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[/img]La pyramide régulière est de hauteur h et sa base est un carré inscrit dans un cercle de rayon 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[/img][br][img]data:image/png;base64,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[/img] [b]Création de la longueur des arêtes latérales a en fonction de r et de h[/b][br][table][tr][td][b][i][u][color=#6fa8dc]Infos :[/color][/u][/i][/b][br] a est obtenue en utilisant l'égalité de Pythagore dans le triangle rectangle d'hypoténuse a et de côtés r et h. [br]Soit a = [img width=55,height=23]data:image/png;base64,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[/img]  . [br]Pour se faire, au clavier, écrire dans la barre de saisie : "a= sqrt(r^2+h^2)" et entrée.[/td][td][img]data:image/png;base64,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[/img][/td][/tr][/table]