[i]A partir de una circunferencia de centro A, traza el diámetro que pasa por un punto P de la circunferencia.[br][br][/i][br]Realicemos los pasos siguientes:[br][br]Trazamos la recta que pasa por A y P. Para ello, seleccionamos la herramienta [b]Recta [/b][url=http://wiki.geogebra.org/es/Archivo:Tool_Line_through_Two_Points.gif][img width=32,height=32]data:image/png;base64,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[/img][/url], pulsando sobre A y posteriormente, sobre P.[br][img width=416,height=233]data:image/png;base64,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[/img][br]Determinamos el punto de intersección de esta recta con la circunferencia. Utilizamos la herramienta [b]Intersección [/b][url=http://wiki.geogebra.org/es/Archivo:Tool_Intersect_Two_Objects.gif][img width=32,height=32]data:image/png;base64,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[/img][/url] para obtener el punto C.[br][img 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la recta anterior. Para ocultar un objeto hay que seleccionarlo, utilizando la herramienta  puntero, pulsando a continuación el botón derecho para que aparezcan las opciones que permitirán modificar las propiedades de un objeto.[br][br][img 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ooAKKKKACiiigBLT/j+uP8Acj/9mq7VK0/4/rj/AHI//Zqu0AFFFFABRRRQAUUUUAFFFFABRRRQAVk65aTlYtTsUL3tiSyoOsyH78f4jp7gVrUUAQWV5BqFnFd2z74pl3Kf8fep6wZf+Kc1JrgcaXeyZl9LaU/xeyt39Dz3NbtAC0UUUAZll/x5x/Q/zNT1BZf8ecf0P8zU9ABWB44z/wAIlPtYI3mQ4YjIB8wc1v1HPbw3Vv5FxDHNE4+aORQynnuDQBk31xrFjpWoXLana3kkNtI8UcVrsO8DIP32z9MVlXUsenaRaXVvr11NJO9q0vmXW8FWkG5wOqg5wcYHtXR22j6XZTCa0020t5QMB4oFVsfUClj0rTYo5o49OtUSf/WqsCgSf7wxz+NHUDlbvV5rjW72whuriZWvikcUNyIQAsKkjzM/KATnA5NR6Lqd1q1poVtealKsM4ufNmhmKNM0bYRfMGD0yexOK606PpZgEB020MIYMI/IXaCBgHGOuKdJpmny25t5LC2eFn3mNoVKlvXGMZ96SBnLXup3VkuqpZanLcxQWtqEnaQP5YZ2V5MjjIHf25qHUZp7K9l0nTtVujaGSzPmibe8bSSEMof/AGlAOPeu0S0togRHbxICgjIVAMqOi/T2qOHTrG3gEEFlbxRBw4jSJVUMOhwB196a3Ay9GnkthrkEt1NNFYXLCJ5WMjqvlq2MnlsEnrWN4d1S8k8S2cMlzKYb3T3n2T3QlaQgqQ+0cR8E/KPT2rs1ijRnZI1UyHc5C4LHpk+vFQQaXp9q4e3sLWFwxYNHCqkE8E5A6mhb/wBdgZgavezw+K7ezjv5ks7gxm72sf8AR2yfLUH+ESEYP096veK5NZj0l20hY9+5Nx3OJB86/dCg8Yzn2rVa0tn8zfbRN5pBkygO8joT64qbmjoHU5/xWbj/AIQXVDeeTHL9mbcYSWRfcZANM0h2t/ECWVtqE19aSaes8hlmMux9wCkE9Awzx04roJYo5omiljWSNhhkdcgj3BqO1srSyVltLWG3VzuYRRhNx9TjrQtw6HPR3l9/wljaGbmUqk5vdxJybcrwmfTecY9BVrxHJrqT6f8A2WkBiN2gkJdwxGGyG2gjZ05rThsBHqM988plllURrlQPLQc7RjryScmrdHYO5ieJLu8s/D6yeattLJNFFPNCSRErOAzKT04PU9Ku2EEFqtxDb6hPdbWyVln85oiR0BPPPXBNXHRJY2jkRXRxhlYZBHoRUdrZ2tlF5NpbQ28ec7IYwgz64FAGPpkl61+gmfXinORd28CxdO5UZqpqDwRa14hN6yKj6Wnl7z1TD7gM+5H6V1NQXFlaXbxvc2sE7RHdG0sYYofUZ6UmrjTsQaGsyaBpy3GfOFrEH3dc7RnPvV6iiqbu7kpWVgooopDCiiigAooooAKKKKAK0d/Z2uqyQXF1FFLLGhjR3ClgM5xn61qAgjIOQaxbjRdN1m5nj1KyhuVRE2+YuSv3uh7VRPgyWxy2g65e6ee0Tt50X/fLf40AdTRXK/bvGWl/8femWurxD/lpZyeXJ/3y3H61Lb+PNGaUQX5n0uc8eXexGP8AJun60AdLRUUFzBdRiW3mjmQ8hkYMD+VFAEtFFFABRRRQAUUUUAFFFFADJYo54nilRXjdSrKwyGB6g1j2ssmgzpp93Iz2MjbbS4c58s9onP8A6Ce/Tr126juLeG6geC4jWSKQbWRhkEUASUVgi5uPDhEV68lxpecR3R+Z7f0WT1X0ft39a3EdZEV0YMrDIYHIIoA8502CXUW1Sa51zVLcQahJDFHBc7ECjBHGD61cGlAjI8Ra5/4GD/CovC4Bl1zI3Y1STj8BXV6Vc21/50aQf6ghS+DgkjoM+lRGEWrs7K+IqQqcsXZadPI5pdHLfd8Q66fpeD/4mnjRW2jOva90/wCfz/7GuquIIlniwgHX+VZHifUJtF8Py39lbRT3CFFSOTIVizY7fWm4RRmsTWfX8jM/sU/9B3Xv/Az/AOxo/sU/9B3Xv/Az/wCxqXVfEgtINFksraKZtSmjDhyf3cZIBPHfJwK0v7b0k3/2Pe4bzfIEpiYRGT+4H6bvajkiH1qr3/BGR/Yp/wCg7r3/AIGf/Y0f2Kf+g7r3/gZ/9jVu88U6bBp1xd29vdT+XC8sJ+zOEn29drYwR7+nNTQ+ItKfckomikigWa43wMFhDLkbj2z2HelyRD6zV7/gjO/sU/8AQd17/wADP/saP7FP/Qd17/wM/wDsa0z4h0dbW5uJTNALQp5yTW7I67zhTtIyQSetWp76ytdN/tC5WSCHA4kjIfJOAu3rknoKOSIfWavf8EYX9in/AKDuvf8AgZ/9jR/Yp/6Duvf+Bn/2NX5ddtnNqtpEd8l8lrPFcRtHJFuVmyVPPYY7Vb1DVNP0yVYp1leRkMmyCFpGVB1YgdB70ckQ+s1e/wCCMX+xT/0Hde/8DP8A7Gj+xT/0Hde/8DP/ALGp/wDhK7CPVru3lQvaQ28M8dxbxNINjgksxHAXjr9auPrmmwy3CyTCXZLHFHHBCzOzMoYAY+/kc8dBRyRD6zV7/kZn9in/AKDuvf8AgZ/9jR/Yp/6Duvf+Bn/2NXf+EjspNS061treaVLwyh3MTDySmMqw/hOTznoPrVqy1rStQuVt4GfdIGaFpImRZwvUoTwwHtRyRD6zV7/gjnNY0+ax0a8u4Nd1zzYIWdN93lcj14rqNOvhcW8AcuXMSEknqcCq3iuJB4S1UhRkWr/ypdPUD7NgY/cp/wCgihJKWhVScp0U5b3f5I2MD1b8x/hRgerfmP8ACiirOUMD1b8x/hRgerfmP8KKKADA9W/Mf4UYHq35j/CiigAwPVvzH+FGB6t+Y/woooAMD1b8x/hRgerfmP8ACiigAwPVvzH+FGB6t+Y/woooAMD1b8x/hSYHq35j/ClooAS0/wCP64/3I/8A2artUrT/AI/rj/cj/wDZqu0AFRXFrb3cRiuYI5kPVZFDA/nUtFAHNT+A9GMhlsftGmSN1azmaMH6jpRXS0UAFFFFABRRRQAUUUUAFFFFABRRRQAhAYFWAIPBB71htpl5orGbRAJLYnL6dI2F9zE38B/2fu/St2igDz7wi26TWWKlCdTclW6jgcGu0kQyW8fllSB1UttB/KuPbwq4824tdYv7cXUzTvHFt2hieccZ7Cpk0K52A/8ACUasB7MmP5VCulZo6qqpzlzKa6dH29DqZAVaBWfewUgt6nFZviLT7jVNHFra7PM86J/nbAwsgY/oKyTo93E3HifV846kp/hVXUvM0jT3vr3xVrCQR43MFRiMnHQLTcnpoZqlT/nX3P8AyJX8L6iZ5zmAxR3sLWY34KQCTzGB9Dk4A/2RUy6DqYhi0nZCLGHUPtYuzLlmXeZAmzHDZOM5xiqV5IbBLV7jxbq6rdyLHDtVDuZunRenvVz+zL8f8zNq/wD45/8AE0k2un9aDdOm/tr7n/kQP4d1Z47q2tYE063lt543hW8aWCVnHylUI/d889utWho+sNZ6s8flW11eQQLEBLu2sigMN2OOnB981DPZ3VtbyXE3inVkijUs7HZgAdT92nJp966K6+J9X2sAQfk7/wDAaLvsP2dP+dfc/wDIqp4Y1RpNScWsUK3v2ZlEl4ZnDRyAtvY9SR0P0Fb/AIl0mXWNMWKBsTQzxzoPMMe8qc7dw5XPqOlZf9mX/T/hJtX/APHP/iaP7Nvs4/4SfV8/8A/+Jou+wvZ0/wCdfc/8gg8PXbXMN2bMW8i3sUshlv3uJGjRWHLNx1bgCr99Zajb63JqenW8V0bi1Fu8ck3l7CpJVuhyPmOR1rMntbm2MYm8VashlkEaZ2fMx6D7vsadHYX0qbh4k1pfZ1QH8ttF32/qw/Z0/wCdfc/8iCz8O63pCXdnaw2t1DdWMVr5zS7CjKpDMVxyvzcDrxVK28PyXOoXElg7XC6ZcxRrsuDB5wFusbASL0I/+tWt/Zt//wBDNq//AI5/8TR/Zl//ANDNq/8A45/8TT5pdhezp/zr7n/kNi8OXazWsy2aQiR7gXSm9aVwJECh97feYBeQKsadpGqfaNHjvYoIoNGRlWSOXebgldikDHyjHJz3qpDa3M8k0cXirVmaB9kgGz5WxnH3fQipf7Nvh18T6v8A+Q//AImlzPsHs6f86+5/5Gn4r/5FLVv+vV/5Ulh0tv8Arin/AKCKyLnRbi8tpLa48R6rJDKpV0bZhge33a2LIHzUUA7Y1CgnvgYoV73aHUcFTUIyvq318u5r0UUVZzhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFACWn/H9cf7kf/s1XapWn/H9cf7kf/s1XaACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAxlFwdHb7Givc+UwiDHA3EkAn2HX8KzdG8O6jp9nLpc5hkt2cSJKrHuPmU555YbvxNbFiStpEQcHB/masiSQ9GNAEC25EUazqvmKuGI7471h+M7eNvDRXy9waeAEYzkeaM10RJJ+Y80gzhcelAHnN1C08kNvLG5GiX0FoCVOHLS53e/yBfzqwiRfaIvvf8ACR/2riYLnf5O85yP+efl49vxrvjkdaKF/X4A/wCvxPMp7WxFne2SR2uqO9nclrqEyLOpAyPPQ8ZzwM9xwKupBYR2+tahbW5lSCztltjCxXYrRgMVPOByckc4FegUUDv/AF93+R5iqxNFrdnDJB5D/Y3jWx3iLmUK5Qn73bJHeup8WWRtPDaw6dCkNuk8YmUbgqw7vmzt52+uO2a6WigR5wLOwMttPLLp01gmqwYS2V2hgJRt2GbjBO3IHAP1qxYxWph0w64B/ZRW6DGYkR+d5vy7/wDgO7Ge9d/RmgDzXRLuzsYEnlllW1lsbyOB5txLsJmwvPJbBGB1qskUj25F9PZ20psrf7DLdGXzEGwfNEF6tvzkDk9+K9LsrKDT4DBbKyoZHkIZs/MzFj+pNWKP6/P/ADGedSR2NlLqU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sobre [b]Muestra objeto [/b]para que se oculte.[br]Repitiendo el proceso aparecerá de nuevo. [br]Recordemos que no es lo mismo ocultar que borrar, ya que al borrar un objeto se eliminarán también aquellos objetos que dependan de él.[br].[img 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último, dibujamos el segmento CP utilizando la herramienta [b]Segmento [/b][url=http://wiki.geogebra.org/es/Archivo:Tool_Segment_between_Two_Points.gif][img width=32,height=32]data:image/png;base64,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[/img][/url].[br][img 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[br]El punto P se ha creado sobre la circunferencia, por lo que como hemos comprobado podemos moverlo,[br]arrastrándolo con la herramienta puntero,  previamente seleccionada.[br][br]GeoGebra ofrece las opciones necesarias para animar de manera automática un objeto.[br][br]Para animar el punto P, lo seleccionamos previamente, pulsando el botón derecho sobre él. Como hemos[br]indicado, el botón derecho da acceso a un menú con las opciones necesarias para modificar las características de un objeto.[br][br][img 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[/img][br][br]Una vez que aparezca el menú anterior, bastará con pulsar sobre [b]Animación [/b]para que el punto P comience a moverse sobre la circunferencia.[br][br]En la esquina inferior izquierda aparecerá el botón [img width=25,height=27]data:image/png;base64,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[/img]que permitirá detener la animación.[br][br]Para reiniciar la animación, bastará con pulsar el botón [img width=25,height=25]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAoHBwgHBgoICAgLCgoLDhgQDg0NDh0VFhEYIx8lJCIfIiEmKzcvJik0KSEiMEExNDk7Pj4+JS5ESUM8SDc9Pjv/2wBDAQoLCw4NDhwQEBw7KCIoOzs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozv/wAARCAAZABkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD16SSbz3RHjRUQMSyFjyT7j0psMktxEssN1byRuMqyRkgj67qUjN1OPWFf5vXM6baQ6fo2nz2c72Nw9tEWVF3pO2wE5i/iPqVwfegDpy1xHLEHeNldip2oQfuk+p9KsVRhluJo7N7qDyJTIdyBs/wtV6gCu/mR3TuIXkVo1GVK9QW9SPWqmn2MOmxKkFjOWChPMkdGcgDAGd3TjoOK06KAKzNJLND/AKPIgRyxLFf7pHYn1qzRRQB//9k=[/img]que habrá sustituido al botón anterior.[br][br]

A partir del ejemplo anterior, detenemos la animación del punto P para mostrar alguna opción más que ofrece GeoGebra.[br][br]Dibujemos el punto medio entre A y P, al que llamaremos M.[br][br]Para ello, seleccionamos la herramienta [b]Punto medio o centro[/b] [url=http://wiki.geogebra.org/es/Archivo:Tool_Midpoint_or_Center.gif][img width=32,height=32]data:image/png;base64,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[/img][/url]que encontramos en el mismo bloque de la herramienta [b]Punto[/b]. Una vez seleccionada la herramienta, pulsamos sobre A y después, sobre P.[br][br]Aparecerá un nuevo punto, al que el programa por defecto, llamará D ya que sigue el orden alfabético. Lo[br]renombramos para llamarlo M.[br][br]Pulsamos el botón derecho sobre M para que de nuevo, aparezca el menú con las opciones para cambiar sus características.[br][br]Podemos observar que la primera línea que aparece en este menú nos indica el nombre y la definición del objeto. En este caso, aparece Punto M como punto medio de A y P.[br][br]En esta ocasión pulsamos sobre la opción [b]Rastro[/b].[br][br][img 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UUAH9l2P/PrH+VH9l2P/PrH+VFFAB/Zdj/z6x/lR/Zdj/z6x/lRRQAf2XY/8+sf5Uf2XY/8+sf5UUUAH9l2P/PrH+VKNMsgQRax5ByOKKKALVFFFAH/2Q==[/img][br][br]Aparentemente no hace nada, pero al pulsar el botón Play [img width=25,height=25]data:image/png;base64,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[/img] para animar el punto P observaremos que el punto M va dejando el rastro por donde va pasando.[br][br][img width=265,height=220]data:image/png;base64,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[/img][br][br]El resultado será una nueva circunferencia con centro en A y radio AM.[br][br]Es necesario aclarar que el resultado obtenido no es un objeto para el programa ya que es solo un trazo[br]como podemos comprobar si en esta ocasión, cambiamos el radio de la circunferencia inicial, variando o mejor dicho, moviendo el punto B.[br][br][img width=248,height=217]data:image/png;base64,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borrar un rastro, antes de comenzar una animación, es necesario pulsar la combinación de teclas [b]Ctrl[/b] – [b]F[/b].[br][br]Si no deseamos cambiar el radio de la circunferencia inicial, bastará con ocultar el punto B.[br][br]

Las herramientas disponibles para dibujar un polígono las encontramos en el menú:[br][br][img width=151,height=135]data:image/png;base64,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[/img][br][br]La herramienta [b]Polígono  [/b][b][img width=20,height=22]data:image/png;base64,R0lGODlhFAAWAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAAAAAAUABYAhQAAAAAAAAAAEQAABAAAOgAANQAAIAoCKgAANwAAOQEANwAAIgAALgAAWw8FQgAAWgAAUAgDSgAAXwAAcQEAewYCcAAAZgAAkQEAlQIBogAAqgAAyQAA/wAA5wAA+AAA6SgOICUMLScNKlcdCF0fBkwZGEQXE3cqAJk0AJczAJkzAJozAJk1AJsxAJcxAJ03AJgzAJkyAJg0AJU3AJEuAJs1AJszAJEmAJ0zAJo0AJoyAJUzAIctAKoAAP8AAAECAwZzQIBwSCwahYQG4cgEFDacSZNJ6TimzBAAhS2qhqtuk9sNf88AFpZshE3dwm8cAD/Wj2REkYvuA0gVHg9EMlglGRwXRGFzc2o0ABBiAIxMNQBoYZdNlQA5Ol0LIiYAMQA7YhYfETyTQhocGK5CCRIJs7hDQQA7[/img][/b]permite dibujar cualquier polígono a partir de sus vértices; por lo que una vez[br]seleccionada bastará con crear los puntos o pulsar sobre puntos previamente dibujados, para construir el polígono. Es necesario volver a pulsar sobre el vértice inicial para cerrar el polígono.[br][br][br][img width=231,height=111]data:image/png;base64,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[/img][br][br] Cuando el polígono que deseamos dibujar es un polígono regular, disponemos de la correspondiente herramienta que se encuentra en el mismo bloque que  la  herramienta anterior.  Esta  herramienta es  [b]Polígono regular [/b][url=https://wiki.geogebra.org/es/Herramienta_de_Pol%C3%ADgono_regular][img width=24,height=24]data:image/png;base64,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[/img][/url].[br][br]Para dibujar un polígono regular solo necesitamos un segmento que corresponde al lado y el número de lados que tendrá.[br]Por tanto, una vez seleccionada la herramienta, marcamos o creamos los dos puntos correspondientes al lado; aparecerá el cuadro siguiente para que indiquemos el número de lados.[br][br][img width=316,height=117]data:image/png;base64,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[/img][br][br]Por ejemplo, si introducimos el valor 5; al pulsar OK aparecerá un pentágono regular a partir del lado AB previamente dibujado a partir de los dos puntos A y B.[br][br][img width=124,height=124]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAB8AHwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACkzQTxzXzz4n+IniSHxffyWmqvDFaXDR29rHgxOqnAyP493XPvx0oA9h8P6bJaXFsy6b9i8q3Mdy2EHnvkYPyk7sYbk88101V7K4N1ZW9wQoMsauQpyASM8GrFABRRRQAUUUUAFFFFABRRRQAUUUUAGaqX+pWumwCW5k27jtRFG55G9FUck1RvNaZp3stLjW5u14kdj+6g/3yOp/2Rz9KhtNOWCY3VxK11fMMNcSDoP7qDoq+w/HNQ5dEWodZEUkV5rJzqAa2sv4bJG+Zx/01Yf+gjj1JqwdNsGuIrhrC1M0I2xyGFdyD0U4yKtUUkimzNFrc6VK0+lANCx3S2LHCN6mM/wN7dD7da2NP1K21KFngZgyHbJE42vG3ow7GoapXenieZbq3lNtfIMJOgzkf3XH8S+x/DFJXjsDtLc36Kx9P1kyXC2OoxrbX2MqAcxzgdTGe/8AunkfrWuK0TTM2mtxaKKKYgooooARmCqWYgKOST2qKG6t7lS1vPFKoOCY3DY/KotThe50q8t4gDJLA6KCcclSBWDaam+nRtYJazT6icEW5MQ2DH3naMAKv15PYGk2luNJvRHQ3d5bWNs9xdTLFCnVmOP/ANZ9qxJJr7WuD5thp57fdnmH/tNf/HvpTodOeS5W91KUXV2vKADEUPsi+v8AtHn6VfqG3I0SUdtyK3t4bSBILeJYokGFRRgCpaKKACiiigQUUUUAQXdnb31uYLmMSRk59CpHQg9QR6iq0Wo3WjYTUna4sRwt7j54vaUDt/tj8cda0KOvWi3VDvpZl9HWRFdGDKwBDKcgj1FPFc2ttc6O7S6WvmWxJMlgTge5iJ+6f9nofatmw1G21KAy2z52na6MMPG391lPINUpX0ZEoW1WxboqC7lkhsp5Yk8yRI2ZU/vEDIFYDa35Kxga1bylkDMxtWkwT2ynA+h59aok8Vv/ABF4ubxzPCuoahFqZuzElojkKF3YChOm3b/Fj3zXu9pZW9hB5NvGEUncxzlnbuWY8sfc03xFCkNtDqYRfNspVkZ9o3eX91xn02sT+FWfoc1m9WaR+EKKKKACiiigAooooAKKKKACiiigAqjd2HmTfbbWY2t8i4EyjIcD+F1/iH6jsRV6lHUc4oauNOx5RYfGfUZ9egS4021XTZZlhKxljKuW27sng887cfjXsyRpGCERVBOTtGMn1rg/D3gTw9c6m/iRrH97JdPNbx7z5SgHAfZ0ySC34132KtO6uZtWdiK4gS5tpbeQZjlQow9iMViaPK8mlxJKSZoMwS5/vIdp/PGfxrfrARfsviG+tuiXCLdRj3+4/wDJT+NTLdMuGzReooopAFFFFABRRRQAUUUUAFFFFABVDWJnj0144Tie4It4v95zjP4Ak/hV+qSr9s8SQR9Y7GIzP/10fKr+S7j+IpPsUu5s21vHaW0VvEMRxIEUegAwKmpKWtTEKxNeH2e407UOgin8mQ/7Eny/+hbDW3VPVbL+0NLurTODLGVU+jdj+BxUyV0VB2kiGiqum3RvtMtrkjDyRguPRujD8watVKd9S2rOwUUUUCCiiigAooooAKKKKADgck4A6moPDiGSxl1Bgd99KZhnsn3UH/fIB/Gq2tM50/7LESJrx1tkI7bvvH8F3H8K34o0hiSKNQqIoVQOwHShayCWkfUfRRRWhmFJS0UAc7Yr9l1HUrDoqTfaIx/sScn/AMeD1oVU1Zfs2uadedEmDWkh+vzJ+qkf8Cq3WS00Nm72YUUUUyQooooAKKKKACiikZlRGd2CooJYnsBQMpwL9s8TA/8ALPT4c/8AbWT/AAQf+PVv1j+G4m/sw3kikS30jXLA9QG+6PwULWwKcNrkzetuwUUUVZAVBeXcNhaTXVw+yGJC7tgnAHsOtT1j+IYluoLOzdnWK5ukSTYxVsAFuCORyoqoJSkkwOS+KnjEeH/CdncWcKzz30yNbSNkKm3Dhz+Q496peAviSvifTbhtUtjb3lu4VjbQu8bgjg8A7Tx0rp18M6V4h8Mvouq25ubS3uZY4t7nemxyFIbrkDjNafh3wxpPhXTvsOj2oghLb3O4szt6sTya65ywywzpqL9pf4vLtYUW09dioNd05v8AlrKPrbyD/wBlpW1zTF+9dBfrG4/pXQ0V5/K+5rzrsc2fEWjjrqEQ+oI/pR/wkei/9BS2/Fq6QgHsKTYh/hX8qXLLuHNHsc8uvaO3TVLT/v6KlGr6YRkajZ4/67r/AI1t+VH/AM80/wC+RSGCFhgxRn6qKfLIOaPYxf7W03/oI2f/AH/X/GvPPGXxY0fT7+fQooJ7pMrHdXUDrtRTjeF/vHbmvWGsLNvvWkB+sY/wryHx18OdCvPHunuPtNuupuPtEcDqq5HGVG04zjmu7LqNCpVccTdxs9u5E52V4bnea7rk8FtpcukSn7PcwvMpjjRiUVAy8OygDnnvXR2E7XOn21w2N0sSudoIGSAeM1CNJ0/7HbWjWcEkFsoWFJIw4QAYGM+1XQMCueUo8qikIWiiioA//9k=[/img][br][br]Observamos que solo los puntos A y B son independientes y que el resto dependen de la longitud de este lado que ha determinado el polígono regular.[br][br]Otra de las herramientas de este bloque es [b]Polígono rígido[/b]  [img width=20,height=22]data:image/png;base64,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[/img] que permitirá dibujar un polígono a partir de sus vértices de manera que no se podrá deformar. Podemos observar que al construirlo solo serán visibles los dos primeros vértices que permitirán desplazarlo por la vista gráfica sin deformarlo.[br][br][img width=159,height=123]data:image/png;base64,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[/img][br][br]También permite hacer una copia de un polígono previamente construido, para lo que basta con seleccionar la herramienta [b]Polígono rígido [/b]y pulsar sobre el polígono del cual se desea hacer una copia.[br][br][img width=215,height=140]data:image/png;base64,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[/img][br][br]La herramienta que nos queda en este bloque es [b]Polígono vectorial[/b] [img width=20,height=22]data:image/png;base64,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[/img] que creará un polígono de manera que si se desplaza arrastrando el primer vértice creado, se mantendrá como un polígono rígido, mientras que la mover  el resto de vértices el polígono cambiará su forma.[br][br][img width=223,height=130]data:image/png;base64,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[/img][br][br] En el polígono anterior, al arrastrar el punto A el polígono no cambia su forma, será por tanto un polígono rígido, mientras que si se arrastran los otros vértices cambiará su forma.[br][br][img width=221,height=152]data:image/png;base64,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[/img][br][br] Con estas herramientas afrontaremos los ejemplos que proponemos a continuación.