The photograph
above shows THE HOTT LINDSAY LOHAN. Your job is to find a function y = f(x)
describing the curve on this HOTTY's BOTTY (Do the upper portion). 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 by the hose. 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 hot celebrity. 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. After you are done with
this, try to find the volume of her body, aka the "integral” of the
function revolved around the x – axis to find out how many pixels cubed
Lindsay’s body is!!!!
After you have found a function that you are reasonably happy with that describes the curve formed by her tremendous curves, and have found the volume of the curve revolved around the x - axis discuss why it does not do as good a job as you might have hoped.
TO
CHECK OUT THE SOLUTIN CLICK HERE