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Ensemble des points du plan d'où l'on ne peut mener aucune tangente à une conique.\r\n\r\n

\r\n\r\n

L'intérieur d'un hyperbole correspond à la région où sont situés les foyers.\r\n\r\n

\r\n\r\n

\r\n

Exemple

\r\nLe graphique ci-dessous illustre en orangé l'intérieur de l'hyperbole d'équation [latex]\\dfrac{x^2}{4} − \\dfrac{y^2}{7} = 1[/latex], soit la région déterminée par l'inéquation [latex]\\dfrac{x^2}{4} − \\dfrac{y^2}{7} ≥ 1[/latex].\r\n\r\n

\r\n\r\n

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Intérieur d'une conique

Exemple

Netmath, la plateforme éducative où tous les élèves ont du plaisir à apprendre!