A quartic plane curve is a plane curve of the fourth degree. It can be defined by a quartic equation:This equation has fifteen constants. However, it can be multiplied by any non-zero constant without changing the curve. Therefore, the space of quartic curves can be identified with the real projective space .

PropertyValue
dbpedia-owl:abstract
  • A quartic plane curve is a plane curve of the fourth degree. It can be defined by a quartic equation:This equation has fifteen constants. However, it can be multiplied by any non-zero constant without changing the curve. Therefore, the space of quartic curves can be identified with the real projective space . It also follows that there is exactly one quartic curve that passes through a set of fourteen distinct points in general position, since a quartic has 14 degrees of freedom.A quartic curve can have a maximum of: Four connected components Twenty-eight bi-tangents Three ordinary double points.
dbpedia-owl:wikiPageID
  • 1782254 (xsd:integer)
dbpedia-owl:wikiPageLength
  • 2629 (xsd:integer)
dbpedia-owl:wikiPageOutDegree
  • 19 (xsd:integer)
dbpedia-owl:wikiPageRevisionID
  • 109975552 (xsd:integer)
dbpedia-owl:wikiPageWikiLink
prop-fr:wikiPageUsesTemplate
dcterms:subject
rdfs:comment
  • A quartic plane curve is a plane curve of the fourth degree. It can be defined by a quartic equation:This equation has fifteen constants. However, it can be multiplied by any non-zero constant without changing the curve. Therefore, the space of quartic curves can be identified with the real projective space .
rdfs:label
  • Courbe quartique
  • Curva cruciforme
  • Curva quartica
  • Kruiscurve
  • Quartic plane curve
  • Quàrtica cruciforme
  • Wielomian stopnia czwartego
owl:sameAs
http://www.w3.org/ns/prov#wasDerivedFrom
foaf:isPrimaryTopicOf
is dbpedia-owl:wikiPageWikiLink of
is foaf:primaryTopic of