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

ln(6)=x-4
Answer:

Write the log equation as an exponential equation. You do not need to solve for $\mathrm{x}$ . $\newline$ $\ln (6)=x-4$ $\newline$ Answer:

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Find trigonometric ratios of special angles

Full solution

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

\mathrm{x}

.

\newline

\ln (6)=x-4

\newline

Answer:

Rewriting $\ln(y)$ : The natural logarithm $\ln(y)$ is equivalent to the exponent to which $e$ (Euler's number, approximately $2.71828$ ) must be raised to produce the number $y$ . Therefore, the equation $\ln(6)=x-4$ can be rewritten in exponential form by raising $e$ to the power of both sides of the equation.
Exponential Form: By exponentiating both sides, we get $e^{\ln(6)} = e^{x-4}$ . Since $e$ and $\ln$ are inverse functions, $e^{\ln(6)}$ simplifies to $6$ . Thus, the exponential form of the equation is $6 = e^{x-4}$ .

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