1. The problem asks to find the domain and range of the function $f(x)$ based on the given graph with points at approximately $(-10, 2)$, $(-4, -5)$, $(-1, -9)$, $(6, -2)$, and $(9, -8)$. 2. The domain of a function is the set of all possible input values ($x$-values) for which the function is defined. Here, the domain consists of the $x$-coordinates of the plotted points. 3. The range of a function is the set of all possible output values ($y$-values) the function can take. Here, the range consists of the $y$-coordinates of the plotted points. 4. From the graph, the domain is the set of $x$-values: $$\{-10, -4, -1, 6, 9\}$$ 5. From the graph, the range is the set of $y$-values: $$\{2, -5, -9, -2, -8\}$$ 6. Write the domain and range as ordered lists enclosed in curly brackets as requested: Domain: $$\{-10, -4, -1, 6, 9\}$$ Range: $$\{2, -5, -9, -2, -8\}$$