Caso 2. Construcción de un triángulo conocidos dos lados y el ángulo comprendido

[color=#000000][i]Construye el triángulo cuyos lados miden 4,6 y 3,4; y el ángulo comprendido es de 50[/i][i]⁰[/i][i].[/i][/color][br][br]Comenzamos el proceso de la misma forma que en el ejemplo anterior, trasladando la medida de uno de los lados a la construcción, utilizando para ello la herramienta [b]Circunferencia (centro-radio)[/b].[br]Una vez dibujada la circunferencia, cualquier radio nos dará el primero de los lados, por lo que situamos un punto B sobre la circunferencia.[br]Hemos trasladado la medida del primer lado que es 4,6 cm.[br][br][img width=325,height=168]data:image/png;base64,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[/img][br][br]A continuación, sobre uno de los extremos llevamos la medida del segundo lado, utilizando de nuevo la[br]herramienta [b]Circunferencia (centro-radio)[/b].[br][br][img width=340,height=169]data:image/png;base64,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[/img][br][br]El tercer vértice estará sobre esta segunda circunferencia, por lo que debemos determinar dicho punto teniendo en cuanta la medida del ángulo comprendido.[br]Utilizando la herramienta [b]Ángulo dada su amplitud[/b], marcamos el ángulo de 50⁰ sobre el segmento AB, de[br]manera que A sea el vértice del ángulo. Por lo que una vez seleccionada la herramienta, marcamos B, A e introducimos la medida de 50⁰. Aparecerá un nuevo punto B’.[br][br][img width=369,height=204]data:image/png;base64,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[/img][br][br]No olvidemos que el vértice está en la circunferencia interior, por lo que para obtenerlo unimos A con B’[br]utilizando un segmento o una semirrecta.[br][img width=349,height=212]data:image/png;base64,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[/img][br][br]El punto de intersección de esta semirrecta con la circunferencia interior será el vértice C del triángulo[br]que cumple las condiciones pedidas.[br]Obtenemos el punto de intersección y dibujamos el triángulo utilizando la herramienta [b]Polígono[/b].[br][img width=436,height=228]data:image/png;base64,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[/img][br][br]
A igual que en ejemplo anterior, las medidas puedes darse a partir de segmentos, así como el ángulo.[br][br][img width=478,height=136]data:image/png;base64,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[/img][br][br]En este caso el proceso es idéntico, sin olvidar hacer siempre referencia a los nombres de los objetos, no[br]a sus valores numéricos.[br][img width=149,height=182]data:image/png;base64,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[/img]

Information: Caso 2. Construcción de un triángulo conocidos dos lados y el ángulo comprendido