5ln(x)-14.82x=0
You asked:
Solve the equation \(5 \ln\left( x \right) - 14.82 x = 0\) for the variable \(x\).
MathBot Answer:
The solution is: \[x = - \frac{250 W\left(- \frac{741}{250}\right)}{741} \approx -0.15457651 -0.61326223 i\]
\(W\) is the Lambert \(W\) function, defined as the multivalued inverse function of \(f(w) = we^w\) for any complex number \(w\).