On Hyperbolic Geometry
Resource tools
File information | File size | Options |
Original JPG File744 × 980 pixels (0.73 MP) 6.3 cm × 8.3 cm @ 300 PPI | 506 KB | Download |
Screen607 × 800 pixels (0.49 MP) 5.1 cm × 6.8 cm @ 300 PPI | 184 KB | Download |
PreviewScreen Preview | 184 KB | View |
Manuscript Metadata
Resource ID
4096
Access
Open
Contributed by
Frederik Wellmann
date (Robin)
n.d.
type of material
A. MS.
description
Formulae required for the projection of the hyperbolic plane upon the Euclidean. Definitions of "individual," "independence of individuals," and "collection." Fundamental theorem of multitude. (Cantor's demonstration of this theorem is thought to be fallacious.)
general index
Cantor Georg, Collections, Geometry, Euclidean (nonEuclidean), graphics, hyperbolic, Individual and Individuality (see also Index Subject), Mathematics, Multitude
pagination
pp. 1-6, 16-20, with rejected pages.
Date
u
number
MS0114_022
abbreviated title
(Hyp. Geom)
date (Robin)
n.d.
Search for similar resources