Grafisches Ableiten Üb

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[img 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[/img][br]Sie sehen den Graphen der Ableitungsfunktion von f (rot).[br] Welches Graph gehört zu f ?
3. Aussagen über die Tangentensteigung
für die Steigung m der Tangente[br][img width=181,height=170]data:image/png;base64,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[/img]
4. Funktionsterm der Ableitungsfunktion
[list=1][*]Zeichnen Sie den Graphen der Ableitungsfunktion.[/*][*]Ermitteln Sie aus dem Graphen, den Funktionsterm der Ableitungsfunktion.[/*][*]Geben Sie, dann den Funktionsterm der Ableitungsfunkion ein.[/*][*][img]data:image/png;base64,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[/img][br][/*][/list]
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