Answer:
A) The volume of solid is 18π cubic unit.
B) The volume of sphere is [tex]\dfrac{4}{3}\pi r^3[/tex]
a = -r , b = r , [tex]f(x)=\sqrt{r^2-x^2}[/tex] and [tex]V=\dfrac{4}{3}\pi r^3[/tex]
Solution A)
The given curve, [tex] y=3+3e^{-5x}[/tex] rotate about x-axis between 2 to 4.
Please find attachment for solid figure or rotation.
Using disk method to find the volume rotation about x-axis
[tex]V=\int_a^b\pi R^2dx[/tex]
where, a = 2, b= 4 , [tex]R=y=3+3e^{-5x}[/tex] and dx is thickness of disk.
[tex]V=\int_2^4\pi (3+3e^{-5x})^2dx[/tex]
[tex]V=9\pi\int_2^4(1+e^{-10x}+2e^{-5x})dx[/tex]
[tex]V=9\pi(x-\dfrac{1}{10}e^{-10x}-\dfrac{2}{5}e^{-5x})|_2^4)[/tex]
[tex]V=9\pi(4-\dfrac{1}{10}e^{-40}-\dfrac{2}{5}e^{-20}-2+\dfrac{1}{10}e^{-20}-\dfrac{2}{5}e^{-10}))[/tex]
[tex]V=9\pi (2-0)[/tex]
[tex]V=18\pi[/tex]
Hence, the volume of solid is 18π cubic unit
Solution B)
The equation of circle of radius r and centered at origin (0,0).
[tex]x^2+y^2=r^2[/tex]
[tex]y=\sqrt{r^2-x^2}[/tex]
The solid form is sphere of radius r.
Using disk method, to find volume of solid
[tex]V=\int_a^b\pi R^2dx[/tex]
where, a = -r, b = r , [tex]R=y=\sqrt{r^2-x^2}[/tex] and dx is thickness of disk.
[tex]V=\int_{-r}^r\pi (r^2-x^2)dx[/tex]
[tex]V=\pi(r^2x-\dfrac{x^3}{3})|_{-r}^r [/tex]
[tex]V=\pi(2r^3-\dfrac{2r^3}{3})[/tex]
[tex]V=\dfrac{4}{3}\pi r^3[/tex]
Hence, the volume of sphere is [tex]\dfrac{4}{3}\pi r^3[/tex]
