Question(1 point) The region bounded by , and is revolved about the -axis. Find the volume of the resulting solid. Answer:
Studdy Solution
STEP 1
1. We are given the function .
2. The region is bounded by , , and .
3. The region is revolved about the -axis.
4. We need to find the volume of the resulting solid.
STEP 2
1. Set up the integral for the volume using the method of cylindrical shells.
2. Evaluate the integral to find the volume.
STEP 3
The method of cylindrical shells is used when revolving around the -axis. The formula for the volume is:
For this problem, , , and .
STEP 4
Substitute the given function and limits into the formula:
STEP 5
To evaluate the integral, use substitution. Let , then or .
Change the limits of integration:
- When , .
- When , .
The integral becomes:
STEP 6
Evaluate the integral:
The volume of the resulting solid is:
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