Answer
Domain: $\mathbb{R}$.
Range: $(-\infty,0)$
Graph:
Work Step by Step
The graph of this function is obtained from $f_{1}(x)=e^{x}$,
by reflecting it about the x-axis (change the sign of the y-coordinates)
AND
by reflecting it about the y-axis (change the sign of the x-coordinates)
Graph, with a dashed line, the graph of $f_{1}(x)=e^{x}$,
as instructed in the solution of exercise 47$:$
...Graphing $f_{1}(x)=e^{x}$ ,
... The base is $e\approx 2.718\gt 1$, so the graph rises on the whole domain.
... Asymptote is the x-axis.
... To the far left, the graph nears but does not cross the asymptote.
... The graph passes through the points
... $(-1,\displaystyle \frac{1}{e}),(0,1),(1,e),(2,e^{2})$, and so on.
... Plot these points and join with a smooth curve.
Then, for each of the points used for graphing $f_{1}$
reflect them about the x-axis, and about the y-axis (change signs of both x and y)
plot the new points,
and join with a smooth curve (red on the image).
The asymptote remains the x-axis.
Domain: $\mathbb{R}$.
Range: $(-\infty,0)$
