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[/img]Les pyramides régulières seront de hauteur h et de base un polygone régulier à n côtés inscrit dans un cercle de rayon r.[br][br][img]data:image/png;base64,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[/img] [b]Création des curseurs r, h et n[/b][br]Créer les curseurs ci-dessous avec l'icône : [size=200][icon]/images/ggb/toolbar/mode_slider.png[/icon][/size][br][table][tr][td]1. Créer r est un curseur "Nombre" pour le rayon de la pyramide[b][br]Nom[/b] r = 1 [b]Intervalle[/b] min 1 max 10 Incrément 0.1[br]2. Se remettre en mode souris [icon]/images/ggb/toolbar/mode_move.png[/icon]et déplacer le point sur le segment[br]3. Créer h est un curseur "Nombre" pour la hauteur de la pyramide[br][b]Nom[/b] h = 0 [b]Intervalle[/b] min 0 max 10 Incrément 0.1[br]4. Se remettre en mode souris [icon]https://www.geogebra.org/images/ggb/toolbar/mode_move.png[/icon]et déplacer le point sur le segment[br]5. Créer n est un curseur "Entier" pour le nombre de côtés de la base de la pyramide[br][b]Nom[/b] n = 3 [b]Intervalle[/b] min 3 max 30 Incrément 1[br]6. Se remettre en mode souris [icon]https://www.geogebra.org/images/ggb/toolbar/mode_move.png[/icon] et déplacer les points (curseurs) sur [br]leurs segments [br][br]Mettre r = 3, h = 4 et n=4[/td][td][img]data:image/png;base64,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[/img][/td][/tr][/table]