Respuesta :
Answer:
detention time = 40.72 minutes
horizontal velocity v = 0.295 inch/s
mean velocity gradient, G = 54.38 [tex]s^{-1}[/tex]
Explanation:
given data
long = 60 ft
wide = 45 ft
deep = 14 ft
flow of water to treat = 10 mgd = 15.472 ft³/s [1 MGD = 1.5472 ft³/s ]
inner velocities = 1.0 fps
outer velocities = 1.4 fps
power required to rotates the paddles = 930 ft-lb/s
solution
we find detention time that is
time = [tex]\frac{V}{Q}[/tex]
here Q = flow of water and V is volume of water
so
volume of flocculation basin is = 60 × 45 × 14 = 37800 ft³
so
detention time = [tex]\frac{37800}{15.472}[/tex]
detention time = 40.72 minutes
and
horizontal flow through velocity is
cross-section area of tank = 45 × 14 = 630 ft²
and we know that Av = Q
so horizontal velocity v = [tex]\frac{Q}{A}[/tex]
horizontal velocity v = [tex]\frac{15.472}{630}[/tex]
horizontal velocity v = 0.02456 ft/s
horizontal velocity v = 0.295 inch/s
and
now we find mean velocity gradient G at temperature of 50'F
so formula is G = [tex]\sqrt{\frac{P}{\mu V} }[/tex]
here P is power input and μ is viscosity and V is volume of flocculation basin
so Volume of flocculation basin is 37800 ft³
and μ for 500F = 8.3197 × [tex]10^{-6}[/tex] lb-s/ft²
we take from table
so we get
G = [tex]\sqrt{\frac{930}{8.3197*10^{-6}*37800} }[/tex]
mean velocity gradient, G = 54.38 [tex]s^{-1}[/tex]
