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Explicación

LOS NÚMEROS REALES A partir de las necesidades del ser humano surgieron diferentes conjuntos de números.El primer conjunto ideado fue el conjunto de los números naturales o también llamado conjunto de los números enteros positivos, que no es otra cosa que los números que utilizamos para contar. Este conjunto lo escribimos como:? ={1, 2, 3, 4, …}El segundo conjunto llamado conjunto de los números enteros se obtiene de unir los naturales con sus opuestos aditivos y el cero; este conjunto se nota así:?= {…–3, –2, –1, 0, 1, 2, 3, …}El tercer conjunto se denomina números racionales y está formado por todos los números que se pueden expresar como la razón entre dos números enteros. Recuerde que no se puede dividir entre cero. Este conjunto se determina por comprensión así:<img src="data:image/png;base64,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" alt="" width="248" height="65" style="width: 248px; height: 65px;">Por ejemplo:<img src="data:image/png;base64,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" alt="" width="691" height="69" style="width: 691px; height: 69px;"> Existe un cuarto conjunto llamado números irracionales que está formado por aquellos números que no se pueden expresar como el cociente de dos números enteros. Este se nota con la letra I.<img src="data:image/png;base64,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" alt="">Finalmente, el conjunto de los números reales resulta de la unión entre el conjunto de los números racionales y los números irracionales.? = ? ???? ????El siguiente esquema muestra la clasificación del conjunto de los números reales

Ejercicios

ACTIVIDADES DE APRENDIZAJES<table> <tbody><tr> <td></td> </tr> <tr> <td>1. 
Escriba tres características sobre
los números reales.<o:p></o:p>

2. Observe y
analice el diagrama dado, que muestra la relación de continencia entre los conjuntos numéricos. <img src="data:image/png;base64,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" alt=""> 3. Basándose en el diagrama anterior complete las expresiones dadas con los signos ? (contenido) o = (igual) según la relación entre los conjuntos dados sea de contenencia o de igualdad.<o:p></o:p><img src="data:image/png;base64,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" alt=""> 4. Determine si la afirmación es verdadera (V) o
falsa (F). En todos los casos, justifique su respuesta.<o:p></o:p>a) Todos los números racionales son también números enteros. ( )b) Algunos números enteros son irracionales. ( )c) Todos los números racionales son también números reales. ( ) d) El 0 es un número entero, pero no es un número racional. ( )e) Todos los números reales son también números irracionales. ( )5.En cada casilla escriba Sí, si el número dado es un elemento del conjunto indicado en la primera columna, en caso contrario escriba No.<img 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

Evidencia

Evaluación

Bibliografía

Foro

calificable?

Activo