Question

vertical asymptote (lower x - value):
vertical asymptote (higher x - value):
horizontal asymptote:
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Explanation:

Step1: Identify vertical asymptotes

Vertical asymptotes are vertical lines $x = a$ where the function approaches infinity or negative - infinity. From the graph, the left - most vertical asymptote (lower $x$-value) and the right - most vertical asymptote (higher $x$-value) can be read. Assume the lower $x$-value vertical asymptote is at $x = a_1$ and the higher $x$-value vertical asymptote is at $x = a_2$.

Step2: Identify horizontal asymptote

A horizontal asymptote is a horizontal line $y = b$ that the function approaches as $x
ightarrow\pm\infty$. Read the $y$-value of the horizontal line that the graph approaches.

Answer:

(Assuming from the graph)
Vertical Asymptote (lower $x$-value): $x = 2$
Vertical Asymptote (higher $x$-value): $x = 5$
Horizontal Asymptote: $y = 0$

(Note: The actual values should be determined accurately based on the given graph. Here, 2, 5 and 0 are just example values for illustration purposes)