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

log_((x-7))(6)=2x
Answer:

Write the log equation as an exponential equation. You do not need to solve for $\mathrm{x}$ . $\newline$ $\log _{(x-7)}(6)=2 x$ $\newline$ Answer:

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Convert between exponential and logarithmic form

Full solution

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

\mathrm{x}

.

\newline

\log _{(x-7)}(6)=2 x

\newline

Answer:

Rewrite logarithmic equation: Using the definition of a logarithm, we can rewrite the given logarithmic equation $\log_{(x-7)}(6)=2x$ as an exponential equation. The base is $(x-7)$ , the exponent is $2x$ , and the result is $6$ . Therefore, the exponential form is $(x-7)^{2x} = 6$ .

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