User:Diamond Blizzard/Books/Hyperbolic Geometry: Concepts and History
 | The Wikimedia Foundation's book rendering service has been withdrawn. Please upload your Wikipedia book to one of the external rendering services. |
 | You can still create and edit a book design using the Book Creator and upload it to an external rendering service:
|
| This user book is a user-generated collection of Wikipedia articles that can be easily saved, rendered electronically, and ordered as a printed book. If you are the creator of this book and need help, see Help:Books (general tips) and WikiProject Wikipedia-Books (questions and assistance). Edit this book: Book Creator · Wikitext Order a printed copy from: PediaPress [ About ] [ Advanced ] [ FAQ ] [ Feedback ] [ Help ] [ WikiProject ] [ Recent Changes ] | ||||||||
Hyperbolic Geometry
editConcepts and History
edit- The Geometry We Know
- Geometry
- Euclidean geometry
- Parallel postulate
- Playfair's axiom
- Strange Possibilities
- Non-Euclidean geometry
- Absolute geometry
- Hyperbolic geometry
- Concepts Related to Hyperbolic Geometry
- Limiting parallel
- Ideal point
- Ultraparallel theorem
- Gaussian curvature
- Angle of parallelism
- Hypercycle (geometry)
- Horocycle
- Hyperbolic triangle
- Angular defect
- Ideal triangle
- Apeirogon
- Uniform tilings in hyperbolic plane
- List of regular polytopes and compounds
- Coordinate systems for the hyperbolic plane
- Historically Important People and Ideas
- Nikolai Lobachevsky
- Carl Friedrich Gauss
- Eugenio Beltrami
- Henri Poincaré
- Sphere-world
- Proclus
- Ibn al-Haytham
- Giovanni Girolamo Saccheri
- Saccheri quadrilateral
- Omar Khayyam
- Johann Heinrich Lambert
- Lambert quadrilateral
- Is This Relevant to Our World?
- Hyperbolic space
- Special relativity
- Geometrization conjecture
- Shape of the universe
- Models of Hyperbolic Geometry and Why We Need Them
- Hilbert's theorem (differential geometry)
- Pseudosphere
- Beltrami–Klein model
- Poincaré disk model
- Poincaré half-plane model
- Hyperboloid model
- Band model
- Artistic Depictions of Hyperbolic Geometry
- M. C. Escher
- Circle Limit III
- Mathematics and fiber arts
- Truncated order-7 triangular tiling
- HyperRogue
- Flatterland