Las distintas herramientas que permitirán realizar transformaciones en el plano, las encontramos en el siguiente bloque:[br][br][img width=190,height=210]data:image/png;base64,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[/img][br][br]Las opciones que ofrece este bloque son:[br][br][b][i]Simetría axial [/i][/b][url=http://wiki.geogebra.org/es/Archivo:Tool_Reflect_Object_in_Line.gif][img width=32,height=32]data:image/png;base64,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[/img][/url][br][br]Devuelve el simétrico de un objeto con respecto a una recta o respecto de un objeto lineal.[br][br][img width=238,height=159]data:image/png;base64,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[/img][br][br][b][i]Simetría central [/i][/b][b][i][url=http://wiki.geogebra.org/es/Archivo:Tool_Reflect_Object_in_Point.gif][img width=32,height=32]data:image/png;base64,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[/img][/url][/i][/b][br][br]Devuelve el simétrico de un objeto con respecto a un punto.[br]Por eemplo, dado el cuadrilátero ABCD que aparece en la figura siguiente:[br][br][img width=220,height=115]data:image/png;base64,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[/img][br]Al hacer el simétrico con respecto al punto D obtendremos:[br][br][img width=375,height=134]data:image/png;base64,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[/img][br][br] [b][i]Inversión[/i][/b] [url=http://wiki.geogebra.org/es/Archivo:Tool_Reflect_Object_in_Circle.gif][img width=32,height=32]data:image/png;base64,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[/img][/url][br][br]Dibuja el punto C’, inverso del punto C con respecto a la circunferencia.[br][br][img width=207,height=169]data:image/png;base64,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[/img][br][br]Los puntos C y C’ verifican la relación [img width=96,height=21]data:image/png;base64,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[/img], siendo r el radio de la circunferencia y A su centro.[br][br][b][i]Rota alrededor de un punto[/i][/b] [url=http://wiki.geogebra.org/es/Archivo:Tool_Rotate_Object_around_Point_by_Angle.gif][img width=32,height=32]data:image/png;base64,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[/img][/url][br][br]Esta herramienta permite obtener la rotación de un objeto con respecto a un punto según un ángulo.[br]Una vez seleccionado el objeto que se desea rotar y el punto con respecto al que se rotará, aparece un cuadro para introducir el valor del ángulo de rotación.[br][br][img 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[/img][br][br][b][i]Traslación[/i][/b] [url=http://wiki.geogebra.org/es/Archivo:Tool_Translate_Object_by_Vector.gif][img width=32,height=32]data:image/png;base64,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[/img][/url][br][br]Realiza la traslación de un objeto con respecto a un vector. [br][br][img 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[/img][br][br][b][i]Homotecia[/i][/b] [url=http://wiki.geogebra.org/es/Archivo:Tool_Dilate_from_Point.gif][img width=32,height=32]data:image/png;base64,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[/img][/url][br][br]Devuelve el objeto que se obtiene al aplicar una homotecia, según el factor correspondiente y a partir de un punto.[br]Una vez seleccionado el objeto y el punto, aparecerá un cuadro de diálogo para introducir el factor de escala de la homotecia.[br][br][img width=291,height=98]data:image/png;base64,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[/img][br][br]Realicemos a continuación algunos ejemplos en los que utilizaremos estas herramientas.[br][br]