[i]Dada una circunferencia y un triángulo ABC, siendo A y B puntos de la circunferencia y C el centro, hallar el lugar geométrico del ortocentro cuando el punto B recorre la circunferencia.[/i][br][br][i]Comprobad si el lugar geométrico depende de la posición en la que se encuentre el punto A.[/i][br][br]Para realizar esta construcción, dibujamos en primer lugar la circunferencia y marcamos sobre ella los puntos A y B.[br][br]Utilizando la herramienta [b]Segmento[/b], definimos el triángulo que tiene por vértices los puntos A, B y C, siendo C el centro de la circunferencia.[br][br]A continuación, determinamos el ortocentro al que colocamos la etiqueta O.[br][br][img width=236,height=227]data:image/png;base64,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[/img][center][/center]Utilizando la herramienta [b]Lugar geométrico[/b] obtenemos el lugar descrito por el ortocentro O cuando el punto B recorre la circunferencia.[br]