| 11. | In hyperbolic geometry, there is no line that remains equidistant from another.
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| 12. | The term " hyperbolic geometry " was introduced by Felix Klein in 1871.
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| 13. | The discovery of hyperbolic geometry had important philosophical consequences.
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| 14. | Rather, squares in hyperbolic geometry have angles of less than right angles.
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| 15. | There are three equivalent representations commonly used in two-dimensional hyperbolic geometry.
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| 16. | Today, his results are theorems of hyperbolic geometry.
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| 17. | Also in hyperbolic geometry there are no equidistant lines ( see hypercycles ).
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| 18. | However, Minkowski space contains submanifolds endowed with a Riemannian metric yielding hyperbolic geometry.
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| 19. | In hyperbolic geometry, there is no line that remains equidistant from another line.
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| 20. | It is possible to tessellate in non-Euclidean geometries such as hyperbolic geometry.
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