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Foundations of Geometry: Euclidean, Bolyai-Lobachevskian, and Projective Geometry
(eBook)
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Language
English
ISBN
9780486835570
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Citations
APA Citation, 7th Edition (style guide)
Karol Borsuk., Karol Borsuk|AUTHOR., & Wanda Szmielew|AUTHOR. (2018). Foundations of Geometry: Euclidean, Bolyai-Lobachevskian, and Projective Geometry . Dover Publications.
Chicago / Turabian - Author Date Citation, 17th Edition (style guide)Karol Borsuk, Karol Borsuk|AUTHOR and Wanda Szmielew|AUTHOR. 2018. Foundations of Geometry: Euclidean, Bolyai-Lobachevskian, and Projective Geometry. Dover Publications.
Chicago / Turabian - Humanities (Notes and Bibliography) Citation, 17th Edition (style guide)Karol Borsuk, Karol Borsuk|AUTHOR and Wanda Szmielew|AUTHOR. Foundations of Geometry: Euclidean, Bolyai-Lobachevskian, and Projective Geometry Dover Publications, 2018.
MLA Citation, 9th Edition (style guide)Karol Borsuk, Karol Borsuk|AUTHOR, and Wanda Szmielew|AUTHOR. Foundations of Geometry: Euclidean, Bolyai-Lobachevskian, and Projective Geometry Dover Publications, 2018.
Note! Citations contain only title, author, edition, publisher, and year published. Citations should be used as a guideline and should be double checked for accuracy. Citation formats are based on standards as of August 2021.
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Grouping Information
| Grouped Work ID | 45f23cf2-d0e7-dbeb-6ac8-9078ed63b529-eng |
|---|---|
| Full title | foundations of geometry euclidean bolyai lobachevskian and projective geometry |
| Author | borsuk karol |
| Grouping Category | book |
| Last Update | 2022-10-18 20:50:33PM |
| Last Indexed | 2024-04-17 03:07:58AM |
Book Cover Information
| Image Source | hoopla |
|---|---|
| First Loaded | Jan 23, 2024 |
| Last Used | Jan 23, 2024 |
Hoopla Extract Information
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[synopsis] => In Part One of this comprehensive and frequently cited treatment, the authors develop Euclidean and Bolyai-Lobachevskian geometry on the basis of an axiom system due, in principle, to the work of David Hilbert. Part Two develops projective geometry in much the same way. An Introduction provides background on topological space, analytic geometry, and other relevant topics, and rigorous proofs appear throughout the text. Topics covered by Part One include axioms of incidence and order, axioms of congruence, the axiom of continuity, models of absolute geometry, and Euclidean geometry, culminating in the treatment of Bolyai-Lobachevskian geometry. Part Two examines axioms of incidents and order and the axiom of continuity, concluding with an exploration of models of projective geometry.
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