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- Darboux's_theorem_(analysis) abstract "Darboux's theorem (also known as the Intermediate Value Theorem) is a theorem in real analysis, named after Jean Gaston Darboux. It states that all functions that result from the differentiation of other functions have the intermediate value property: the image of an interval is also an interval.When f is continuously differentiable (f in C1([a,b])), this is a consequence of the intermediate value theorem. But even when f′ is not continuous, Darboux's theorem places a severe restriction on what it can be.".
- Darboux's_theorem_(analysis) wikiPageID "4130888".
- Darboux's_theorem_(analysis) wikiPageRevisionID "597934310".
- Darboux's_theorem_(analysis) hasPhotoCollection Darboux's_theorem_(analysis).
- Darboux's_theorem_(analysis) id "3055".
- Darboux's_theorem_(analysis) id "p/d030190".
- Darboux's_theorem_(analysis) title "Darboux theorem".
- Darboux's_theorem_(analysis) title "Darboux's theorem".
- Darboux's_theorem_(analysis) subject Category:Articles_containing_proofs.
- Darboux's_theorem_(analysis) subject Category:Continuous_mappings.
- Darboux's_theorem_(analysis) subject Category:Theorems_in_calculus.
- Darboux's_theorem_(analysis) subject Category:Theorems_in_real_analysis.
- Darboux's_theorem_(analysis) type Abstraction100002137.
- Darboux's_theorem_(analysis) type Communication100033020.
- Darboux's_theorem_(analysis) type ContinuousMappings.
- Darboux's_theorem_(analysis) type Function113783816.
- Darboux's_theorem_(analysis) type MathematicalRelation113783581.
- Darboux's_theorem_(analysis) type Message106598915.
- Darboux's_theorem_(analysis) type Proposition106750804.
- Darboux's_theorem_(analysis) type Relation100031921.
- Darboux's_theorem_(analysis) type Statement106722453.
- Darboux's_theorem_(analysis) type Theorem106752293.
- Darboux's_theorem_(analysis) type TheoremsInCalculus.
- Darboux's_theorem_(analysis) type TheoremsInRealAnalysis.
- Darboux's_theorem_(analysis) comment "Darboux's theorem (also known as the Intermediate Value Theorem) is a theorem in real analysis, named after Jean Gaston Darboux. It states that all functions that result from the differentiation of other functions have the intermediate value property: the image of an interval is also an interval.When f is continuously differentiable (f in C1([a,b])), this is a consequence of the intermediate value theorem.".
- Darboux's_theorem_(analysis) label "Darboux's theorem (analysis)".
- Darboux's_theorem_(analysis) label "Teorema de Darboux".
- Darboux's_theorem_(analysis) label "Teorema di Darboux".
- Darboux's_theorem_(analysis) label "Théorème de Darboux (analyse)".
- Darboux's_theorem_(analysis) label "Теорема о свойстве Дарбу для непрерывной функции".
- Darboux's_theorem_(analysis) label "达布定理".
- Darboux's_theorem_(analysis) sameAs Darbouxova_věta.
- Darboux's_theorem_(analysis) sameAs Théorème_de_Darboux_(analyse).
- Darboux's_theorem_(analysis) sameAs Teorema_di_Darboux.
- Darboux's_theorem_(analysis) sameAs 다르부의_정리_(해석학).
- Darboux's_theorem_(analysis) sameAs Teorema_de_Darboux.
- Darboux's_theorem_(analysis) sameAs m.0bksl8.
- Darboux's_theorem_(analysis) sameAs Q660799.
- Darboux's_theorem_(analysis) sameAs Q660799.
- Darboux's_theorem_(analysis) sameAs Darboux's_theorem_(analysis).
- Darboux's_theorem_(analysis) wasDerivedFrom Darboux's_theorem_(analysis)?oldid=597934310.
- Darboux's_theorem_(analysis) isPrimaryTopicOf Darboux's_theorem_(analysis).