Based on the description provided:
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The line segment connects the open point at \((-6, -3)\) and the closed point at \((2, 2)\). This indicates that the domain from this segment would be \([-6, 2)\), since \(-6\) is included (closed) and \(2\) is not included (open).
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The curve connects the open point at \((1, 7)\) and the closed point at \((5, 3)\). This indicates that the domain from this segment would be \((1, 5]\), as \(1\) is not included (open) and \(5\) is included (closed).
Combining these, the overall domain of the function is: \[ [-6, 2) \cup (1, 5] \]
Now, looking at the range:
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For the line segment, the \(y\)-values range from \(-3\) to \(2\) (with \(-3\) included and \(2\) excluded): thus, the range from this part is \([-3, 2)\).
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The curved segment ranges from \(7\) to \(3\) (with \(3\) included and \(7\) excluded), leading to the range being \((3, 7]\).
Combining these, the overall range of the function is: \[ [-3, 2) \cup (3, 7] \]
So, the correct intervals for the domain and range are:
- Domain: \([-6, 2) \cup (1, 5]\)
- Range: \([-3, 2) \cup (3, 7]\)
However, it seems that from the provided options, I don't see an exact match. Given that, you may want to double-check the graphics and points if there's any discrepancy. Depending on graph interpretation, it’s important to ensure that overlaps and exclusions are clear.