[list=1]Aus Streichhölzern wird eine Figur aus Quadraten gelegt.[br]Das Bild zeigt die Figur mit 4 Quadraten:[br][list=1][img]data:image/png;base64,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[/img][/list]Stellen Sie die Funktionsgleichung A(x) auf, die jeder Anzahl x der gelegten Quadrate die Anzahl A der dafür insgesamt benötigten Streichhölzer zuordnet.[br][br][br][/list]
[math]A\left(x\right)=4+\left(x-1\right)\cdot3=1+3x[/math]
Aus 5cm dickem Styropor wird eine würfelförmige Kiste mit Deckel gebaut. Stellen Sie die Funktionsgleichung der Funktion V auf, die der Kantenlänge x der Kiste, das Volumen des benötigten Styropors zuordnet.
Volumen benötigte Styropor = Volumen der Kistenäusseres - Volumen des Kisteninneren[br][math]\rightarrow V\left(x\right)=x^3-\left(x-10\right)^3[/math]
Dem Graph der Funktion[math]f\left(x\right)=4-x^2[/math] wird ein Rechteck auf die dargestellte Weise einbeschrieben: [br] [img]data:image/png;base64,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[/img][br]D.h das Rechteck ist symmetrisch zur y-Achse, die Grundseite berührt die x-Achse und die oberen[br]Ecken liegen auf dem Graphen. [br]Stellen Sie die Funktionsgleichung der Funktion F auf, die der Breite b des Rechtecks den Flächeninhalt des Rechtecks zuordnet.
[math]F\left(b\right)=b\cdot f\left(\frac{b}{2}\right)=b\cdot\left(4-\left(\frac{b}{2}\right)^2\right)[/math]