Answer:
16,460 gallons
Step-by-step explanation:
This is a differential equation problem, we have a constant flow of contaminant into the lake, but also we know that only a fraction of that quantity of contaminant remains because of the enzymes. For that reason, the differential equation of contaminant's flow into the lake would be:
[tex]\frac{dQ}{dt} =1700exp(0.06t)*exp(-0.32t)\\\frac{dQ}{dt} =1700exp(-0.26t)\\[/tex]
Then, we have to integrate in order to find the equation for Q(t), as the quantity of contaminant in the lake, in function of time.
[tex]\int\limits^0_t {dQ}=\int\limits^0_t {1700exp(-0.26t)dt}\\Q(t)=\frac{1700}{-0.26} exp(-0.26t)+C \\[/tex]
Now, we use the given conditions to replace them in the equation, in order to solve for [tex]C[/tex]
[tex]t_{0} =0\\Q_{0}=10,000\\Q_{0}=-6538exp(-0.26*0)+C\\C=10,000+6538=16538[/tex]
Then, we reorganize the equation and we replace t for 17 hours, in order to determine the quantity of contaminant at that time:
[tex]Q_{t} =-6538exp(-0.26t)+16538\\Q_{17} =-6538exp(-0.26*17)+16538\\Q_{17} =16460 gallons[/tex]
