Respuesta :
Answer:
96.46
Step-by-step explanation:
Volume of the Gallon =140 gallons
At time t=0, V(0)=40 gallons
[tex]\frac{dV}{dt}=Rate \:In - Rate \:Out \\\frac{dV}{dt}=3\frac{gal}{min} - 1\frac{gal}{min} =2\frac{gal}{min}[/tex]
V(t)=2t+k, Where K is a constant.
Since V(0)=40
V(0)=2(0)+k=40
k=40
V(t)=40+2t
The Change in Salt Concentration
[tex]\frac{dC}{dt}=Rate \:In - Rate \:Out \\\frac{dC}{dt}=1\frac{lb}{gallon}*3\frac{gallon}{minute}-1\frac{lb}{gallon}*\frac{C}{40+2t} \frac{gallon}{minute}\\\frac{dC}{dt}=3-\frac{C}{40+2t}[/tex]
Rearranging
[tex]\frac{dC}{dt}+\frac{C}{40+2t}=3[/tex]
Using Integrating Factor: [tex]e^{\int\frac{1}{40+2t} dt} =e^{ln|40+2t|}=40+2t[/tex]
[tex]\frac{dC(40+2t)}{dt}=3(40+2t)[/tex]
[tex]\int d[C(40+2t)]=\int(120+6t)dt\\C(40+2t)=120t+3t^2+k_0\\C(t)=\frac{120t+3t^2}{40+2t}+\frac{k_0}{40+2t}[/tex]
At t=0, C(0)=0.125, k_0=5
[tex]C(t)=\frac{120t+3t^2}{40+2t}+\frac{5}{40+2t}\\C(t)=\frac{120t+3t^2+5}{40+2t}[/tex]
At V(t)=140
V(t)=40+2t=140
t=50
[tex]C(50)=96.46[/tex]
Just the tank overflows, C(t)=96.46
