Section 6.4 : Volume With Cylinders
1. Use the method of cylinders to determine the volume of the solid obtained by rotating the region bounded by \(x = {\left( {y - 2} \right)^2}\), the \(x\)-axis and the \(y\)-axis about the \(x\)-axis.
Show All Steps Hide All Steps
We need to start the problem somewhere so let’s start “simple”.
Knowing what the bounded region looks like will definitely help for most of these types of problems since we need to know how all the curves relate to each other when we go to set up the area formula and we’ll need limits for the integral which the graph will often help with.
Here is a sketch of the bounded region with the axis of rotation shown.
Note that we only used the lower half of the parabola here because if we also included the upper half there would be nothing to bound the region above it. Therefore, in order for the \(x\)-axis and \(y\)-axis to be bounding curves we have to use the portion below the lower half of the parabola.
Note that this can be a difficult thing to do especially if you aren’t a very visual person. However, having a representative cylinder can be of great help when we go to write down the area formula. Also, getting the representative cylinder can be difficult without a sketch of the solid of revolution. So, do the best you can at getting these sketches.
Here is a sketch of the solid of revolution.
Here are a couple of sketches of a representative cylinder. The image on the left shows a representative cylinder with the front half of the solid cut away and the image on the right shows a representative cylinder with a “wire frame” of the back half of the solid (i.e. the curves representing the edges of the of the back half of the solid).
We now need to find a formula for the surface area of the cylinder. Because we are using cylinders that are centered on the \(x\)-axis we know that the area formula will need to be in terms of \(y\). Therefore, the equation of the curves will need to be in terms of \(y\) (which in this case they already are).
Here is another sketch of a representative cylinder with all of the various quantities we need put into it.
From the sketch we can see the cylinder is centered on the \(x\)-axis and the upper edge of the cylinder is at some \(y\).
The radius of the cylinder is just the distance from the \(x\)-axis to the upper edge of the cylinder (i.e. \(y\)). The width of the cylinder is the distance from the \(y\)-axis to the curve defining the edge of the solid (a distance of \({\left( {y - 2} \right)^2}\)).
So, the radius and width of the cylinder are,
\[{\mbox{Radius}} = y\hspace{0.25in}\hspace{0.25in}{\mbox{Width}} = {\left( {y - 2} \right)^2}\]The area of the cylinder is then,
\[A\left( y \right) = 2\pi \left( {{\mbox{Radius}}} \right)\left( {{\mbox{Width}}} \right) = 2\pi \left( y \right){\left( {y - 2} \right)^2} = 2\pi \left( {4y - 4{y^2} + {y^3}} \right)\] Show Step 4The final step is to then set up the integral for the volume and evaluate it.
From the graph from Step 1 we can see that the “first” cylinder in the solid would occur at \(y = 0\) and the “last” cylinder would occur at \(y = 2\). Our limits are then : \(0 \le y \le 2\).
The volume is then,
\[V = \int_{0}^{2}{{2\pi \left( {4y - 4{y^2} + {y^3}} \right)\,dy}} = 2\left. {\pi \left( {2{y^2} - \frac{4}{3}{y^3} + \frac{1}{4}{y^4}} \right)} \right|_0^2 = \require{bbox} \bbox[2pt,border:1px solid black]{{\frac{8}{3}\pi }}\]