[br][color=#980000]T[/color]omemos de ejemplo la siguiente imagen: [br][center][img]data:image/png;base64,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[/img][br][/center][br]Como muchos de nosotros recordaremos: [br][br]Volumen = Base x Altura[br]v= b*h[br][br]En este caso para calcular la base se neceista saber que: [br][br]Base = pi x radio x radio[br]b = πr[sup]2[/sup][br][br]Y para calcular la altura se hace uso de: [br][br]Altura = Cateto Adyacente x el coseno del angulo.[br]h = CA * Cos(0)[br][br]Entonces: [br] [br]Volumen = pi x radio x radio x Cateto Adyacente x el coseno del angulo.[br]v = πr[sup]2 [/sup](CA * Cos(0))[br]v= π(5cm)[sup]2[/sup](14cm Cos(30[sup]o[/sup]))[br]v= 25cm[sup]2[/sup]π (14cm (√3/2))[br]v= 25cm[sup]2[/sup]π (14cm (√3/2))[br]v= [u]175π√3cm[/u][sup][u]3[/u][br][br]Esto es importante porque imita la formula más dificl que seria de de un romboedro para nuestro caso.[br][/sup]