The graph of a one-to-one function is shown below. Draw the graph of the inverse function, f^(-1) , and submit it to the Dropbox. Please show your work

surely after all the posts you've made and seen here, you know there are no diagrams possible...

and take some thought before you copy and paste. We can't submit bupkis to your steenkin' Dropbox!

To graph the inverse function, f^(-1), we can follow these steps:

1. Identify the points on the original graph: Look at the given graph of the one-to-one function and locate several points on the curve. Note the x-coordinate and corresponding y-coordinate for each point.

2. Swap the x and y coordinates: To find the points on the graph of the inverse function, interchange the x and y values from the original function.

3. Plot the points: Take the points from the step above and plot them on a new set of axes, with the x-coordinate becoming the y-coordinate and vice versa.

4. Connect the points: Once you have plotted the points, connect them to form the graph of the inverse function.

5. Submit the graph: Once you have completed the steps above and drawn the graph, you can save it as an image file and submit it to the Dropbox as requested.

Please note that without the specific graph to work with, I cannot provide an exact diagram. However, by following these steps, you should be able to draw the graph of the inverse function, f^(-1), on your own.