Answer:
(a) 86.65 J
(b) 149.65 J
Solution:
As per the question:
Diameter of the pool, d = 12 m
⇒ Radius of the pool, r = 6 m
Height of the pool, H = 3 m
Depth of the pool, D = 2.5 m
Density of water, [tex]\rho_{w} = 1000\ kg//m^{3}[/tex]
Acceleration due to gravity, g = [tex]9.8\ m/s^{2}[/tex]
Now,
(a) Work done in pumping all the water:
Average height of the pool, h = [tex]\frac{H + D}{2}[/tex]
h = [tex]\frac{3 + 2.5}{2} = 2.75\ m[/tex]
Volume of water in the pool, V = [tex]\pi r^{2}h = \pi \times 6^{2}\times 2.75 = 311.02\ m^{3}[/tex]
Mass of water, [tex]m_{w} = \frac{\rho_{w}}{V}[/tex]
[tex]m_{w} = \frac{1000}{311.02} = 3.215\ kg[/tex]
Work done is given by the potential energy of the water as:
[tex]W = m_{w}gh = 3.215\times 9.8\times 2.75 = 86.65\ J[/tex]
(b) Work done to pump all the water through an outlet of 2 m:
Now,
Height, h = 2.75 + 2 = 4.75
Work done,[tex]W = m_{w}gh = 3.215\times 9.8\times 4.75 = 149.65\ J[/tex]
