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- W-curve abstract "In geometry, a W-curve is a curve in projective n-space that is invariant under a 1-parameter group of projective transformations. W-curves were first investigated by Felix Klein and Sophus Lie in 1871, who also named them. W-curves in the real projective plane can be constructed with straightedge alone. Many well-known curves are W-curves, among them conics, logarithmic spirals, powers (like y = x3), logarithms and the helix, but not e.g. the sine. W-curves occur widely in the realm of plants.".
- W-curve thumbnail PlaneWcurve.svg?width=300.
- W-curve wikiPageExternalLink ?PPN=PPN235181684_0004.
- W-curve wikiPageExternalLink Pathcurves1010.pdf.
- W-curve wikiPageID "27126377".
- W-curve wikiPageLength "2055".
- W-curve wikiPageOutDegree "19".
- W-curve wikiPageRevisionID "609676604".
- W-curve wikiPageWikiLink Category:Curves.
- W-curve wikiPageWikiLink Category:Projective_geometry.
- W-curve wikiPageWikiLink Conic_section.
- W-curve wikiPageWikiLink Felix_Klein.
- W-curve wikiPageWikiLink Georg_Scheffers.
- W-curve wikiPageWikiLink Helix.
- W-curve wikiPageWikiLink Homography.
- W-curve wikiPageWikiLink Invariant_(mathematics).
- W-curve wikiPageWikiLink Kleins_encyclopedia.
- W-curve wikiPageWikiLink Logarithm.
- W-curve wikiPageWikiLink Logarithmic_spiral.
- W-curve wikiPageWikiLink One-parameter_group.
- W-curve wikiPageWikiLink Projective_space.
- W-curve wikiPageWikiLink Real_projective_plane.
- W-curve wikiPageWikiLink Sine.
- W-curve wikiPageWikiLink Sophus_Lie.
- W-curve wikiPageWikiLink Straightedge.
- W-curve wikiPageWikiLink File:PlaneWcurve.svg.
- W-curve wikiPageWikiLinkText "W-curve".
- W-curve subject Category:Curves.
- W-curve subject Category:Projective_geometry.
- W-curve hypernym Curve.
- W-curve type Album.
- W-curve comment "In geometry, a W-curve is a curve in projective n-space that is invariant under a 1-parameter group of projective transformations. W-curves were first investigated by Felix Klein and Sophus Lie in 1871, who also named them. W-curves in the real projective plane can be constructed with straightedge alone. Many well-known curves are W-curves, among them conics, logarithmic spirals, powers (like y = x3), logarithms and the helix, but not e.g. the sine.".
- W-curve label "W-curve".
- W-curve sameAs Q629245.
- W-curve sameAs W-Kurve.
- W-curve sameAs W-kromme.
- W-curve sameAs m.0bwgcpr.
- W-curve sameAs Q629245.
- W-curve wasDerivedFrom W-curve?oldid=609676604.
- W-curve depiction PlaneWcurve.svg.
- W-curve isPrimaryTopicOf W-curve.