En GeoGebra disponemos de varias opciones para trabajar con circunferencias que encontramos en el bloque de herramientas que podemos denominar curvas.[br][br][img width=531,height=49]data:image/png;base64,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[/img][br][br]Al abrir este menú de herramientas aparecerán las siguientes opciones:[br][br][img width=220,height=300]data:image/png;base64,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[/img][left][br]Observamos que disponemos de herramientas para dibujar circunferencias, semicircunferencias, arcos y sectores circulares.[br][br]Exponemos de forma breve cada una de las opciones anteriores.[br][/left][list] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Circunferencia_(centro-punto)][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwASABIAhAAAAAAAAAAACAAAHQAAOAAAPAAANwAAPwAAOQAAKgAAOwAALgAAPgAAPQAA7gAA9gAA8AAA9wAA8gECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwVBICCOQBCUZDqe5MmmrwoIRCHfgPMceEpAEQSqJ1IQBjEisSEzqRQSCVMJaESbyeKU2st2RV5VLNyC4cJe8gqVDQEAOw==[/img][/url][b]Circunferencia (centro, punto)[/b]: dibuja una circunferencia a partir de dos puntos, el primero de ellos será el centro y el segundo determinará el radio.[/*][/list][img width=163,height=143]data:image/png;base64,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[/img][br][br][list] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Circunferencia_(centro-radio)][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwASABIAgwAAAAAAAAAADQAALgAAPgAAPQAAOwAANwAA8gECAwECAwECAwECAwECAwECAwECAwQzEMgJQqg0z0svz5+GiaQUlh13auEKolQxbquBIAc8FbdoiQaZTucqqYYt4otUdBU7mFUEADs=[/img][/url][b] Circunferencia (centro, radio)[/b]: dibuja una circunferencia a partir de un punto que será el centro y un valor numérico que corresponderá a la medida del radio.[/*][/list][img width=137,height=131]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAoHBwgHBgoICAgLCgoLDhgQDg0NDh0VFhEYIx8lJCIfIiEmKzcvJik0KSEiMEExNDk7Pj4+JS5ESUM8SDc9Pjv/2wBDAQoLCw4NDhwQEBw7KCIoOzs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozv/wAARCACDAIkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD2aiiigAooqve31rptq91ezpBCg+Z3OBQBYqte6jZabD519dw20f8AelcLn86xhd65r4zYIdIsG6XM8eZ5B6qh4Ue7c+1W7HwxpdlL9oaFru7PW5u282Q/ien4YoAg/wCEsguP+QZpuoagOzxQFEP/AAJ8D8qP7T8SS8xeHYoh/wBN75Qf/HQa3qKAMH7b4qXltEsGHot+c/qlH9u6tAf9M8M3YX+9bTRzfpkGt6igDHtfFWj3Mwge6NrcH/ljdoYX/ANjP4Vr9RkVDdWdrfQmG7t4p4z1SRAw/WsU+HLnTCZPD2oPagc/Y7gmW3b2APzJ+B/CgDoaKxdP8QrLdrp2qWzadqB+7G7ZSb3jfo306+1bVABRRRQAUUUUAFFFQXt5Bp9nNeXUgjhhQu7HsBQBX1fV7fR7QTzBpHdgkMMYy8znoqj1/lVCw0W4vLpNV18rLdL80FqpzFa/T+8/qx/Ck0Synv7v/hINUjKXEi4tLdv+XWI/+zt1J/Ct+gDI13U7qygljsYo3uFtZZ8yPtACgdODk5I68VpWrtLaQyMcs0aknGMkior7TbLU4hFe2yToM8OOx4I+h9KsqqooVRhVGAB2FAC0UUUAFFFFABRRRQBV1HTbPVbRrW9hWWNuRngqexB6gj1FY9vf3fh+7i0/WJmuLOZglrqDdQ3aOX39G6H610VQ3lpb39pLaXUSywyqVdGHBFAE1FYGjXVxpt+fD2oStKyoXsrhzzPEOqn/AG14z6jB9a36ACiiigArnb8f294kj0v71lp224ux2kkPMaH2H3j/AMBrcu7mOztJrqY4jhjaRz7AZNZfhS1kh0Vbu4XF1qDm7n9QX5A/BcD8KANqiiigAooooAKKKKACiiigAooooAKKKKAMrxDpcmpacGtSEvrVhPaSf3ZB2+hGQfY1Y0fU49Y0q3vo1K+avzIeqMOGU+4IIq7XP6YP7M8U6hpo4hvFF9AOwYnbIB+O0/8AAqAOgooooAwvGBMmipYr1v7mK2P+6zDd/wCOg1uKAqhVGABgCsLXv3mueH7c9DdvJj3WJiP51vUAFFFFABRRRQAUUVFc3MFnay3VzKsUMKF5HY4CqBkk0AQX11LC8EFuqGa4YqpkztUAEknHXp0qW1Nz5ZF0I96tgNHnDD1wen05rn9J8WeHfGcr2unXkouLf94vymNwOm5c9Rzg/XkV0NtbrbRlBJJIScs8jZZjW9SPIuWSs/Na/wBWEtSaiiisBhRRRQAVg+If9G1XRNRXql39nf8A3ZVI/wDQgtb1YPjP5fDrz94J4JR9RKtAG9RRRQBg658niLw9KeguJU/FomrerB8W/ubOxv8AHFlfwysfRSdjfo1b1ABRRRQAUUUUAFVNV02HWNKutNuCwiuomjcqcEAjGRVuimnbVAcL4K+GkPhPVZdRkvzdy7SkWI9gVT68nJruqKK1rV6lebqVXdsSSSsgooorEYUUUUAFYPjTnwxPH3kkhQfUyLW9WD4n/fy6RYDlrjUI3I/2Y8uf/QRQBvUUUUAU9WsF1TSbqxfgXETJn0JHB/A1X8OX7aloNrPLxOq+XOvdZF+Vh+YNalc9Cf7E8Vy27fLZ6wfNiPZLhR8y/wDAlAP1BoA6GiiigAooooAKKKKACiiigAooooAKKKKACsCI/wBpeNZZBzDpVv5QPbzpMFvyUL/31Wlq+pxaRpc99KC3lr8iDq7HhVHuSQKr+HNNl03SVW5Ia8nZp7pvWRjk/l0HsKANWiiigAqhrOlR6xpr2ju0T5DxSr96KQcqw9wav0UAZOg6tJfRSWl8gh1KzIS5iHQns6+qt1H5dq1qyNa0eW7ki1HTpVt9TtgRFI33ZF7xv6qf0PIp+j63Fqgkgkja1v4OLi0kPzIfUf3lPYjigDUooooAKKKKACiiigAooooAKQkAZJwBQzKilmIVQMkk4AFczNPN4vkNrZM8WiqcT3Q4N36pH/s+rd+g9aAH2pPifWU1A5Ok6e5+yg9LiboZP91eQvqcn0rpKZDDHbwpDCixxxqFVFGAoHQCn0AFFFFABRRRQAVm6todvqvly75La8h/1F3CcSR/4j1B4NaVFAHOrrl/ouIvEVvmEcDUbZCYiP8AbXqh/Me9bltdW97As9rPHPE/KvGwYH8RUpGRg1jXHhTTnna5sjNply3LS2T+XuP+0v3T+IoA2qKwfs3imz4hv7HUUHa5hMT/APfSZB/KlGqeIoxiXw2kh9YL5CD/AN9AUAbtFYX9s64eF8LTg/7V3CB+hNJ9q8V3BxFpmn2Y/vT3LSH8lUfzoA3qytS8R6dp032Yu1zeN920tl8yU/gOn1OBVU6BqN9/yFtduHQ9YLNRbofYkZY/nWnp2k6fpMRisLSK3U8sUHLH1J6n8aAMgaVqXiBhJrpFtZZyumwvnf8A9dXH3v8AdHH1roURIkWONVRFGFVRgAU6igAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/Z[/img][br][list] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Comp%C3%A1s][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAAAUABgAhQAAAAAAAAAAGQAADAAAEQAAOwAAPQAANwAAOgAAOAAANgAAIgAAKgAAJgAAMwAAPwAAOQAANQAAQgAAWAAARQAAfgAAbgAAZgAAnQAAigAAoQAAwAAAyAAA+QAA/AAA5QAA6QAA/9oAAP8AAO0AAAECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZiQIBwSCwaiSNAcnksJo3PZlQKbSKd1qz2uj0+p0OJoUs0dDyIAECtFgnBgMQHpCAT61WlHbvvw7d/f0OCb1iEhn0ADUcHWRgaDkUPGxNNFCEhEGxrFSEcEU0WF0YHGQiJQ0EAOw==[/img][/url][b] Compás[/b]: a partir de un segmento o de dos puntos, aparecerá una circunferencia cuyo radio corresponde a la medida del segmento seleccionado o del segmento que une los dos puntos. Al hacer de nuevo clic en la vista gráfica queda fijado el centro de la circunferencia.[/*] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Circunferencia_por_tres_puntos][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAEAAwAUABQAhQAAAAAAAAAACAAAEwAAHQAAGQAADwAABgAAAwAAOAAAPAAANwAAPwAAOQAAKgAAOwAAIAAANgAALgAAKAAANQAARAAAQAAAVwAAWQAAcAAAhAAAoAAArAAApAAAsQAA7gAA9gAA8AAA9wAA/wAA8QECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZVQIBwKAwYAQGiUpkkJpvLqFKQUEivgA+IgV0mQqLGEIp9JAgAxebRXXJGnfYYUPFY5Hhpk9zm4/19TnJ+gINREUhYfBckGX8ACBojHhN5ABQYYpZSQQA7[/img][/url][b]Circunferencia por tres puntos[/b]: dibuja la circunferencia que pasa por tres puntos.[/*] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Semicircunferencia][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAwASABAAhAAAAAAAAAAACAAAOQAAPAAANwAANgAAPwAAOAAAKgAAOwAAMwAALgAAPgAAOgAAIgAAQQAAQAAA7gAA9gAA8AAA9wAA+wAA9AAA8gAA5wECAwECAwECAwECAwECAwECAwU3ICCOAVCWY5qipKmK7AsIAyHfgDQduIpQlYGrJ1JAFjGi8pZcOlvPaEphc0YsF4WzgckYntpnCAA7[/img][/url][b]Semicircunferencia[/b]: traza la semicircunferencia a partir de dos puntos que son considerados los extremos del diámetro.[/*] [/list][img width=179,height=142]data:image/png;base64,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[/img][list] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Arco_de_Circunferencia][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAQAAgAQABQAhQAAAAAAAAAABAAAFQAAEQAAHQAAGwAANQAAJAAANwAALwAAMgAAOwAANgAAOQAAIgAAKgAAVgAATAAAQAAAUwAAXQAAegAAcQAAbwAAdQAAYQAAlwAAsAAAoAAAogAA0gAAzgAA1gAA/wAA5AECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZAQIBwSCwaAZGP5GjkiDbMYsKiCESP1msxqx1yu2DiVzsOmwEX0OSaDYkwYEamwQ4Two4OBawRjQ5dDR4VYRBCQQA7[/img][/url][b]Arco de circunferencia[/b]: dibuja el arco de una circunferencia a partir  de tres puntos, el primero es el centro de la circunferencia y los otros dos puntos corresponden a los extremos del arco.[/*] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Arco_Tres_Puntos][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAEAAwAUABQAhQAAAAAAAAAACAAAFwAAHQAAGQAABgAADAAAOAAAPAAANwAAPwAAOQAAKgAAOwAAIAAANgAALgAAKAAANQAARAAAQAAAVwAAWQAAbwAAiAAAoAAArAAApAAAsgAAsQAA7gAA9gAA8AAA9wAA/wAA8QECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZPQIBwKAwYAQGiUpkkJpvLqFKASEivgA9ogV0iQiLGEIp1IAiAhMbRXW5GnPYYQOlU5HgpOb/H99t/eYKCEIMAFiQYBoIZIx4SghMXYoZLQQA7[/img][/url][b]Arco tres puntos[/b]: dibuja un arco en la circunferencia que pasa por los tres puntos marcados, en los que el primer y el tercer punto son los extremos del arco.[/*] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Sector_Circular][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAQAAgAQABQAhQAAAAAAAAAABAAAFQAAEQAAHQAAGwAANQAAJAAAMwAALwAALQAAPwAAMgAAOwAANAAAIgAANgAAKgAAVgAATAAAUwAAXgAAXQAAeAAAcQAAawAAdQAAlwAAsAAAoAAAogAA0gAAzgAA1gAA/wAA5AECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZLQIBwSCwaARMQ5WjsjDjMYgKjCESHVmGWudVejV1iODr2isnFMvcrzIQY16xopGEDHJuHGqC2bglsVg8eFXYWIyQHbBEfF3YAEkJBADs=[/img][/url][b]Sector circular[/b]: dibuja un sector circular a partir de tres puntos; el primero  es el centro de la circunferencia y los otros dos puntos corresponden  a los extremos del arco del sector. Los extremos se deben marcar en sentido antihorario.[/*] [*][url=https://wiki.geogebra.org/es/Herramienta_de_Sector_Tres_Puntos][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAEAAwAUABQAhQAAAAAAAAAACAAAFwAAHQAADAAADgAABgAAOAAAPAAANwAAPwAAOQAAKgAAOwAAIAAALgAAKAAANQAARAAAQAAAVwAAWQAAbwAAiAAAoAAArAAApAAAsgAAsQAA7gAA9gAA8AAA9wAA/wAA8QECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZWQIBwKAwYAQGiUpkkJpvLqFKASEivAM9ngV0iQCHGEIp1IAiARMbRXWpEG2RbPuFQinLyfBzVL/1yWICATIV7h3yIQxCKABUjFweIGCIdEYgSFmKNS0EAOw==[/img][/url][b]Sector tres puntos[/b]: dibuja un sector utilizando tres puntos que corresponden a la      circunferencia sobre la que se encuentra el sector. Los tres puntos son puntos del arco, el primero y el tercero determinan los extremos del arco del sector.[/*][/list]

[br]Antes de comenzar con distintas construcciones, describiremos algunos elementos que se pueden dibujar en una circunferencia como son el radio, cuerda y el diámetro.[br]Un radio es un segmento que une el centro de la circunferencia con un punto cualquiera, por lo que bastará con seleccionar la herramienta [b]Segmento[/b] para trazar el que une el centro con un punto  cualquiera, tal y como aparece en la imagen siguiente:[br][br][img width=198,height=176]data:image/png;base64,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[/img][br][br]Una cuerda es un segmento que une dos puntos de la circunferencia, por lo que bastará con repetir el proceso anterior, seleccionando la herramienta [b]Segmento[/b], haciendo clic sobre dos puntos de la circunferencia que pueden estar creados previamente o crearlos directamente al hacer clic sobre la circunferencia.[br][br][img width=211,height=182]data:image/png;base64,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[/img][br][br]Observemos que aunque podía utilizar el punto B, no lo he hecho ya que es conveniente dejar este punto como punto que determina el radio de la circunferencia, a partir del cual se creó.[br]Diámetro es una cuerda que pasa por el centro, por lo que recordemos el ejemplo 1 del tema 1 en el que realizamos su construcción.[br]Para construir el diámetro hay que aplicar relaciones para que al mover los puntos extremos, la cuerda siga siendo un diámetro.[br]