QuestionSet up, but do not evaluate, an integral for the volume of the solid obtained by rotating the region bounded by the given curves about the specified li about Need Help? Read It
Studdy Solution
STEP 1
1. We are finding the volume of a solid of revolution.
2. The region is bounded by , , and .
3. The axis of rotation is .
STEP 2
1. Understand the geometry of the problem.
2. Identify the method for setting up the integral.
3. Set up the integral expression for the volume.
STEP 3
The region bounded by , , and is a segment of the sine wave from to .
STEP 4
The problem involves rotating the region around the line , which is below the x-axis. We will use the method of cylindrical shells or the washer method.
STEP 5
Since the axis of rotation is horizontal and not on the boundary, we use the washer method. The outer radius is the distance from to , which is . The inner radius is the distance from to , which is .
STEP 6
The volume of the solid is given by the integral:
The integral expression for the volume is:
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