0
3
2
,
x
y = x^2 − x
y^ =
2 x
−^ x
2
y
(1,0)
3
4
Figure 10.15Area betweeny= 2 x−x^2 andy=x^2 −x.
However, this will still be accommodated by integrating the difference
of the two functions over the range 0<x< 3 /2, as follows:
∫ 3 / 2
0
[2x−x^2 −(x^2 −x)]dx=
∫ 3 / 2
0
( 3 x− 2 x^2 )dx
=
9
8
units
10.2.6 Volume of a solid of revolution
➤
292 311➤
When the area under a curve between the limitsx=a,bis rotated once about thex-axis
asolid of revolutionis formed. For the purposes of illustration we will assume that the
curve is entirely above thex-axis, so that the area rotated is positive. See Figure 10.16.
x
y
y
y = f(x)
(^0) dx
ab
Figure 10.16Volume of revolution.