Answer:
952380.95 mile-pounds
Step-by-step explanation:
We are given a capsule weighing 5000 pounds, and our task is to lift it 200 miles above the surface of the earth. Assume the earth is a sphere whose radius is 4000 miles, and the gravitational force is given by [tex] f(x) = -\dfrac{k}{x^2} [/tex], where [tex] x [/tex] is the distance from the center of the earth.
We will use the opposite force [tex] f(x) [/tex] to find the work done in lifting the capsule.
To determine the value of [tex] k [/tex], we can use the given information that when [tex] x = 4000 [/tex],
[tex] f(4000) = -\dfrac{k}{4000^2} = 5000 [/tex].
Solving for [tex] k [/tex]:
[tex] -\dfrac{k}{4000^2} = 5000 [/tex]
[tex] k = -8 \times 10^{10} [/tex]
Now, the work done in lifting the capsule from an initial distance of 4000 miles to a final distance of 4200 miles can be calculated using the formula for work:
[tex] W = \big \int_{4000}^{4200} -\dfrac{k}{x^2} \,dx [/tex]
Substitute the value of [tex] k [/tex]:
[tex] W =- 8 \times 10^{10} \int_{4000}^{4200} -\dfrac{1}{x^2} \,dx [/tex]
Now, calculate the definite integral:
[tex] W = 8 \times 10^{10} \left[ \dfrac{-1}{x} \right]_{4000}^{4200} [/tex]
[tex] W = 8 \times 10^{10} \left( \dfrac{-1}{4200} - \dfrac{-1}{4000} \right) [/tex]
[tex] W \approx 952380.9524 \, \text{mile-pounds} [/tex]
[tex] W \approx 952380.95 \, \text{mile-pounds ( in nearest 2 d p.)} [/tex]
Therefore, the work done in lifting the capsule is approximately 952380.95 mile-pounds.
