O applet seguinte tem setores circulares em que ponto vermelho translada a peça e o ponto azul rotaciona. Monte um figura parecida com essa:[br] [img]https://www.geogebra.org/resource/yqwccerx/MEwy5BcvkOgiVlk6/material-yqwccerx.png[/img]

O applet seguinte tem setores circulares em que ponto vermelho translada a peça e o ponto azul rotaciona. Monte um figura parecida com essa:[br] [img]data:image/png;base64,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[/img]

O applet seguinte tem setores circulares em que ponto vermelho translada a peça e o ponto azul rotaciona. Monte um figura parecida com essa:[br] [img]data:image/png;base64,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[/img]

Construa a figura seguinte no applet, usando apenas as ferramentas polígono regular e arco circular. [br] [img]https://www.geogebra.org/resource/djmggjxc/pFJNSF7QUO3WoffF/material-djmggjxc.png[/img][br]

Construa a figura seguinte no applet, usando apenas as ferramentas polígono regular, ponto médio, segmento e arco circular. [br] [img]https://www.geogebra.org/resource/gpsh9pz8/QIIsJ9O1jvuuewgJ/material-gpsh9pz8.png[/img][br]