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6) Si [tex]\( x \in [-5 ; 6] \)[/tex], ¿a qué intervalo pertenece [tex]\(\frac{5x + 8}{10}\)[/tex]?

Sagot :

GinnyAnswer
Para resolver esta pregunta, partimos del intervalo original para [tex]\(x\)[/tex], que es [tex]\(x \in [-5, 6]\)[/tex].

Queremos encontrar a qué intervalo pertenece la expresión [tex]\(\frac{5x + 8}{10}\)[/tex] cuando [tex]\(x\)[/tex] está en el intervalo dado.

Paso 1: Sustituir el valor mínimo de [tex]\(x\)[/tex] en la expresión.

El valor mínimo es [tex]\(x = -5\)[/tex]:
[tex]\[ \frac{5(-5) + 8}{10} = \frac{-25 + 8}{10} = \frac{-17}{10} = -1.7 \][/tex]

Paso 2: Sustituir el valor máximo de [tex]\(x\)[/tex] en la expresión.

El valor máximo es [tex]\(x = 6\)[/tex]:
[tex]\[ \frac{5(6) + 8}{10} = \frac{30 + 8}{10} = \frac{38}{10} = 3.8 \][/tex]

Paso 3: Determinar el intervalo resultante

Después de evaluar ambos extremos del intervalo original, encontramos que:
Para [tex]\(x \in [-5, 6]\)[/tex], la expresión [tex]\(\frac{5x + 8}{10}\)[/tex] se transforma en el intervalo correspondiente:
[tex]\[ \left[ \frac{5(-5) + 8}{10}, \frac{5(6) + 8}{10} \right] = [-1.7, 3.8] \][/tex]

En conclusión, cuando [tex]\(x\)[/tex] varía en el intervalo [tex]\([-5, 6]\)[/tex], [tex]\(\frac{5x + 8}{10}\)[/tex] toma valores en el intervalo [tex]\([-1.7, 3.8]\)[/tex].
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