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Recordemos En los cursos anteriores se han estudiado los conjuntos numéricos. Así, se definieron los conjuntos ? de los números naturales; ?0, de los números naturales y el cero; ?, de los números enteros, y ?, de los números racionales, de la siguiente <img src="data:image/png;base64,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" alt="">además, los números del conjunto ? se pueden representar, en la forma de decimal, conformando una clasificación importante: <img src="data:image/png;base64,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" alt=""> Dentro de esta clasificación, llaman particularmente la atención los decimales infinitos no periódicos, pues estos números no tiene la representación de la forma a/b, representación racional; por esta razón estos decimales forman el conjunto de los números irracionales, notado con la letra ????. Algunos números irracionales son:<img src="data:image/png;base64,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" alt="">Los números reales se pueden representar utilizando puntos sobre la recta real, de modo que, a cada número real, ????, le corresponde exactamente un punto de la recta, y a cada punto ????, en la recta, le corresponde u número real ????.A esto se le llama correspondencia uno a uno o correspondencia biunívoca.En la siguiente recta real se pueden observar algunos números reales.<img src="data:image/png;base64,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