Answer:
Sedimentation is not a good method.
Explanation:
We need to apply Stoke laws and assume that is valid here.
So,
[tex]V_s= 418(G-1)d^2(\frac{3T+70}{100})[/tex]
Replacing the values,
[tex]V_s= (418)(1.01-1)(10^-3)^3*(\frac{3*20+70}{100})\\V_s=5.434*10^-6mm/s[/tex]
Here then we calculate the time,
[tex]t_{req}=\frac{x}{v}[/tex]
Where x= Distance, v= velocity
[tex]t_{req}=\frac{1foot}{5.434*10^{-6}} = \frac{304.8}{5.434*10^{-6}}\\t_{req}=649.2days[/tex]
To calculate the surface required we need first to calculate the volume through the volume,
So,
[tex]Q=4MGD=4*10^6*0.135 (ft^3/day)[/tex]
Then,
[tex]V_{req} = Q*t\\V_{req}=4*10^6*0.134*649.2\\V_{req}=34.79*10^7ft^3[/tex]
Here we can calculate the surface
[tex]S_{req}= \frac{Volume}{Distance}=\frac{34.79*10^7}{1}\\S_{req}=7987.8 Acres[/tex]
So, the requeriment of Area of tank and settlement time is huge, it's not a practical method.
