[size=50][size=100]Gebruik[br][list][*][size=50][size=100]de knop [icon]/images/ggb/toolbar/mode_anglefixed.png[/icon] om te draaien[br]selecteer eerst het punt dat je wilt draaien, daarna het centrum en vul daarna de hoek in[br][/size][/size][size=50][size=100]OPMERKING[br]als je de hoek zoals hieronder invult, kun je met de schuifbalk andere draaihoeken onderzoeken[/size][/size][img]data:image/png;base64,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[/img][/*][*]de knoppen [icon]/images/ggb/toolbar/mode_segment.png[/icon], [icon]/images/ggb/toolbar/mode_join.png[/icon] en [icon]https://www.geogebra.org/images/ggb/toolbar/mode_polygon.png[/icon] om vlakke figuren te tekenen en hun draaibeeld te onderzoeken.[/*][*]'delete' om figuren te wissen.[/*][/list][/size][/size]