NOUN
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(mathematics) a non-Euclidean geometry in which the parallel axiom is replaced by the assumption that through any point in a plane there are two or more lines that do not intersect a given line in the plane
Karl Gauss pioneered hyperbolic geometry
How To Use hyperbolic geometry In A Sentence
- Karl Gauss pioneered hyperbolic geometry
- Among closed surfaces, spherical, flat, and hyperbolic geometry are mutually exclusive.
- Moreover, the geometries axiomatized in the book have consistent and decidable extensions, namely, Euclidean or hyperbolic geometry over real-closed fields.
- Around this time Menger's interests in mathematics broadened and he began to work on hyperbolic geometry, probabilistic geometry and the algebra of functions.
- Her efforts combined tools as diverse as hyperbolic geometry, classical methods of automorphic forms and symplectic reduction to obtain results on three different mathematical questions. Princeton University Top Stories
- Her efforts combined tools as diverse as hyperbolic geometry, classical methods of automorphic forms and symplectic reduction to obtain results on three different mathematical questions. Princeton University Top Stories
