Difference between revisions of "Prototype Calculus Question"

Latest revision as of 19:30, 10 March 2015

Find the volume of the solid obtained by rotating the area enclosed by $y=5-x$ and $y=25-x^{2}$
around the x-axis.

Foundations
• Choose either shell or washer method.
• Find the appropriate radii.
• Determine the bounds of integration by finding when both functions have the same y value.
• Using the determined values, set up and solve the integral.

Solution:

Step 1:

Choosing the Approach: Since we are rotating around the x-axis, the washer method would utilize tall rectangles with dx as their width. This seems like a reasonable choice, as these rectangles would be trapped between our two functions as x varies over the enclosed region, allowing us to solve a single integral. Note that the washer method will require an inner and outer radius, as well as bounds of integration, in order to evaluate the integral

V=\pi \int _{x_{1}}^{\,x_{2}}R^{2}-r^{2}\,dx

Step 2:
Finding the Radii: Since our rectangles will be trapped between the two functions, and will be rotated around the x-axis (where y = 0), we find
the inner radius is $r=5-x$ , represented by the blue line, while
the outer radius is $R=25-x^{2}$ , represented by the red line.

Step 3:
Finding the Bounds of Integration: We must set the two functions equal, and solve. If
$5-x=25-x^{2},$
then by moving all terms to the left hand side and factoring,
$x^{2}-x-20=(x+4)(x-5)=0,$
so we have -4 and 5 as solutions. These are our bounds of integration.

Step 4:
Evaluating the Integral: Using the earlier steps, we have
$V=\pi \int _{x_{1}}^{\,x_{2}}R^{2}-r^{2}\,dx$
$=\pi \int _{-4}^{\,5}(25-x^{2})^{2}-(5-x)^{2}\,dx$
$=\pi \int _{-4}^{\,5}625-50x^{2}+x^{4}-(25-10x+x^{2})\,dx$
$=\pi \int _{-4}^{\,5}600-51x^{2}+x^{4}+10x\,dx$
$=\pi \int _{-4}^{\,5}600-51x^{2}+x^{4}+10x\,dx$
$=\pi {\biggr (}600x-51\cdot {\frac {x^{3}}{3}}+{\frac {x^{5}}{5}}+10\cdot {\frac {x^{2}}{2}}{\biggr )}{\biggr \|}_{x=-4}^{5}$
$={\frac {15,309}{5}}\,\pi .$

@@ Line 20: / Line 20: @@
 !Step 1: &nbsp;
 |-
-|'''Choosing the Approach:''' &nbsp; Since we are rotating around the ''x''-axis, the washer method would utilize tall rectangles with ''dx'' as their width.  This seems like a reasonable choice, as these rectangles would be trapped between our two functions as ''x'' varies over the enclosed region, allowing us to solve a single integral.  Note that the washer method will require an inner and outer radius, as well as bounds of integration, in order to solve evaluate the integral
+|'''Choosing the Approach:''' &nbsp; Since we are rotating around the ''x''-axis, the washer method would utilize tall rectangles with ''dx'' as their width.  This seems like a reasonable choice, as these rectangles would be trapped between our two functions as ''x'' varies over the enclosed region, allowing us to solve a single integral.  Note that the washer method will require an inner and outer radius, as well as bounds of integration, in order to evaluate the integral
 |-
 |-
-|<math>V=\pi \int_{x_1}^{\, x_2} R^2-r^2 \,dx</math>
+|&nbsp;&nbsp;<math>V=\pi \int_{x_1}^{\, x_2} R^2-r^2 \,dx</math>
 |}

Difference between revisions of "Prototype Calculus Question"

Latest revision as of 19:30, 10 March 2015

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