Respuesta :
Answer:
The number A(t) of pounds of salt in the tank at time 't' is;
[tex]{A(t)}= -2,100 \times e^{\dfrac{-t}{100} } + 2,100[/tex]
Step-by-step explanation:
In the question, we have;
The volume of pure water initially in the tank = 700 gal
The concentration of brine pumped into the tank = 3 pounds per gallon
The rate at which the brine is pumped into the tank, = 7 gal/min
The rate at which the well mixed solution is pumped out = The same 7 gal/min
The number of pounds of salt in the tank at time 't' is found as follows;
The rate of change in A(t) with time = The rate of salt input - The rate of salt output
[tex]The \ rate \ of \ change \ in \ A(t) \ with \ time = \dfrac{dA}{dt}[/tex]
The rate of salt input = 7 gal/min × 3 lbs/gal = 21 lbs/min
The rate of salt output = (A(t)/700) lb/gal × 7 gal/min = (A(t)/100) lb/min
Therefore, we have;
[tex]\dfrac{dA}{dt} = 21 - \dfrac{A(t)}{100}[/tex]
Therefore;
[tex]\dfrac{dA}{dt} + \dfrac{A(t)}{100}= 21[/tex]
The integrating factor is [tex]e^{\int\limits {\frac{1}{100} } \, dx } = e^{\frac{x}{100} }[/tex]
[tex]e^{\dfrac{t}{100} } \times \dfrac{dA}{dt} + e^{\dfrac{t}{100} } \times\dfrac{A(t)}{100}= e^{\dfrac{t}{100} } \times21[/tex]
[tex]\dfrac{d}{dt} \left[ e^{\dfrac{t}{100} } \times{A(t)}{} \right]= e^{\dfrac{t}{100} } \times21[/tex]
Using an online tool, we get;
[tex]{A(t)}= c_1 \times e^{\dfrac{-t}{100} } + 2,100[/tex]
At time t = 0, A(t) = 0
We get;
[tex]0= c_1 \times e^{\dfrac{-0}{100} } + 2,100[/tex]
c₁ = -2,100
Therefore, the number A(t) of pounds of salt in the tank at time 't' is given as follows;
[tex]{A(t)}= -2,100 \times e^{\dfrac{-t}{100} } + 2,100[/tex]
