Need help with integration (1 Viewer)

Tabris

Member
Joined
Mar 16, 2004
Messages
806
Gender
Male
HSC
2004
volume bounded by X^3 and X^2 and the x - axis rotated on the x -axis
 

CM_Tutor

Moderator
Moderator
Joined
Mar 11, 2004
Messages
2,642
Gender
Male
HSC
N/A
The curves y = x<sup>2</sup> and y = x<sup>3</sup> meet at two points, (0, 0) and (1, 1). To find the volume formed when an area between two curves is rotated about an axis, you must find the individual areas separately. That is,

V<sub>1</sub> = int (from 0 to 1) pi * y<sup>2</sup> dx, where y = x<sup>2</sup>
= pi * int (from 0 to 1) x<sup>4</sup> dx
= pi * [x<sup>5</sup> / 5] (from 0 to 1)
= (pi / 5) * [(1)<sup>5</sup> - (0)<sup>5</sup>]
= pi / 5 cu units

V<sub>2</sub> = int (from 0 to 1) pi * y<sup>2</sup> dx, where y = x<sup>3</sup>
= pi * int (from 0 to 1) x<sup>6</sup> dx
= pi * [x<sup>7</sup> / 7] (from 0 to 1)
= (pi / 7) * [(1)<sup>7</sup> - (0)<sup>7</sup>]
= pi / 7 cu units

Now, V<sub>TOT</sub> = V<sub>1</sub> - V<sub>2</sub> = (pi / 5) - (pi / 7) = pi * (7 - 5) / (7 * 5)
So, V<sub>TOT</sub> = 2 * pi / 35 cu units
 

Tabris

Member
Joined
Mar 16, 2004
Messages
806
Gender
Male
HSC
2004
a tricky 2 unit question

Volume bounded by Y = x^2 and Y = (x+2)^2 and the x -axis, rotating on the x axis.

This is where i am up to

x^2 = x^2+4x+4

only 1 common point (-1,1)

i am stuck here, anything i missed or any mistakes?
 

CM_Tutor

Moderator
Moderator
Joined
Mar 11, 2004
Messages
2,642
Gender
Male
HSC
N/A
Draw a diagram. The area that you are trying to rotate about the x-axis is bounded by the x-axis (from x = -2, the x-intecept of y = (x + 2)<sup>2</sup> to x = 0, the x-intercept of y = x<sup>2</sup>), the curve y = (x + 2)<sup>2</sup> from x = -2 to the point of intersection at x = -1, and the curve y = x<sup>2</sup> from the point of intersection at x = -1 to x = 0. You have to rotate the two areas around the axis separately. Thus, V<sub>TOT</sub> = V<sub>1</sub> + V<sub>2</sub> where:

V<sub>1</sub> = int (from -2 to -1) pi * y<sup>2</sup> dx where y = (x + 2)<sup>2</sup>

and

V<sub>2</sub> = int (from -1 to 0) pi * y<sup>2</sup> dx where y = x<sup>2</sup>

Note that symmetry will ensure that V<sub>1</sub> = V<sub>2</sub> = pi / 5 cu units, and so V<sub>TOT</sub> = 2 * pi / 5 cu units
 

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

Top