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

log(2)=4x
Answer:

Write the log equation as an exponential equation. You do not need to solve for $\mathrm{x}$ . $\newline$ $\log (2)=4 x$ $\newline$ 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 (2)=4 x

\newline

Answer:

Rewrite in Exponential Form: The logarithmic equation $\log(2)=4x$ can be rewritten in exponential form using the definition of a logarithm. The base of the common logarithm is $10$ , so the equation $\log(2)=4x$ means that $10$ raised to the power of $4x$ is equal to $2$ .
Exponential Form of Equation: Rewrite the equation in exponential form: $10^{4x} = 2$ . This is the exponential form of the given logarithmic equation.

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