use the graph of f to draw the graph of its inverse function. choose the correct graph of the inverse…

use the graph of f to draw the graph of its inverse function. choose the correct graph of the inverse function f⁻¹ below. the graph of f is dashed in each of the choices.

use the graph of f to draw the graph of its inverse function. choose the correct graph of the inverse function f⁻¹ below. the graph of f is dashed in each of the choices.

Answer

Explanation:

Step1: Recall inverse - function graph property

The graph of a function (y = f(x)) and its inverse (y = f^{-1}(x)) are symmetric about the line (y=x).

Step2: Analyze key points

Pick some key points on the graph of (y = f(x)). For example, if ((a,b)) is on the graph of (y = f(x)), then ((b,a)) is on the graph of (y = f^{-1}(x)).

Step3: Check the symmetry

Check each of the given options to see which one is symmetric to the given graph of (f(x)) (dashed - line) about the line (y = x).

Answer:

The correct option (you need to visually inspect the graphs based on the above - mentioned principles to determine which of A, B, C, D is correct). Without seeing the actual visual details of the graphs in a more precise way, we can't directly state which option it is. But the method to find it is as described above.