Properties of Log Function \(f(x)=\log_e x\)
(i) the image set of the domain of \(f\)
(ii) \(\{x : f(x)=-2\}\)
(iii) whether \(f(xy)=f(x)+f(y)\) holds.
Solution
Given:
$$ f(x)=\log_e x $$
where the domain is:
$$ \mathbb{R}^+=\{x:x>0\} $$
(i) Image Set of the Domain of \(f\)
The logarithmic function \(f(x)=\log_e x\) can take every real value.
Therefore, the image set (range) is:
$$ \mathbb{R} $$
(ii) Find \(\{x : f(x)=-2\}\)
We have:
$$ \log_e x=-2 $$
Converting into exponential form:
$$ x=e^{-2} $$
Hence,
$$ \{x:f(x)=-2\}=\{e^{-2}\} $$
(iii) Verify whether \(f(xy)=f(x)+f(y)\)
We know:
$$ f(xy)=\log_e(xy) $$
Using the logarithmic property:
$$ \log_e(xy)=\log_e x+\log_e y $$
Therefore,
$$ f(xy)=f(x)+f(y) $$
Hence, the given property holds true for all positive real numbers \(x\) and \(y\).