Entscheiden Sie, welche der folgenden Funktionen Exponentialfunktionen sind
Entscheiden Sie, welche Aussage richtig ist bezüglich des Graphen K[sub]f[/sub] der Funktion f[br][img 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[/img]
Geben Sie einen Funktionsgleichung an für den Graphen an.[br][img 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[/img]
Geben Sie die Funktionsgleichung an für den Graphen an.[br][img 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[/img]
Eine Exponentialfunktion mit der Basis a=1,5 wird um 2 Längeneinheiten in die positive x-Richtung verschoben und um 4 Längeneinheiten in die negative y-Richtung. Geben Sie die Funktionsgleichung an
Tüffteln Sie die Graphen zweier Exponentialfunktion heraus, die die y-Achse bei (0/-2) schneiden und streng monoton fallend sind.
Gegeben ist die Funktion:[br]f(x)=(-3)0.5[sup]x[/sup]+2[br]Berechnen Sie f(1)
Gegeben ist die Funktion:[br]f(x)=(-3)0.5[sup]x[/sup]+2[br]Für welches x gilt f(x)=-4
Gegeben ist die Funktion:[br]f(x)=(-3)0.5[sup]x[/sup]+2[br]Für welches x gilt f(x)=8
Gegeben ist die Funktion:[br]f(x)=(-3)0.5[sup]x[/sup]+2[br]Berechnen Sie den Schnittpunkt mit der y-Achse