Du hast aus einer Funktionsgleichung bereits Wertetabellen ausgefüllt.[br]Mit einer Wertetabelle können wir ganz einfach den Graph zeichnen.[br]Aufgabe 2.3 [br]a) Probiere es aus. Spiele bis zu einem Punktestand von 10.

b) Zeichne nun die Graphen deiner Wertetabellen aus 2.1 a)-d)[br][img]data:image/png;base64,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[/img]

c) Zeichne nun die Graphen deiner Wertetabellen aus 2.1 e)-f)[br][img]data:image/png;base64,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[/img]