Aufgabe: [br]1. Übertrage die folgenden Winkel ins Bogenmaß (auf zwei Stellen gerundet): [br][br] a) 150°[br] b) -80°[br] c) -240°[br] d) 320°[br] e) -450°[br] f) 5°[br] g) 870°[br][br]2. Übertrage die folgende Tabelle in ein Heft und fülle sie vollständig aus:[br][img]data:image/png;base64,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[/img][br]