De analysi per aequationes numero terminorum infinitas
De analysi per aequationes numero terminorum infinitas (or On analysis by infinite series,[1] On Analysis by Equations with an infinite number of terms,[2] or On the Analysis by means of equations of an infinite number of terms)[3] is a mathematical work by Isaac Newton.
Creation
Composed in 1669,[4] during the mid-part of that year probably,[5] from ideas Newton had acquired during the period 1665–1666.[4] Newton wrote
And whatever the common Analysis performs by Means of Equations of a finite number of Terms (provided that can be done) this new method can always perform the same by means of infinite Equations. So that I have not made any Question of giving this the name of Analysis likewise. For the Reasonings in this are no less certain than in the other, nor the Equations less exact; albeit we Mortals whose reasoning Powers are confined within narrow Limits, can neither express, nor so conceive the Terms of these Equations as to know exactly from thence the Quantities we want. To conclude, we may justly reckon that to belong to the Analytic Art, by the help of which the Areas and Lengths, etc. of Curves may be exactly and geometrically determined. Newton[4]
The explication was written to remedy apparent weaknesses in the logarithmic series[6] [infinite series for ] ,
Content
The exponential series, i.e., tending toward infinity, was discovered by Newton and is contained within the Analysis. The treatise contains also the sine series and cosine series and arc series, the logarithmic series and the binomial series.[18]
See also
References
- ^ The Mathematical Association of America .org Archived 1 July 2013 at the Wayback Machine Retrieved 3 February 2012 & newtonproject Retrieved 6 February 2012
- ^ Nicholls State University Thibodaux, Louisiana .edu heck teaching 573 Retrieved 3 February 2012
- ISBN 0-444-50871-6
- ^ ISBN 0-470-63056-6
- ISBN 0-521-00794-1
- ^ ISBN 1-61530-220-4
- ^ B.B.Blank reviewing The Calculus Wars: Newton, Leibniz and the greatest mathematical clash of all time by J.S.Bardi pdf Retrieved 8 February 2012
- ^ Babson College archives-and-collections Archived 22 January 2018 at the Wayback Machine Retrieved 8 February 2012
- ^ King's College London © 2010 – 2012 King's College London Retrieved 27 January 2012
- ^ Birch, History of Royal Society, et al. (Richard S. Westfall ed.) Rice University galileo.edu Retrieved 8 February 2012
- ^ D.Harper – index Retrieved 8 February 2012
- ISBN 0-262-01317-7 Transformations: Studies in the History of Science and Technology MIT Press, 30 Oct 2009 & John Wallis as editor of Newton's mathematical work The Royal Society 2012Retrieved 8 February 2012
- ISBN 0-471-47129-1
- ISBN 3-540-88635-4
- ^ Nicolas Bourbaki (Henri Cartan, Claude Chevalley, Jean Dieudonné, André Weil et al) – Functions of a real variable: elementary theory – 338 pages Springer, 2004 Retrieved 27 January 2012
- ^ Department of Mathematics (Dipartimento di Matematica) "Ulisse Dini" html Retrieved 27 January 2012
- ^ ISAACI NEWTONI – Opuscula [ apud Marcum-Michaelem Bousquet & socios, 1744 ] Retrieved 2012-01-27 originally from Ghent University digitalized on 26 October 2007
- ^ M. Woltermann Archived 5 August 2012 at archive.today Washington & Jefferson College[1] Archived 17 April 2018 at the Wayback Machine Retrieved 8 February 2012