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- Poncelets_closure_theorem abstract "In geometry, Poncelet's porism (sometimes referred to as Poncelet's closure theorem) states that whenever a polygon is inscribed in one conic section and circumscribes another one, the polygon must be part of an infinite family of polygons that are all inscribed in and circumscribe the same two conics. It is named after French engineer and mathematician Jean-Victor Poncelet.Poncelet's porism can be proved by an argument using an elliptic curve, whose points represent a combination of a line tangent to one conic and a crossing point of that line with the other conic.".
- Poncelets_closure_theorem thumbnail PonceletPorism.gif?width=300.
- Poncelets_closure_theorem wikiPageExternalLink PonceletsPorism.html.
- Poncelets_closure_theorem wikiPageExternalLink poncelet3-exterior2.html.
- Poncelets_closure_theorem wikiPageExternalLink poncelets-porism.
- Poncelets_closure_theorem wikiPageExternalLink m1087925.
- Poncelets_closure_theorem wikiPageExternalLink m1089117.
- Poncelets_closure_theorem wikiPageExternalLink m1089155.
- Poncelets_closure_theorem wikiPageExternalLink m1089165.
- Poncelets_closure_theorem wikiPageExternalLink m1089187.
- Poncelets_closure_theorem wikiPageExternalLink www.geogebra.org.
- Poncelets_closure_theorem wikiPageID "2412120".
- Poncelets_closure_theorem wikiPageLength "5966".
- Poncelets_closure_theorem wikiPageOutDegree "21".
- Poncelets_closure_theorem wikiPageRevisionID "659485399".
- Poncelets_closure_theorem wikiPageWikiLink Bicentric_polygon.
- Poncelets_closure_theorem wikiPageWikiLink Bxc3xa9zouts_theorem.
- Poncelets_closure_theorem wikiPageWikiLink Category:Conic_sections.
- Poncelets_closure_theorem wikiPageWikiLink Category:Elliptic_curves.
- Poncelets_closure_theorem wikiPageWikiLink Circle.
- Poncelets_closure_theorem wikiPageWikiLink Circumscribed_circle.
- Poncelets_closure_theorem wikiPageWikiLink Complex_projective_plane.
- Poncelets_closure_theorem wikiPageWikiLink Conic_section.
- Poncelets_closure_theorem wikiPageWikiLink Elliptic_curve.
- Poncelets_closure_theorem wikiPageWikiLink Geometry.
- Poncelets_closure_theorem wikiPageWikiLink Hartshorne_ellipse.
- Poncelets_closure_theorem wikiPageWikiLink Henk_J._M._Bos.
- Poncelets_closure_theorem wikiPageWikiLink Inscribed_figure.
- Poncelets_closure_theorem wikiPageWikiLink Jean-Victor_Poncelet.
- Poncelets_closure_theorem wikiPageWikiLink Polygon.
- Poncelets_closure_theorem wikiPageWikiLink Steiner_chain.
- Poncelets_closure_theorem wikiPageWikiLink Tangent.
- Poncelets_closure_theorem wikiPageWikiLink Tangent_lines_to_circles.
- Poncelets_closure_theorem wikiPageWikiLink File:PonceletPorism.gif.
- Poncelets_closure_theorem wikiPageWikiLinkText "Poncelet's closure theorem".
- Poncelets_closure_theorem wikiPageUsesTemplate Template:Reflist.
- Poncelets_closure_theorem wikiPageUsesTemplate Template:Rp.
- Poncelets_closure_theorem subject Category:Conic_sections.
- Poncelets_closure_theorem subject Category:Elliptic_curves.
- Poncelets_closure_theorem type Function.
- Poncelets_closure_theorem type Variety.
- Poncelets_closure_theorem comment "In geometry, Poncelet's porism (sometimes referred to as Poncelet's closure theorem) states that whenever a polygon is inscribed in one conic section and circumscribes another one, the polygon must be part of an infinite family of polygons that are all inscribed in and circumscribe the same two conics.".
- Poncelets_closure_theorem label "Poncelet's closure theorem".
- Poncelets_closure_theorem sameAs Q1785610.
- Poncelets_closure_theorem sameAs Schließungssatz_von_Poncelet.
- Poncelets_closure_theorem sameAs Poncelet’n_lause.
- Poncelets_closure_theorem sameAs Grand_théorème_de_Poncelet.
- Poncelets_closure_theorem sameAs Sluitingstheorema_van_Poncelet.
- Poncelets_closure_theorem sameAs m.07b869.
- Poncelets_closure_theorem sameAs Цепь_Понселе.
- Poncelets_closure_theorem sameAs Q1785610.
- Poncelets_closure_theorem wasDerivedFrom Poncelets_closure_theorem?oldid=659485399.
- Poncelets_closure_theorem depiction PonceletPorism.gif.
- Poncelets_closure_theorem isPrimaryTopicOf Poncelets_closure_theorem.