Kreuze alle richtigen Aussagen zum Oberflächeninhalt des geraden dreiseitigen Prismas an!

[b][color=#9900ff]Aufgabe 2:[/color][/b][br]Kreuze alle richtigen Formeln für den Flächeninhalt G der Grundfläche und für den Oberflächeninhalt O an![br]   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[/img]