e ln(x)
To evaluate the expression e ln(x), we need to understand the properties of logarithms and exponentials
To evaluate the expression e ln(x), we need to understand the properties of logarithms and exponentials.
The natural logarithm, denoted as ln(x), is the inverse of the natural exponential function y = e^x. In other words, ln(x) undoes what the exponential function e^x does.
When we have e ln(x), we can simplify it using the property of logarithms: if ln(x) = y, then e^y = x.
So, e ln(x) simplifies to just x.
In summary, e ln(x) = x.
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