2= e^x/2
find x
You asked:
Solve the equation \[2 = \frac{{e}^{x}}{2}\] for the unknown \(x\).
MathBot Answer:
The real solution is: \[x = \log{\left(4 \right)} \approx 1.3862944\]
The complex solutions are: \[\left\{2 n i \pi + \log{\left(4 \right)}\; \middle|\; n \in \mathbb{Z}\right\}\]
\(e\) is Euler's number, a mathematical constant that is approximately \(2.71828\).
\(i\) is the imaginary unit, defined as \(i^2 = -1\).