Answer:
The equation In x = e^(-x) tells us that the natural logarithm of x is equal to the inverse of e raised to the power of -x. To solve for x, we can rewrite the equation as x = e^(In e^(-x)).
The natural logarithm function is the inverse of the exponentiation function, so we can rewrite the equation as x = e^(-x).
If we solve this equation for x, we find that x = 1. Therefore, the value of x that satisfies the equation In x = e^(-x) is x = 1.
But I'm not really sure though