Answer:
The work-done required to pull the bucket to the top of the well = 2340 ft-lb
Step-by-step explanation:
From the information given:
The water is pulled at a rate of 2.5 ft/s
Also, water leaks out of a hole in the bucket at a rate of 0.25 lb/s.
Thus, the rate of water leaking out of the bucket is:
[tex]\dfrac{0.25 \ lb/s}{2.5 \ ft/s}[/tex]
= 0.1 lb/ft
The work done needed to pull the bucket to the top of the well can be expressed by using the integral:
[tex]W = \int ^b_a F(x) \ dx[/tex]
where;
F(x) is read as the function of x = total weight of the bucket and water
i.e
F(x) = 4 + ( 38 - 0.1x)
F(x) = 42 - 0.1x
and a which is inital height = 0 and b which is th final height = 60
Thus: we can compute the workdone as follows:
[tex]W = \int^b_a F(x) \ dx[/tex]
[tex]W = \int^{60}_0 (42-0.1x) \ dx[/tex]
[tex]W =\int ^{60}_{0} \begin {pmatrix} \dfrac{42 x}{1}- \dfrac{0.1x^2}{2} \end {pmatrix} \ dx[/tex]
[tex]W =\ \begin {pmatrix} 42x- 0.05x^2\end {pmatrix} |^{60}_{0}[/tex]
[tex]W =\ \begin {pmatrix} 42(60)- 0.05(60)^2\end {pmatrix}-0[/tex]
W = 2520 - 180
W = 2340 ft-lb
