Grundkompetenz: AG 2.1, AN 1.3, AN 3.3, AN 4.3

Folgende Grafik zeigt den Entwurf einer Halfpipe im Querschnitt:[br][img]data:image/png;base64,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[/img][br][br][br][b][size=150][br]1) Erstellen Sie eine Formel für die Berechnung des Flächeninhalts [math]A[/math] der grauen Fläche (Querschnittsfläche) aus [math]a[/math], [math]b[/math], [math]h[/math] und [math]r[/math]. [/size][/b]

Die Geschwindigkeit einer Skaterin in Abhängigkeit von der Zeit lässt sich näherungsweise mithilfe der Funktion [math]v[/math] beschreiben. Der Graph dieser Funktion ist in der nachstehenden Abbildung dargestellt.[br][br][br][b][size=150]1) Veranschaulichen Sie in der Abbildung denjenigen Weg, den die Skaterin zwischen [math]t=0,5s[/math] und [math]t=1s[/math] zurücklegt.[/size][/b]

[b][size=150]2) Beschreiben Sie die Bedeutung von [math]v′(0,3)[/math] im gegebenen Sachzusammenhang.[/size][/b]

Der zurückgelegte Weg eines Skaters in Abhängigkeit von der Zeit lässt sich näherungsweise mithilfe der Funktion [math]s[/math] beschreiben. Der Graph dieser Funktion ist in der nachstehenden Abbildung dargestellt.[br][b][size=150][br][br]1) Ermitteln Sie die mittlere Geschwindigkeit zwischen [math]t=0,6s[/math] und [math]t=1,2s[/math].[/size][/b]