Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Hypercycle_(hyperbolic_geometry)> ?p ?o }
Showing triples 1 to 44 of
44
with 100 triples per page.
- Hypercycle_(hyperbolic_geometry) abstract "In hyperbolic geometry, a hypercycle, hypercircle or equidistant curve is a curve whose points have the same orthogonal distance from a given straight line (its axis).Given a straight line L and a point P not on L, we can construct a hypercycle by taking all points Q on the same side of L as P, with perpendicular distance to L equal to that of P.The line L is called the axis, center, or base line of the hypercycle.The orthogonal segments from each point to L are called the radii.Their common length is called the distance or radius of the hypercycle.The hypercycles through a given point that share a tangent through that point converge towards a horocycle as their distances go towards infinity.".
- Hypercycle_(hyperbolic_geometry) thumbnail Hypercycle_(vector_format).svg?width=300.
- Hypercycle_(hyperbolic_geometry) wikiPageExternalLink node68.html.
- Hypercycle_(hyperbolic_geometry) wikiPageID "7516582".
- Hypercycle_(hyperbolic_geometry) wikiPageLength "7125".
- Hypercycle_(hyperbolic_geometry) wikiPageOutDegree "23".
- Hypercycle_(hyperbolic_geometry) wikiPageRevisionID "697478090".
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Category:Curves.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Category:Hyperbolic_geometry.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Circle.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Curve.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Euclidean_geometry.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Horocycle.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Hyperbolic_geometry.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink If_and_only_if.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Line_(geometry).
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Martin_Gardner.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Monotonic_function.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Perpendicular.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Playfairs_axiom.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Poincaré_disk_model.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Poincaré_half-plane_model.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink Radius.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink File:Hypercycle_(vector_format).svg.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLink File:Uniform_tiling_433-t0_edgecenter.png.
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLinkText "Hypercycle (hyperbolic geometry)".
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLinkText "hypercycle (hyperbolic geometry)".
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLinkText "hypercycle".
- Hypercycle_(hyperbolic_geometry) wikiPageWikiLinkText "hypercycles".
- Hypercycle_(hyperbolic_geometry) wikiPageUsesTemplate Template:Reflist.
- Hypercycle_(hyperbolic_geometry) subject Category:Curves.
- Hypercycle_(hyperbolic_geometry) subject Category:Hyperbolic_geometry.
- Hypercycle_(hyperbolic_geometry) hypernym Curve.
- Hypercycle_(hyperbolic_geometry) type Album.
- Hypercycle_(hyperbolic_geometry) type Surface.
- Hypercycle_(hyperbolic_geometry) comment "In hyperbolic geometry, a hypercycle, hypercircle or equidistant curve is a curve whose points have the same orthogonal distance from a given straight line (its axis).Given a straight line L and a point P not on L, we can construct a hypercycle by taking all points Q on the same side of L as P, with perpendicular distance to L equal to that of P.The line L is called the axis, center, or base line of the hypercycle.The orthogonal segments from each point to L are called the radii.Their common length is called the distance or radius of the hypercycle.The hypercycles through a given point that share a tangent through that point converge towards a horocycle as their distances go towards infinity.".
- Hypercycle_(hyperbolic_geometry) label "Hypercycle (hyperbolic geometry)".
- Hypercycle_(hyperbolic_geometry) sameAs Q4530153.
- Hypercycle_(hyperbolic_geometry) sameAs m.02641m8.
- Hypercycle_(hyperbolic_geometry) sameAs Эквидистанта.
- Hypercycle_(hyperbolic_geometry) sameAs Q4530153.
- Hypercycle_(hyperbolic_geometry) wasDerivedFrom Hypercycle_(hyperbolic_geometry)?oldid=697478090.
- Hypercycle_(hyperbolic_geometry) depiction Hypercycle_(vector_format).svg.
- Hypercycle_(hyperbolic_geometry) isPrimaryTopicOf Hypercycle_(hyperbolic_geometry).