Solve the equation, Write the solution set with the exact values given in terms of common or natural logarithms. Also give approximate solutions to 4 decimal places.
\[
6^{x}=52
\]
There is no solution, \{\}.
The exact solution set is $\{[\}$.
\[
x \approx \square
\]
\begin{tabular}{ccc}
\hline $\ln \square$ & $\square \log \square$ & $\square^{\log a} a$ \\
$\frac{\square}{\square}$ & $\sqrt[g]{\square}$ & $\square^{\square}$ \\
$\times$ & 5
\end{tabular}
\(\boxed{\text{The exact solution set is } \{x | x = \frac{\ln(52)}{\ln(6)}\}. \text{The approximate solution is } x \approx 2.2052}\)
Step 1 :The given equation is \(6^{x}=52\).
Step 2 :We can convert this equation into logarithmic form using the formula \(x = \log_b(a)\).
Step 3 :Applying this formula, we get \(x = \frac{\ln(52)}{\ln(6)}\).
Step 4 :Calculating the value of \(x\), we get \(x \approx 2.2052\).
Step 5 :\(\boxed{\text{The exact solution set is } \{x | x = \frac{\ln(52)}{\ln(6)}\}. \text{The approximate solution is } x \approx 2.2052}\)