Answer:
number of houses = 3751.243
Explanation:
given data
tower high H = 90 ft
pipe length L = 3 mile
pipe dia d = 6 in
solution
we consider here loss is neglected by dia 6 in pipe
so we apply here bernaulis equation from top to bottom height 90 ft
[tex]\frac{P1}{\rho g} + \frac{V1^2}{2 g} + Z1 = \frac{P2}{\rho g} + \frac{V2^2}{2 g} + Z2[/tex] ..........................1
here P1 is = o gauge pressure
and P2 = 30 Psi = 206.843 × [tex]10^{3}[/tex] Pa
and Z1 = 27.432 m
and Z2 = 0 and V1 = 0
so from equation 1
0+0+27.432 = [tex]\frac{206.843*10^3}{1000*9.81}[/tex] × [tex]\frac{V2^2}{2*9.81}[/tex]
solve we get
V = 11.16 m/s
V = 36.6 ft/s
and
flow will be here
flow Q = AV ............2
Q = [tex]\frac{\pi}{4} (0.15)^2[/tex] × 11.16
Q = 0.19723 m³/s
Q = 187562.157 gal/hr
we have given house use maximum = 50 gal/hr
so total home served = [tex]\frac{total flow}{need 1 home}[/tex]
number of houses = [tex]\frac{187562.157}{50}[/tex]
so number of houses = 3751.243
