Recuerda que en un triángulo:[br][br]- La suma de todos sus ángulos interiores es 180º.[br][br]- Según sus ángulos pueden ser:[br] - Triángulo Rectángulo: Tiene un ángulo recto (90º).[br] - Triángulo Acutángulo o Agudo: Todos sus ángulos son agudos (<90º)[br] - Triángulo Obtusángulo u Obtuso: Tiene un ángulo obtuso (>90º)[br][br]- Según el tamaño de sus lados pueden ser: [br] - Triángulo Isósceles: Tiene dos lados iguales en tamaño y uno distinto.[br] - Triángulo Escaleno: Tiene todos sus lados de distinto tamaño.[br] - Triángulo Equilátero: Tiene todos sus lados iguales.[br][br]

Área de polígonos regulares

[br][b][size=150]La longitud de la circunferencia, es decir, la medida de su contorno se obtiene[br]utilizando la siguiente fórmula.[br][br][img]data:image/png;base64,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[/img][/size][br][/b][br][br]

[b]Calcula el perímetro de un círculo sabiendo que su diámetro es de 2 m.[/b]