Disc method and Shell(cylinder) method of integration are the two different methods of finding volume of solid of a revolution, using rectangular coordination system the functions are defined in terms of x in the below problem.
Topic : Disc or Cylinder Method of Finding Volume of the Sphere.
Problem : Use the disc or shell method to find the volume of the solid generated by revolving the regions bounded by the graphs of the equations about the x axis. y=x3 y=0, x=2
Solution :
y = x3 => 3√y = x
or (y)1/3 = x
or x = y1/3
Volume of a Solid by rotating about x-axis is given by:
V = 2πa∫bp(y)h(y) dy
here p(y)=y1/3, h(y)=y
when x = 2 and y = 33 = 8
So a = 0 and b = 8
Plugging in all the values in the formula, we get
V = 2π0∫8(y)1/3.y dy
= 2π0∫8(y)4/3 dy (as 1/3 + 1/1 = (1+3)/3 = 4/3)
= 2π[y7/3/(7/3)0]8 (as 4/3 + 1/1 = (4+3)/3 = 7/3)
= 2π[(8)7/3/(7/3)- (0)7/3/(7/3)]
= 2π[((2)3)7/3/(7/3)]
= 2π(27/(7/3))
= 2π(128/(7/3))
= 2 * 3 * 128 * π / 7
= 768π /7
So this how the volume of Solid of revolution is determined when the equations about the x axis.
For more help write to our calculus help.
No comments:
Post a Comment