odd positive integers. In sections 31 to 32, Euler gets an approximation to zeta(2); in section 33, approximations for zeta(3) and zeta(4). I found David Pengelley's paper "Dances between continuous and discrete: Euler's summation formula", in the MAA's "Euler at 300: An Appreciation", edited by Robert E. Bradley, Lawrence A. D'Antonio, and C. Edward Sandifer, very helpful and I recommend it if you want to understand the summation formula better.

@misc{citeulike:3036019, abstract = {Translation from the Latin original, "Inventio summae cuiusque seriei ex dato termino generali" (1735). E47 in the Enestrom index. In this paper Euler derives the Euler-Maclaurin summation formula, by expressing y(x-1) with the Taylor expansion of y about x. In sections 21 to 23 Euler uses the formula to find expressions for the sums of the nth powers of the first x integers. He gives the general formula for this, and works it out explicitly up to n=16. In sections 25 to 28 he applies the summation formula to getting approximations to partial sums of the harmonic series, and in sections 29 to 30 to partial sums of the reciprocals of the odd positive integers. In sections 31 to 32, Euler gets an approximation to zeta(2); in section 33, approximations for zeta(3) and zeta(4). I found David Pengelley's paper "Dances between continuous and discrete: Euler's summation formula", in the MAA's "Euler at 300: An Appreciation", edited by Robert E. Bradley, Lawrence A. D'Antonio, and C. Edward Sandifer, very helpful and I recommend it if you want to understand the summation formula better.}, added-at = {2009-08-02T17:14:35.000+0200}, archiveprefix = {arXiv}, author = {Euler, Leonhard}, biburl = {https://www.bibsonomy.org/bibtex/2cede82ca59f9010051369bd1b1564133/rwst}, citeulike-article-id = {3036019}, citeulike-linkout-0 = {http://arxiv.org/abs/0806.4096}, citeulike-linkout-1 = {http://arxiv.org/pdf/0806.4096}, description = {my bookmarks from citeulike}, eprint = {0806.4096}, interhash = {a7a31eef1176f09ae11d4fcc8c1b4f59}, intrahash = {cede82ca59f9010051369bd1b1564133}, keywords = {Vor1900 available-in-tex-format mathematics number-theory pre1900}, month = Jun, posted-at = {2008-07-23 08:18:36}, priority = {2}, timestamp = {2009-08-05T16:59:22.000+0200}, title = {Finding the sum of any series from a given general term}, url = {http://arxiv.org/abs/0806.4096}, year = 2008 }