I really don't understand this calculus 2 problem?

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I really don't understand this calculus 2 problem?

The question is: An equilateral hexagon is revolving around one of its edges. Find the volume of the solid of revolution

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Answer 1 · 2017-04-29T16:29:20

$V = pi l^3$

Explanation:

Considering $l$ as the equilateral hexagon side

$h=l cosphi$
$delta=lsinphi$

we have

$V =2 1/3 pi h^2 delta + pi h^2 l = (2/3cos^2phisin phi+cos^2phi)pi l^3$

but $phi=pi/3$ so $sin phi = 1/2$ and $cos phi = sqrt3/2$ and finally

$V = pi l^3$

Answer 2 · 2017-04-30T11:45:30

enter image source here

Pappus 2nd Theorem: Volume V of a solid of revolution generated by rotating a plane figure about an external axis is equal to the area of the figure times the distance traveled by its geometric centroid, or $V = A d$

$A$ is calculated in the figure as $6 xx 1/2 b h$

$d = 2 pi (s sqrt3/2)$

$implies V = ( 9pi)/2 s^3$

Answer 3 · 2017-05-01T22:49:55

I have solved this way, using integrals, as shown below:
enter image source here

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I really don't understand this calculus 2 problem?

The question is: An equilateral hexagon is revolving around one of its edges. Find the volume of the solid of revolution

3 Answers

Explanation:

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