To find the coordinates of the point on the inverse graph that corresponds to the point where \( x = 2 \), we need to understand the relationship between a function and its inverse.
For a function \( f(x) \), if we have a point \( (a, b) \) on the graph of \( f \), then the point \( (b, a) \) will be on the graph of the inverse function \( f^{-1}(x) \).
So if you have the point \( (2, f(2)) \) on the graph of the function \( f \), the corresponding point on the inverse graph \( f^{-1} \) will be \( (f(2), 2) \).
To find the specific coordinates of the point on the inverse graph, we need the value of \( f(2) \).
However, since we don't have the function \( f(x) \) provided, we cannot compute \( f(2) \). Once you have the value of \( f(2) \), you can substitute it into \( (f(2), 2) \) to find the coordinates of the point on the inverse graph.
If you provide the function \( f(x) \), I can help you find \( f(2) \) and thus the corresponding point on the inverse graph.
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