Una [b]bisectriz [/b]de un triángulo es una recta/semirrecta (o segmento) que divide cada [b]ángulo [/b]en [b]dos[br]ángulos iguales[/b].[br]Un triángulo tiene [b]3 bisectrices interiores[/b] (una por cada ángulo interior) y tres bisectrices exteriores.[br]Las tres bisectrices interiores de un triángulo se cortan en un punto que se llama [b]incentro[/b]. Dicho punto es el centro de la [i]circunferencia inscrita[/i], que es la circunferencia [i]interior[/i] al triángulo y [i]tangente[/i] a los [i]tres lados[/i].

Para trazar el las bisectrices del triángulo utilizaremos la herramienta "Bisectriz" [br][img]data:image/png;base64,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[/img][br]seleccionando cada vez dos lados del triángulo.[br]

[code][/code]El siguiente vídeo te explica como construir el [b]incentro [/b]de un triángulo.