[b][i]Un angulo exterior de un triángulo es igual a la suma de los ángulos interiores no adyacentes a el[/i][/b]
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[/img]
[br]Tenemos que: [br]x+ C=180° Por ser ángulos adyacentes[br] X=180°−C [color=#ff0000](I) [/color][br][br]También, debemos tener en cuenta que por suma de ángulos interiores: [br][br]A+B+C=180°[br] A+B=180°−C [color=#ff0000](II)[/color][br][br]Comparando las ecuaciones [color=#ff0000](I)[/color] y (II) obtenemos: [br] X =A+B[br][br][br][u][color=#0000ff]Ademas, deben recordar que la suma de los angulos exteriores de todo triángulo es igual a 360°[/color][/u]
La figura muestra algunos ángulos identificados en el triángulo 𝐴𝐵𝐶.[br][img]data:image/png;base64,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[/img][br]¿Qué letra minúscula indica un ángulo exterior?
¿Cuál es la medida de un ángulo exterior de un triángulo equilátero?