RefNo | PP/1/26 |
Previous numbers | PP/33/28 |
Level | Item |
Title | Paper, 'Sur les surfaces homofocales du second ordre' [On second order confocal surfaces] by A [Amédée] Mannheim |
Creator | Mannheim; Victor Mayer Amédée (1831-1906); French mathematician |
Date | 1882 |
Description | Mannheim explains that given an ellipsoid, it is known that through any point in space, we can pass three surfaces of the second order which are confocal to it. The knowledge of the ellipsoid entailing the knowledge of these confocal surfaces, there are geometric links between and these surfaces. He proposes to establish, among these connections, those which make it possible to obtain the main radii of curvature of the three confocal surfaces.
Annotations in pencil and ink.
Subject: Geometry
Received 19 January 1882. Read 2 February 1882. Communicated by [Thomas Archer] Hirst.
A version of this paper was published in volume 33 of the Proceedings of the Royal Society as 'Sur les surfaces homofocales du second ordre'. |
Language | French |
Extent | 15p |
Format | Manuscript |
PhysicalDescription | Ink and graphite pencil on paper |
Digital images | View item on Science in the Making |
AccessStatus | Open |
RelatedMaterial | DOI: 10.1098/rspl.1881.0110 |
RelatedRecord | PP/1/34 |
PP/1/34 |
Fellows associated with this archive
Code | PersonName | Dates |
NA8240 | Hirst; Thomas Archer (1830 - 1892); mathematician | 1830 - 1892 |