Euler’s Work on the Surface Area of Scalene Cones

In Maria Zack & Dirk Schlimm (eds.), Research in History and Philosophy of Mathematics the Cshpm 2017 Annual Meeting in Toronto, Ontario. Birkhäuser. pp. 59-67 (2018)
  Copy   BIBTEX

Abstract

Around 1746, Euler took up the problem of the surface area of scalene cones, cones in which the vertex does not lie over the center of the base circle. Calling earlier solutions by Varignon and Leibniz insightful but incomplete and extending his solution to conical bodies with noncircular bases, Euler published his results in 1750. He had not actually calculated any particular areas—not surprisingly, as they generally lead to elliptic integrals. Instead, he showed how to reduce the problem to calculating the arclength of certain curves, carefully elucidating the many ways these curves may be defined. Although the curves seem naturally to involve transcendental quantities, he showed how to adjust so only algebraic quantities are needed. Some details of Euler’s solution for the scalene cones are presented here.

Categories

Add categories

Keywords

Reprint years

DOI

10.1007/978-3-319-90983-7_4

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 91,219

External links

Setup an account with your affiliations in order to access resources via your University's proxy server

Through your library

My notes

Similar books and articles

Euler’s Work on the Surface Area of Scalene Cones.Daniel J. Curtin - 2018 - In Amy Ackerberg-Hastings, Marion W. Alexander, Zoe Ashton, Christopher Baltus, Phil Bériault, Daniel J. Curtin, Eamon Darnell, Craig Fraser, Roger Godard, William W. Hackborn, Duncan J. Melville, Valérie Lynn Therrien, Aaron Thomas-Bolduc & R. S. D. Thomas (eds.), Research in History and Philosophy of Mathematics: The Cshpm 2017 Annual Meeting in Toronto, Ontario. Springer Verlag. pp. 59-67.
A summary of Euler’s work on the pentagonal number theorem.Jordan Bell - 2010 - Archive for History of Exact Sciences 64 (3):301-373.
Euler, Vis Viva, And Equilibrium.Brian Hepburn - 2010 - Studies in History and Philosophy of Science Part A 41 (2):120-127.
…and so Euler discovered Differential Equations.Pablo Rodríguez-Vellando - 2019 - Foundations of Science 24 (2):343-374.
Geometry and analysis in Euler’s integral calculus.Giovanni Ferraro, Maria Rosaria Enea & Giovanni Capobianco - 2017 - Archive for History of Exact Sciences 71 (1):1-38.
Research in History and Philosophy of Mathematics The CSHPM 2017 Annual Meeting in Toronto, Ontario.Maria Zack & Dirk Schlimm (eds.) - 2018 - New York: Birkhäuser.
Die (Wieder-)Entdeckung von Eulers Mondtafeln.Andreas Verdun - 2011 - NTM Zeitschrift für Geschichte der Wissenschaften, Technik und Medizin 19 (3):271-297.
Euler’s Königsberg: the explanatory power of mathematics.Tim Räz - 2017 - European Journal for Philosophy of Science:1-16.
Euler’s Königsberg: the explanatory power of mathematics.Tim Räz - 2018 - European Journal for Philosophy of Science 8 (3):331-346.
Leonhard Euler’s early lunar theories 1725–1752: Part 1: first approaches, 1725–1730.Andreas Verdun - 2013 - Archive for History of Exact Sciences 67 (3):235-303.
Mathematical Explanations in Euler’s Königsberg.Tim Räz - unknown
Leonhard Euler's ‘anti-Newtonian’ theory of light.R. W. Home - 1988 - Annals of Science 45 (5):521-533.
Euler’s visual logic.Eric Hammer & Sun-Joo Shin - 1998 - History and Philosophy of Logic 19 (1):1-29.
Turing cones and set theory of the reals.Benedikt Löwe - 2001 - Archive for Mathematical Logic 40 (8):651-664.
Self-scaled barriers for irreducible symmetric cones.A. Hauser Raphael & Lim Yongdo - unknown

Analytics

Added to PP
2020-06-17

Downloads
0

6 months
0

Historical graph of downloads

Sorry, there are not enough data points to plot this chart.
How can I increase my downloads?

Author's Profile

Daniel Curtin
University of Delaware

Citations of this work

No citations found.

Add more citations

References found in this work

No references found.

Add more references