El resultado que corresponde a [tex]$\log_b(1)$[/tex] es igual a:

Seleccione una:
a. [tex]$\frac{1}{b}$[/tex]
b. 1
c. [tex]$b$[/tex]
d. 0

Question

15-07-2024
Mathematics

Answered

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El resultado que corresponde a [tex]$\log_b(1)$[/tex] es igual a:

Seleccione una:
a. [tex]$\frac{1}{b}$[/tex]
b. 1
c. [tex]$b$[/tex]
d. 0

Sagot :

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GinnyAnswer GinnyAnswer · Answer 1 · 2024-07-15T11:14:11-04:00

Para resolver el problema de encontrar el valor de [tex]$\log_b(1)$[/tex], primero debemos recordar la definición del logaritmo. El logaritmo [tex]$\log_b(a)$[/tex] es el exponente al cual debemos elevar la base [tex]$b$[/tex] para obtener el número [tex]$a$[/tex]. Dicho de otra manera, si [tex]$\log_b(a) = x$[/tex], esto significa que [tex]$b^x = a$[/tex].

Entonces, cuando tenemos [tex]$\log_b(1)$[/tex], estamos buscando el exponente [tex]$x$[/tex] tal que [tex]$b^x = 1$[/tex].

Consideremos cualquier número [tex]$b$[/tex]. Para cualquier base [tex]$b$[/tex], la única forma en que [tex]$b$[/tex] elevado a un número nos dé exactamente 1 es cuando el exponente [tex]$x$[/tex] es igual a 0. Esto se debe a que cualquier número, independientemente de su valor, elevado a la potencia de 0, siempre es 1. Matemáticamente, esto se expresa como [tex]$b^0 = 1$[/tex].

Por lo tanto, [tex]$\log_b(1) = 0$[/tex].

Entonces, la respuesta correcta a la pregunta es:

d. [tex]$0$[/tex]

Sagot :

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