Ein Beispiel: [br][i]In eine Käserei wird Milch im Kühlwagen angeliefert und hat eine Temperatur von 2°C. Zum Pasteurisieren wird sie erwärmt. Dabei steigt die Temperatur pro Minute um 4°C an.[/i][br][br]Die Wertetabelle zeigt, wie sich die Temperatur entwickelt:[br] 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[/img][br] [br]Der Käser sucht nun eine Formel, mit der er die Temperatur der Milch für jeden beliebigen Zeitpunkt x berechnen kann. Anders ausgedrückt: [br]er sucht die [i]Funktionsgleichung [/i]der Funktion f(x), die den Verlauf der Temperatur in Abhängigkeit von der Zeit x angibt.[br] [br] 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[/img][br][br]Wir erkennen: [br]Den Wert der Temperatur zum Zeitpunkt x - und das heisst der Funktionswert von f(x) zum[br]Zeitpunkt x - berechnet man, [b][i]indem man zum Anfangswert 2 den Zuwachs von 4 pro Zeitschritt x-mal addiert:[/i][/b][br] [img]data:image/png;base64,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[/img][br]Das kann man verallgemeinern, indem man den Anfangswert (d.h. den Funktionswert bei x = 0) durch den Platzhalter b und den Zuwachs pro Zeitschritt durch den Platzhalter ersetzt:[br] 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[/img][br]Wir erkennen: [br]Allgemein gilt für den Funktionswert einer linearen Funktion bei einem beliebigen x-Wert: [br][br] [img]data:image/png;base64,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[/img][br][b]Fazit:[br]Die Funktionsgleichung einer linearen Funktion mit dem [b]Zuwachs pro Zeitschritt a [br]und [/b]dem Anfangswert b lautet:[/b][br] [img]data:image/png;base64,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[/img]

Arbeiten Sie solange mit dem Applet, bis Sie 7 Aufgaben korrekt gelöst haben!