Above is a function showing Prashant's Tennis Racquet.
Find a function y = f(x) describing the curve formed by the upper half of the tennis racquet. As part of describing the function f(x) you will need to specify its domain -- that is, the lowest and highest values of the variable x.
You can click on the photograph above to find the coordinates of the point at which you clicked. You can fine tune the selected point by clicking at the arrows at the four sides of the photograph. Each click on an arrow moves the cursors one pixel in the direction indicated by the arrow.
You must enter three items in the form below to describe the curve formed. The first two items specify the domain of the function f(x) and, thus, the part of the photograph above containing the curve formed by the upper half of the racquet. The third item is an algebraic expression -- like x^3 - x + 12, for example -- that defines the function f(x) that describes the shape of the curve.
After you have entered the three items in the form below, click the "Try it!!" button to see the curve superimposed on the photograph. Next, you will take the integral of f(x) to find the area underneath the curve. Write the answer down and turn it into Mr. Block to see if you're right.
After you have found a function that you are reasonably happy with that describes the curve formed by the upper half of the tennis racquet, discuss why it does not do as good a job as you might have hoped. Also, see how close you were to the actual answer to the integral of f(x).