Die Funktionsgleichung einer linearen Funktion wird immer so angegeben:[br][math]y=m\cdot x+n[/math][br]Dabei ist der Wert vor dem x immer die Steigung (abgekürzt mit m).[br]Der Wert hinter dem x ist der Schnittpunkt mit der y-Achse (Achsenabschnitt n).
a) Gib für folgende Funktionen m und n an.[br][img]data:image/png;base64,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[/img]
b) Stelle die Funktionsgleichung der linearen Funktion auf.[br][img]data:image/png;base64,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[/img][br]Kontrolliere die Lösungen: http://bit.ly/2sb0g1s