What is Geometry? Is it True? Why is it Important? (Englisch)
- Neue Suche nach: Gray, Jeremy
- Neue Suche nach: Gray, Jeremy
In:
Worlds Out of Nothing
: A Course in the History of Geometry in the 19th Century
;
Kapitel: 30
;
333-339
;
2010
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ISSN:
- Aufsatz/Kapitel (Buch) / Elektronische Ressource
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Titel:What is Geometry? Is it True? Why is it Important?
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Weitere Titelangaben:Springer Undergraduate Mathematics
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Beteiligte:Gray, Jeremy ( Autor:in )
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Erschienen in:Worlds Out of Nothing : A Course in the History of Geometry in the 19th Century ; Kapitel: 30 ; 333-339
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Verlag:
- Neue Suche nach: Springer London
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Erscheinungsort:London
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Erscheinungsdatum:01.01.2010
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Format / Umfang:7 pages
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ISBN:
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ISSN:
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DOI:
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Medientyp:Aufsatz/Kapitel (Buch)
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Format:Elektronische Ressource
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Sprache:Englisch
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Schlagwörter:
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Datenquelle:
Inhaltsverzeichnis E-Book
Die Inhaltsverzeichnisse werden automatisch erzeugt und basieren auf den im Index des TIB-Portals verfügbaren Einzelnachweisen der enthaltenen Beiträge. Die Anzeige der Inhaltsverzeichnisse kann daher unvollständig oder lückenhaft sein.
- 1
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Mathematics in the French RevolutionGray, Jeremy et al. | 2010
- 2
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Poncelet (and Pole and Polar)Gray, Jeremy et al. | 2010
- 3
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Theorems in Projective GeometryGray, Jeremy et al. | 2010
- 4
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Poncelet’s TraitéGray, Jeremy et al. | 2010
- 5
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Duality and the Duality ControversyGray, Jeremy et al. | 2010
- 6
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Poncelet, Chasles, and the Early Years of Projective GeometryGray, Jeremy et al. | 2010
- 7
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Euclidean Geometry, the Parallel Postulate, and the Work of Lambert and LegendreGray, Jeremy et al. | 2010
- 8
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Gauss (Schweikart and Taurinus) and Gauss’s Differential GeometryGray, Jeremy et al. | 2010
- 9
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János BolyaiGray, Jeremy et al. | 2010
- 10
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LobachevskiiGray, Jeremy et al. | 2010
- 11
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Publication and Non-Reception up to 1855Gray, Jeremy et al. | 2010
- 12
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On Writing the History of Geometry – 1Gray, Jeremy et al. | 2010
- 13
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Across the Rhine – Möbius’s Algebraic Version of Projective GeometryGray, Jeremy et al. | 2010
- 14
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Plücker, Hesse, Higher Plane Curves, and the Resolution of the Duality ParadoxGray, Jeremy et al. | 2010
- 15
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The Plücker FormulaeGray, Jeremy et al. | 2010
- 16
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The Mathematical Theory of Plane CurvesGray, Jeremy et al. | 2010
- 17
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Complex CurvesGray, Jeremy et al. | 2010
- 18
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Riemann: Geometry and PhysicsGray, Jeremy et al. | 2010
- 19
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Differential Geometry of SurfacesGray, Jeremy et al. | 2010
- 20
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Beltrami, Klein, and the Acceptance of Non-Euclidean GeometryGray, Jeremy et al. | 2010
- 21
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On Writing the History of Geometry – 2Gray, Jeremy et al. | 2010
- 22
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Projective Geometry as the Fundamental GeometryGray, Jeremy et al. | 2010
- 23
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Hilbert and his Grundlagen der GeometrieGray, Jeremy et al. | 2010
- 24
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The Foundations of Projective Geometry in ItalyGray, Jeremy et al. | 2010
- 25
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Henri Poincaré and the Disc Model of non-Euclidean GeometryGray, Jeremy et al. | 2010
- 26
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Is the Geometry of Space Euclidean or Non-Euclidean?Gray, Jeremy et al. | 2010
- 27
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Summary: Geometry to 1900Gray, Jeremy et al. | 2010
- 28
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What is Geometry? The Formal SideGray, Jeremy et al. | 2010
- 29
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What is Geometry? The Physical SideGray, Jeremy et al. | 2010
- 30
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What is Geometry? Is it True? Why is it Important?Gray, Jeremy et al. | 2010
- 31
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On Writing the History of Geometry – 3Gray, Jeremy et al. | 2010