[size=150][size=200][i][color=#93c47d]Entwerfen Sie ein dynamisches Arbeitsblatt, [br]anhand dessen der Einfluss der verschiedenen[br]Parameter auf die Lage der allgemeinen Parabel mit der Gleichung: [color=#93c47d][i][size=200][icon]https://www.geogebra.org/images/ggb/toolbar/mode_textfieldaction.png[/icon][/size][/i][/color][/color][/i][br][/size][/size][br][img]data:image/png;base64,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[/img][br][color=#93c47d][i][size=200]im Koordinatensystem untersucht werden kann. [br][br]Idealerweise können Sie die verschiedenen Ansichten durch Wahrheitswerte ([size=150][size=200][i][color=#93c47d][icon]https://www.geogebra.org/images/ggb/toolbar/mode_keepinput.png[/icon][/color][/i][/size][/size]Kontrollkästchen[size=150][size=200][i][color=#93c47d][icon]https://www.geogebra.org/images/ggb/toolbar/mode_keepinput.png[/icon][/color][/i][/size][/size]) ein/ und ausblenden.[/size][/i][/color]