Answer:
0.0198 lbs per gallon
Step-by-step explanation:
amount of salt free water = 500 gallons
salt rate in = 1 gal/min
salt rate out = 1 gal/min
amount o salt in brine = 0.25 lb per gallon
Let the amount of salt in the tank be A(t) at any time t.
[tex]\frac{dA(t)}{dt} =salt rate in - salt rate out[/tex]
salt rate in = 0.25 x 1 = 0.25
salt rate out = [tex]\frac{A(t)\times 1}{500}[/tex]
The differential equation is given by
[tex]\frac{dA(t)}{dt} =1 - \frac{A(t)\times 1}{500}[/tex]
where, A(0) = 0
So, the equation becomes
[tex]\frac{dA(t)}{dt} + \frac{A(t)}{500} = 1[/tex]
Here the integrating factor is [tex]e^{\frac{dt}{500}}=e^{\frac{t}{500}}[/tex]
The solution of the above differential equation is given by
[tex]A(t)\times e^{\frac{t}{500}} = \int e^{\frac{t}{500}}dt[/tex]
[tex]A(t)\times e^{\frac{t}{500}} = 500\times e^{\frac{t}{500}}+C[/tex]
where, C is the integrating constant.
[tex]A(t)=500+Ce^{-\frac{t}{500}}[/tex]
Put, A(0) = 0
C = - 500
[tex]A(t)=500\left ( 1-e^{-\frac{t}{500} \right )[/tex]
As concentration is defined as
Concentration = Quantity / Volume
[tex]C(t)=\frac{A(t)}{500}[/tex]
[tex]C(t)=1-e^{\frac{-t}{500}}[/tex]
Now concentration at t = 10 min
Put, t = 10 min
[tex]C(10)=1-e^{\frac{-10}{500}}[/tex]
C (10) = 0.0198 lbs per gallon
Thus, teh concentration after 10 min is 0.0198 lbs per gallon.
