Bei der Benutzung eines Tablets oder Smartphones überdeckt man bei der Bedienung eines Applets mit seiner Hand gegebenenfalls das Applet und wichtige Aspekte sind so schwerer 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[/img][br][size=50](CC BY 4.0 https://vectorportal.com/de/vector/arbeiten-an-einem-tablet/12969)[/size][br][br]Durch das Festlegen der Händigkeit zu Beginn einer Aktivität kann man sicherstellen, dass die Bedienung eines Applets auf der "richtigen" Seite erfolgt.

[icon]/images/ggb/toolbar/mode_zoom.png[/icon][b][u][color=#38761d][size=150]Definition:[/size][/color][/u][/b][br]Eine Funktion [math]f[/math] mit [math]f\left(x\right)=x^n[/math] mit n = 1; 2; 3; ... heißt [color=#ff0000][b][u]Potenzfunktion[/u][/b][/color].[br]Ihr Graph heißt [b][u][color=#ff0000]Parabel n-ter Ordnung[/color][/u][/b].[br][br][icon]/images/ggb/toolbar/mode_showhidelabel.png[/icon][u][b][size=150]Arbeitsauftrag:[/size][/b][/u][br]Variiere den Wert von n. Finde Gemeinsamkeiten und Unterschiede zwischen den verschiedenen Parabeln.

[icon]/images/ggb/toolbar/mode_sumcells.png[/icon] [u][b][size=150]Zusammenfassung 1:[/size][/b][/u][br]Fülle mithilfe deiner Erkenntnisse aus dem Applet den folgenden Lückentext aus:[br][size=85]([u]TIPP:[/u] Benutze [img]https://learningapps.org/style/fullscreenicon.png[/img] für den Vollbild-Modus)[/size]

Verändert man den Funktionsterm einer Potenz-Funktion [math]f[/math] mit [math]f\left(x\right)=x^n[/math], so verändert sich auch der zugehörige Graph.[br]Das hast du bereits bei der quadratischen Funktion ([math]f\left(x\right)=x^2[/math]) untersucht - gelten die dort festgestellten Auswirkungen für die Graphen aller Potenzfunktionen?[br][br][icon]/images/ggb/toolbar/mode_showhidelabel.png[/icon] [b][u]Arbeitsauftrag:[/u][/b][br]Jeder Parameter in der Gleichung [math]g\left(x\right)=a\cdot\left(x-c\right)^n+d[/math] hat Auswirkungen auf den Graphen einer Potenzfunktion.[br][br]Untersuche diese Auswirkungen, indem du nacheinander die Werte der Parameter durch Eingabe oder Schieberegler veränderst.[br]

[icon]/images/ggb/toolbar/mode_sumcells.png[/icon][size=150] [u][b]Zusammenfassung 2:[/b][/u][/size][br]Die Kärtchen fassen die Auswirkungen der Parameter auf den zugehörigen Graphen zusammen - findest du alle Paare?[br][size=85]([u]TIPP:[/u] Benutze [img]https://learningapps.org/style/fullscreenicon.png[/img] für den Vollbild-Modus)[/size]

[icon]/images/ggb/toolbar/mode_createtable.png[/icon][b][u][size=150] Übung:[/size][/u][/b][br]Ordne Graph und Funktionsgleichung einander zu.[br][size=85]([u]TIPP:[/u] Benutze [img]https://learningapps.org/style/fullscreenicon.png[/img] für den Vollbild-Modus)[/size]