How do you use the method of cylindrical shells to find the volume of the solid obtained by rotating the region bounded by $27y=x^3$ , y=0 , x=6 revolved about the y=8?

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Answer 1 · 2016-11-19T11:31:16

The volume is $=(960pi)/7$

The volume of a small shell

$dV=pi(8^2-(8-y)^2)dx$

As, $y=x^3/27$

$dV=pi(64-(8-x^3/27)^2)dx$

$dV=pi(64-64+16x^3/27-x^6/729)dx$

$V=piint_0^6(16x^3/27-x^6/729)dx$

$=pi[16x^4/4*1/27-x^7/7*1/729]_0^6$

$=pi(4*6^6/27-6^7/(7*729)-0)$

$=pi(5184/27-384/7)$

$V=(960pi)/7$

graph{(y-x^3/27)(y-8)=0 [-19.15, 16.9, -4.32, 13.7]}

How do you use the method of cylindrical shells to find the volume of the solid obtained by rotating the region bounded by 27y=x^327y=x^3, y=0 , x=6 revolved about the y=8?