An Introductory Study of Hyperbolic Geometry

dc.contributor.advisorBausch, Augustus Frank, 1920-1973
dc.contributor.authorForeman, Jack
dc.date.accessioned2011-03-14T15:48:46Z
dc.date.available2011-03-14T15:48:46Z
dc.date.issued1965
dc.descriptioniii, 79 p.en_US
dc.description.abstractThe object of this paper is to develop Hyperbolic geometry using, as tools, only the postulates and propositions of Euclid (excluding the ones dealing with parallel lines) and the tools of logic. To the best of my knowledge and throughout my research I have found no one work which contains a total picture of Hyperbolic geometry. There are bits and pieces scattered through a multitude of manuscripts. In the University of Michigan's Math Library there is a set of the complete works of Lobachevsky, which unfortunately has not been translated from the original Russian. In recent years there has been an increased interest in Hyperbolic geometry because it is felt that 1t is a better description of physical space than is Euclidean geometry. If it can be shown, logically, rather than by measurement, wh1ch even at best contain an error; that the theorems of Hyperbolic geometry follow from our set of axioms and postulates, then the error measurement and the error due to something appearing to be "right" is avoided.en_US
dc.format.mimetypeapplication/pdf
dc.identifier.urihttp://hdl.handle.net/10920/20616
dc.language.isoen_USen_US
dc.publisherKalamazoo Collegeen_US
dc.relation.ispartofKalamazoo College Mathematics Senior Individualized Projects Collection
dc.relation.ispartofseriesSenior Individualized Projects. Mathematics.;
dc.rightsU.S. copyright laws protect this material. Commercial use or distribution of this material is not permitted without prior written permission of the copyright holder.
dc.titleAn Introductory Study of Hyperbolic Geometryen_US
dc.typeThesisen_US
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