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- Meusniers_theorem abstract "In differential geometry, Meusnier's theorem states that all curves on a surface passing through a given point p and having the same tangent line at p also have the same normal curvature at p and their osculating circles form a sphere. The theorem was first announced by Jean Baptiste Meusnier in 1776, but not published until 1785. At least prior to 1912, several writers in English were in the habit of calling the result Meunier's theorem, although there is no evidence that Meusnier himself ever spelt his name in this way.This alternative spelling of Meusnier's name also appears on the Arc de Triomphe in Paris.".
- Meusniers_theorem wikiPageExternalLink m063740.htm.
- Meusniers_theorem wikiPageExternalLink meusnier_en.htm.
- Meusniers_theorem wikiPageID "11300890".
- Meusniers_theorem wikiPageLength "1337".
- Meusniers_theorem wikiPageOutDegree "12".
- Meusniers_theorem wikiPageRevisionID "705309045".
- Meusniers_theorem wikiPageWikiLink Cambridge_University_Press.
- Meusniers_theorem wikiPageWikiLink Category:Theorems_in_differential_geometry.
- Meusniers_theorem wikiPageWikiLink Curve.
- Meusniers_theorem wikiPageWikiLink Darboux_frame.
- Meusniers_theorem wikiPageWikiLink Differential_geometry.
- Meusniers_theorem wikiPageWikiLink Ian_R._Porteous.
- Meusniers_theorem wikiPageWikiLink Jean_Baptiste_Meusnier.
- Meusniers_theorem wikiPageWikiLink Names_inscribed_under_the_Arc_de_Triomphe.
- Meusniers_theorem wikiPageWikiLink Osculating_circle.
- Meusniers_theorem wikiPageWikiLink Paris.
- Meusniers_theorem wikiPageWikiLink Surface.
- Meusniers_theorem wikiPageWikiLink Tangent.
- Meusniers_theorem wikiPageWikiLinkText "Meusnier's theorem".
- Meusniers_theorem wikiPageUsesTemplate Template:Differential-geometry-stub.
- Meusniers_theorem wikiPageUsesTemplate Template:Reflist.
- Meusniers_theorem subject Category:Theorems_in_differential_geometry.
- Meusniers_theorem type Theorem.
- Meusniers_theorem comment "In differential geometry, Meusnier's theorem states that all curves on a surface passing through a given point p and having the same tangent line at p also have the same normal curvature at p and their osculating circles form a sphere. The theorem was first announced by Jean Baptiste Meusnier in 1776, but not published until 1785.".
- Meusniers_theorem label "Meusnier's theorem".
- Meusniers_theorem sameAs Q4454989.
- Meusniers_theorem sameAs Teorema_di_Meusnier.
- Meusniers_theorem sameAs ムーニエの定理.
- Meusniers_theorem sameAs m.02r6x3f.
- Meusniers_theorem sameAs Теорема_Мёнье.
- Meusniers_theorem sameAs Q4454989.
- Meusniers_theorem wasDerivedFrom Meusniers_theorem?oldid=705309045.
- Meusniers_theorem isPrimaryTopicOf Meusniers_theorem.