Grundkompetenz: AG 2.3, AG 4.1, FA 4.4, AN 4.2

Ein kürzlich eröffneter Vergnügungspark ist ein beliebtes Ausflugsziel in der Region.

Beim Eingang zum Vergnügnungspark steht ein Torbogen. Dieser wird durch einen Teil des Graphen der Funktion mit folgender Gleichung beschrieben:[br][br][math]y=9-x^2[/math][br][math]x[/math], [math]y[/math] ... Koordinaten in Metern ([math]m[/math])[br][br]Dabei wird der ebene Boden durch die x-Achse beschrieben.[br][br]Bei einer Parade muss ein [math]4[/math] Meter hoher Festwagen durch den Torbogen geschoben werden. Nach oben hin muss ein senkrechter Minimalabstand von [math]10cm[/math] eingehalten werden (siehe Skizze – nicht maßstabgetreu).[br][img]data:image/png;base64,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[/img][br][br][br][br][b][size=150]1) Berechnen Sie, welche Breite [math]b[/math] der Festwagen maximal haben darf.[/size][/b]

Vor der Parade wird der Torbogen mit einer Folie verschlossen.

[b][size=150]2) Berechnen Sie den Flächeninhalt der dazu benötigten Folie.[/size][/b]

Eine der Hauptattraktionen ist die Hochschaubahn. Ein Teilstück kann durch die Polynomfunktion modelliert werden, deren Graph in der folgenden Abbildung zu sehen ist:[br][img]data:image/png;base64,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[/img][br][br][br][br][b][size=150]1) Erklären Sie, welchen Grad diese Polynomfunktion mindestens haben muss. [/size][/b]

Im Vergnügungspark gibt es ein Kino.[br]Fiona sitzt [math]a[/math] Meter von der Leinwand entfernt (Punkt [math]F[/math]). Der Höhenwinkel zum unteren Ende der Leinwand (Punkt [math]Q[/math]) wird mit [math]α[/math] bezeichnet, der Höhenwinkel zum oberen Ende der Leinwand (Punkt [math]P[/math]) wird mit [math]β[/math] bezeichnet.[br][img]data:image/png;base64,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[/img][br][br][br][br][b][size=150]1) Erstellen Sie eine Formel für die Berechnung der Höhe [math]h[/math] der Leinwand aus [math]a[/math], [math]α[/math] und [math]β[/math]. [/size][/b]