[br]Creamos un punto A en una construcción nueva.[br][br]Para dibujar una recta que pase por A, necesitamos un nuevo punto B. Podemos crear el nuevo punto o hacerlo al utilizar 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].[br][br]Lo haremos con la herramienta; seleccionamos la herramienta [b]Recta[/b]; pulsando sobre A y sobre cualquier lugar libre de la vista gráfica para que aparezca el segundo punto que determinará una recta. Obtendremos algo similar  a la imagen siguiente:[br][br][img width=304,height=166]data:image/png;base64,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[/img][br][br]Antes de obtener el haz de las rectas que pasan por A, vamos a cambiar el color de la recta que acabamos de obtener.[br][br]Para ello, recordemos que es necesario seleccionar previamente dicha recta.[br][br]Para ello, disponemos de las opciones necesarias que aparecen en la parte superior de la [b]Vista gráfica[/b].[br][br][img width=239,height=31]data:image/png;base64,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[/img][br][br]Al pulsar sobre el cuadrado de color negro, aparecerá la paleta de colores para seleccionar el color deseado[br]para la recta.[br][br][img 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vez seleccionado el color, si queremos que al mover la recta vaya creando el haz de rectas, necesitamos activar su rastro.[br][br]Activamos por tanto el rastro de la recta.[br][br][img 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solamente nos queda mover algún objeto, en este caso será necesario mover de forma manual el punto B.[br][br]El resultado será algo similar a lo que aparece en la imagen siguiente:[br][br][img width=293,height=242]data:image/png;base64,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[/img][br][br]