Answer:
T = 693.147 minutes
Explanation:
The tank is being continuously stirred. So let the salt concentration of the tank at some time t be x in units of kg/L.
Therefore, the total salt in the tank at time t = 1000x kg
Brine water flows into the tank at a rate of 6 L/min which has a concentration of 0.1 kg/L
Hence, the amount of salt that is added to the tank per minute = [tex](6\times0.1)kg/min=0.6kg/min[/tex]
Also, there is a continuous outflow from the tank at a rate of 6 L/min.
Hence, amount of salt subtracted from the tank per minute = 6x kg/min
Now, the rate of change of salt concentration in the tank = [tex]\frac{dx}{dt}[/tex]
So, the rate of change of salt in the tank can be given by the following equation,
[tex]1000\frac{dx}{dt} =0.6-6x[/tex]
or, [tex]\int\limits^{0.05}_0 {\frac{1000}{0.6-6x} } \, dx =\int\limits^T_0 {} \, dt[/tex]
or, T = 693.147 min (time taken for the tank to reach a salt concentration
of 0.05 kg/L)
