Gegeben ist folgende Wertetabelle und zwei Funktionsgleichungen. Entscheide, welche der Gleichungen zu der Wertetabelle passt. 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[/img]

Welche der vier Gleichungen passt zu dem unten gegebenen Funktionsgraphen?

Wähle mithilfe des untenstehenden Schaubilds aus, wann der Fahrradfahrer am Schnellsten ist.

Unten sind sind die Graphen der Funktionen [math]f[/math], [math]g[/math] und [math]h[/math] gegeben. Wähle aus, welche Funktion an der Stelle [math]x=2[/math] die größte Steigung hat.

Wähle die Beschreibung aus, wie der Graph der Funktion [math]f(x)=2x^2-3[/math] aus der Normalparabel hervorgeht.

Wähle die Funktionsgleichung aus, die zum Graphen der Funktion [math]f[/math] passt.