Um eine lineare Funktion vollständig zu beschreiben, benötigt man genau zwei Parameter, d.h. zwei Zahlenangaben:[br][br]1. Den Wert, der pro x-Schritt addiert wird![br] man nennt ihn den [b][i]Zuwachs pro x-Schritt[/i][/b] [br] und notiert ihn mit dem Buchstaben [b][i]a[/i][/b] (z.T. auch m)[br] (nehmen die Funktionswerte ab, ist der Zuwachs pro x-Schritt eine negative Zahl)[br][br]2. Den Startwert, d.h. den Funktionswert bei x = 0![br] man nennt ihn den [b][i]Anfangswert[/i][/b] oder [i][b]y-Achsenabschnitt[/b][/i] [br] und notiert ihn mit dem Buchstaben [b][i]b [/i][/b](z.T. auch c)[br][br]Beispiel:[br][img]data:image/png;base64,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[/img][br]Bei dieser linearen Funktion ist a = -3 und b = 12.

Arbeiten Sie so lange mit dem Applet, bis Sie 7 korrekte Lösungen erzielt haben!