Volume Help (1 Viewer)

Blackmancan · Feb 25, 2012

Find the volume of the solid of revolution formed if the area enclosed between the curves y=x^2 and y=(x-2)^2 is rotated about the x-axis.
The answer is 2pi/5 but I keep getting something different :/
Thanks in advance

zeebobDD · Feb 25, 2012

well you want to split up the integrals, after finding the intersection as 2

integral, 0 to 1 of x^4 dx will give you the first bit of the volume

then integral 1 to 2 of (x-2)^4 dx will give you the other bit,

will be PI [x^5/5] 1 to 0 which is PI/5 +

PI[(x-2)^5/5] 1 to 2, which will give you PI/5, therefore both integrals added will give you 2pi/5

Drongoski · Feb 25, 2012

Blackmancan said:
Find the volume of the solid of revolution formed if the area enclosed between the curves y=x^2 and y=(x-2)^2 is rotated about the x-axis.
The answer is 2pi/5 but I keep getting something different :/
Thanks in advance

The 2 parabolae intersect at x=1

.: Volume V = V1 + V2

$= \pi\int _0 ^1 \ (x^2)^2 dx + \pi \int _1 ^2 ((x-2)^2)^2 dx$

$= \pi [\frac {x^5}{5}]^1 _0 + \pi [\frac {(x-2)^5} {5}]^2 _1 = \frac {2 \pi}{5}$

Very much what zeebob indicated.

Volume Help (1 Viewer)

Blackmancan

New Member

zeebobDD

Member

Drongoski

Well-Known Member

Users Who Are Viewing This Thread (Users: 0, Guests: 1)