Question 1127892
<br>
The wording of the problem, and the presentation of the data for the problem -- at least as you show it -- is confusing.  My interpretation of the problem is this:<br>
Given the function {{{x^3+x-4}}}, find the coordinates of the points on the graph of the inverse function that have y coordinates of 0, 1, and 2.<br>
Think of a point (a,b) on the graph of the function.  The point (b,a) is on the graph of the inverse of the function.<br>
So, when asked to find the coordinates of the point on the graph of the inverse function with y coordinate a, we evaluate the function at x=a to find the corresponding y value, giving us the coordinates (a,b) of a point on the graph of the function.  Then we switch the x and y values to get the point (b,a) on the graph of the inverse function.<br>
Once you understand what you are being asked to do (I THINK!!), it is easy.<br>
Here is the first one: f(0) = -4, so (0,-4) is on the graph of the function; then the point (-4,0) is on the graph of the inverse.  More specifically, it is THE point on the graph of the inverse function that has y coordinate 0.<br>
You can do the other two....