[i]Para un punto A de una circunferencia y  un punto exterior B, sea P el punto de intersección de la recta tangente a la circunferencia por el punto A  y de la recta perpendicular a la tangente anterior trazada por el punto B.[/i][br][i]Hallar el lugar geométrico del punto P cuando A recorre la circunferencia. [/i][br][i]Determinar el lugar geométrico que resultará cuando B sea un punto situado en la circunferencia, o cuando sea el centro de la circunferencia.[/i][br][br]Una vez dibujados los elementos necesarios: circunferencia, punto A y punto B, trazamos la recta tangente a la circunferencia por el punto A, que debe cumplir la condición de perpendicularidad con el radio trazado por el punto A.[br][br]A continuación, trazamos la recta perpendicular a la tangente anterior por el punto B. Creamos el punto P como punto de intersección de las dos rectas anteriores, para ello será necesario utilizar la herramienta [b]Intersección de dos objetos[/b].[br][br][img width=345,height=208]data:image/png;base64,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[/img][br][br]Para cambiar los nombres a los objetos podemos situarnos sobre él y, al pulsar el botón derecho del ratón aparecerá el siguiente menú de opciones:[br][br][img width=260,height=243]data:image/png;base64,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[/img][br][br]Al seleccionar [b]Renombra [/b]aparecerá un cuadro para incluir el nuevo nombre que se le asigna al objeto.[br][br]Como alternativa a las opciones anteriores, se puede seleccionar la opción [b]Ningún objeto nuevo[/b] o [b]Solo puntos nuevos[/b] que aparece al abrir [b]Etiquetado[/b] en el menú [b]Opciones[/b], para que no asigne nombre a los nuevos objetos que es la opción por defecto.[br][br][img width=432,height=184]data:image/png;base64,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[/img][br][br]Para obtener el lugar geométrico descrito por el punto P cuando A recorre la circunferencia basta con seleccionar la herramienta [b]Lugar geométrico [/b][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAEAAQAXABYAhQAAAAAAABkAABUVHgAAER4eLgAAOwAAPw0AOQAALAAAMwAAJgcAVgAAYgAAkgAA3wAA/wAA4z8AACUlNicnOiEhLicnOyEhMTQ0UTQ0U0IALEVFb15em2xss4QABJmZ/5iY/dkAANQAANsAAP8AAPcAAO8AAPwAAAECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZiQIBwSCwai6SjcslsCpNO6FFqpC6tSStTqnUCSl5lUiQJPwFSk7l7AgSa3fNbvBUGJhgKMT6Ubj4dZkUZIBwDa0MVFhduaIJFb3xndUQGDQeOUY4jDBAPGo9CCBEOoUMKXkEAOw==[/img][b] [/b].[br][br]Pulsando a continuación, sobre el punto P, que describe el lugar, y sobre el punto A que se mueve sobre la circunferencia.[br][br]Aparecerá la curva representada en la figura siguiente, denominada [i]caracol de Pascal[/i].[br][br][img width=244,height=207]data:image/png;base64,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[/img][br][br]Como el lugar geométrico se actualiza de manera automática al cambiar las condiciones, bastará con mover el punto B y acercarlo a la circunferencia o bien llevarlo hasta coincidir con el centro para obtener[br]los correspondientes lugares.[br][br]Cuando B es un punto de la circunferencia, la curva obtenida como lugar geométrico se denomina [i]cardioide[/i].[br][br][img width=242,height=227]data:image/png;base64,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[/img][br]