How do you determine the surface area of a solid revolved about the x-axis?

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How do you determine the surface area of a solid revolved about the x-axis?

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Answer 1 · 2015-03-23T17:35:59

The answer is: $A=2piint_a^bf(x)sqrt(1+[f'(x)]^2)dx$ .

If we cut the solid with two parallel planes ( $x=c$ and $x=d$ ), and perpendicular to the x-axis, we obtain a cylinder, whose radius is $f(x)$ , and his height is the lenght of the curve from $x=c$ and $x=d$ .

The lenght of the curve from $c$ and $d$ is:

$int_c^dsqrt(1+[f'(x)]^2)dx$ .

Since the lateral area of a cylinder is: $A=2pirh$ , than

$A=2piint_a^bf(x)sqrt(1+[f'(x)]^2)dx$ .

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How do you determine the surface area of a solid revolved about the x-axis?

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