Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Cayleys_sextic> ?p ?o }
Showing triples 1 to 31 of
31
with 100 triples per page.
- Cayleys_sextic abstract "In geometry, Cayley's sextic (sextic of Cayley, Cayley's sextet) is a plane curve, a member of the sinusoidal spiral family, first discussed by Colin Maclaurin in 1718. Arthur Cayley was the first to study the curve in detail and it was named after him in 1900 by Archibald.The curve is symmetric about the x-axis (y = 0) and self-intersects at y = 0, x = −a/8. Other intercepts are at the origin, at (a, 0) and with the y-axis at ±3⁄8√3aThe curve is the pedal curve (or roulette) of a cardioid with respect to its cusp.".
- Cayleys_sextic wikiPageExternalLink CayleysSextic.html.
- Cayleys_sextic wikiPageID "42442709".
- Cayleys_sextic wikiPageLength "2230".
- Cayleys_sextic wikiPageOutDegree "8".
- Cayleys_sextic wikiPageRevisionID "664808277".
- Cayleys_sextic wikiPageWikiLink Arthur_Cayley.
- Cayleys_sextic wikiPageWikiLink Cardioid.
- Cayleys_sextic wikiPageWikiLink Category:Algebraic_curves.
- Cayleys_sextic wikiPageWikiLink Colin_Maclaurin.
- Cayleys_sextic wikiPageWikiLink Pedal_curve.
- Cayleys_sextic wikiPageWikiLink Plane_curve.
- Cayleys_sextic wikiPageWikiLink Raymond_Clare_Archibald.
- Cayleys_sextic wikiPageWikiLink Sinusoidal_spiral.
- Cayleys_sextic wikiPageWikiLinkText "Cayley's sextic".
- Cayleys_sextic hasPhotoCollection Cayleys_sextic.
- Cayleys_sextic wikiPageUsesTemplate Template:Cite_book.
- Cayleys_sextic wikiPageUsesTemplate Template:Frac.
- Cayleys_sextic wikiPageUsesTemplate Template:Reflist.
- Cayleys_sextic wikiPageUsesTemplate Template:Sqrt.
- Cayleys_sextic subject Category:Algebraic_curves.
- Cayleys_sextic hypernym Curve.
- Cayleys_sextic type Album.
- Cayleys_sextic comment "In geometry, Cayley's sextic (sextic of Cayley, Cayley's sextet) is a plane curve, a member of the sinusoidal spiral family, first discussed by Colin Maclaurin in 1718. Arthur Cayley was the first to study the curve in detail and it was named after him in 1900 by Archibald.The curve is symmetric about the x-axis (y = 0) and self-intersects at y = 0, x = −a/8.".
- Cayleys_sextic label "Cayley's sextic".
- Cayleys_sextic sameAs m.01086rhq.
- Cayleys_sextic sameAs Cayleyjeva_sekstika.
- Cayleys_sextic sameAs Q17006235.
- Cayleys_sextic sameAs Q17006235.
- Cayleys_sextic wasDerivedFrom Cayleys_sexticoldid=664808277.
- Cayleys_sextic isPrimaryTopicOf Cayleys_sextic.