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- Chasles_theorem_(geometry) abstract "In algebraic geometry, Chasles' theorem says that if two pencils of curves have no curves in common, then the intersections of those curves form another pencil of curves the degree of which can be calculated from the degrees of the initial two pencils.The results is attributed to Michel Chasles (1793–1880).".
- Chasles_theorem_(geometry) wikiPageID "42392517".
- Chasles_theorem_(geometry) wikiPageLength "551".
- Chasles_theorem_(geometry) wikiPageOutDegree "4".
- Chasles_theorem_(geometry) wikiPageRevisionID "647659534".
- Chasles_theorem_(geometry) wikiPageWikiLink Algebraic_geometry.
- Chasles_theorem_(geometry) wikiPageWikiLink Category:Theorems_in_algebraic_geometry.
- Chasles_theorem_(geometry) wikiPageWikiLink Michel_Chasles.
- Chasles_theorem_(geometry) wikiPageWikiLink Pencil_(mathematics).
- Chasles_theorem_(geometry) wikiPageWikiLinkText "Chasles' theorem (geometry)".
- Chasles_theorem_(geometry) wikiPageUsesTemplate Template:Geometry-stub.
- Chasles_theorem_(geometry) wikiPageUsesTemplate Template:Other_uses.
- Chasles_theorem_(geometry) wikiPageUsesTemplate Template:Reflist.
- Chasles_theorem_(geometry) subject Category:Theorems_in_algebraic_geometry.
- Chasles_theorem_(geometry) comment "In algebraic geometry, Chasles' theorem says that if two pencils of curves have no curves in common, then the intersections of those curves form another pencil of curves the degree of which can be calculated from the degrees of the initial two pencils.The results is attributed to Michel Chasles (1793–1880).".
- Chasles_theorem_(geometry) label "Chasles' theorem (geometry)".
- Chasles_theorem_(geometry) sameAs Q16893062.
- Chasles_theorem_(geometry) sameAs m.0105kykf.
- Chasles_theorem_(geometry) sameAs Q16893062.
- Chasles_theorem_(geometry) wasDerivedFrom Chasles_theorem_(geometry)?oldid=647659534.
- Chasles_theorem_(geometry) isPrimaryTopicOf Chasles_theorem_(geometry).