Ya conocemos las operaciones inversas. Por ejemplo, la suma y la resta son operaciones inversas, al igual que la multiplicación y división. Cada operación hace lo [i]opuesto[/i] de su inversa.[br]La idea es la misma en trigonometría. [i]Funciones trigonométricas inversas[/i] hacen lo opuesto de las funciones trigonométricas "normales". Por ejemplo:[br][img]data:image/png;base64,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[/img][br][br][br]