1/log(x) + (1/log(x))^2 = 0
find x
You asked:
Solve the equation \[\frac{1}{\log\left( x \right)} + {\left( \frac{1}{\log\left( x \right)} \right)}^{2} = 0\] for the unknown \(x\).
MathBot Answer:
The solution is: \[x = e^{-1} \approx 0.36787944\]
\(e\) is Euler's number, a mathematical constant that is approximately \(2.71828\).