Final answer:
A removable discontinuity occurs when a function has a hole at a specific x-value that can be filled in to make the function continuous. We need to examine the behavior of the function around that point to determine if the discontinuity is removable.
Step-by-step explanation:
The given question is asking whether the discontinuity at x = -3 in the given graph is removable or not. A removable discontinuity occurs when a function has a hole at a specific x-value that can be filled in to make the function continuous. To determine if the discontinuity at x = -3 is removable, we need to examine the behavior of the function around that point.
If the function approaches a finite value from both sides of x = -3, then the discontinuity is removable. However, if the function approaches different values or approaches infinity from both sides, then the discontinuity is not removable.
To answer the question, we would need to see the given graph or receive more information about the behavior of the function around x = -3.