ANSWER
x = 1.2226
EXPLANATION
To solve this equation we have to apply the property of the logarithm of the base,
[tex]\log _bb=1[/tex]
Thus, we can apply the natural logarithm - whose base is e, to both sides of the equation,
[tex]\ln e^{4x}=\ln 133[/tex]
Now we apply the property of the logarithm of a power,
[tex]\log a^b=b\log a[/tex]
In our equation,
[tex]\begin{gathered} 4x\ln e^{}=\ln 133 \\ 4x^{}=\ln 133 \end{gathered}[/tex]
Then divide both sides by 4 and solve,
[tex]\begin{gathered} \frac{4x^{}}{4}=\frac{\ln 133}{4} \\ x\approx1.2226 \end{gathered}[/tex]
The solution to this equation is x = 1.2226, rounded to four decimal places.
