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Write the log equation as an exponential equation. You do not need to solve for
x.

log_(3x)(3)=3
Answer:

Write the log equation as an exponential equation. You do not need to solve for $\mathrm{x}$ . $\newline$ $\log _{3 x}(3)=3$ $\newline$ Answer:

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Product property of logarithms

Full solution

Q. Write the log equation as an exponential equation. You do not need to solve for

\mathrm{x}

.

\newline

\log _{3 x}(3)=3

\newline

Answer:

Rewrite in Exponential Form: The logarithmic equation $\log_{3x}(3)=3$ can be rewritten in exponential form using the definition of a logarithm. The base of the logarithm becomes the base of the exponent, the right side of the equation becomes the exponent, and the number inside the logarithm becomes the result of the exponentiation. $\newline$ So, the exponential form of the equation is $(3x)^3 = 3$ .

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