Find the volume of the solid of revolution formed by rotating about the x--axis the region bounded by the given curves. f(x)=2ex, y=0, x=-2, x=1.

asked Oct 4, 2021 21.5k views

1 vote

Find the volume of the solid of revolution formed by rotating about the x--axis the region bounded by the given curves.

f(x)=2ex, y=0, x=-2, x=1.

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6 votes

Answer:

$2\pi(e^2-e^(-4))$

Explanation:

We are given:
f(x)=2e^x

So, the integral will be used to calculate the volume.

$V = \pi\int\limits^1_(-2)(2e^x)^2dx=\pi\int\limits^1_(-2)4e^(2x)dx=2\pi e^(2x)|^1_(-2) =2\pi(e^2-e^(-4))$

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