Answer:
the mathematical model is : [tex]-\frac{1}{A}= kt - \frac{1}{50}[/tex]
Step-by-step explanation:
Given that:
Let A(t) to be the amount of oil in the barrel at time t.
However; Suppose that the amount of oil is decreasing at a rate proportional to the product of the time elapsed and the amount of oil present in the barrel.
Then,
[tex]\frac{dA}{dt} \ \alpha \ A^2[/tex]
[tex]\frac{dA}{dt}= KA^2[/tex]
Initially the 100 -gallon barrel is half-full of oil
So, A(0) = 100/2 = 50
[tex]\frac{dA}{dt}= KA^2 \ \ \ \ \ \ :A(0)=50[/tex]
The variable is now being separated as:
[tex]\frac{dA}{A^2}=kdl[/tex]
Taking integral of both sides; we have:
[tex]\int\limits\frac{dA}{A^2}=\int\limits \ kdt[/tex]
[tex]-\frac{1}{A}= kt +C[/tex]
However; since A(0) = 50; Then
t = 0 ; A =50 in the above equation
[tex]-\frac{1}{50}= 0 +C[/tex]
[tex]C = - \frac{1}{50}[/tex]
Thus; the mathematical model is : [tex]-\frac{1}{A}= kt - \frac{1}{50}[/tex]
