Answer:
12,000
Step-by-step explanation:
The machine fills the containers at a rate of 50+5t milliliters (mL) per second.
Therefore, the rate of change of the number of containers, N is:
[tex]\dfrac{dN}{dt}=50+5t, 0\leq t\leq 60[/tex]
[tex]dN=(50+5t)dt\\$Taking integrals of both sides\\\int dN=\int (50+5t)dt\\N(t)=50t+\frac{5t^2}{2}+C $(C a constant of integration)\\\\When t=0, , No containers are filled, therefore:$ N(t)=0\\0=50(0)+\frac{5(0)^2}{2}+C\\C=0\\$Therefore, N(t)=50t+2.5t^2[/tex]
When t=60 seconds
[tex]N(60)=50(60)+2.5(60)^2\\N(60)=12000$ mL[/tex]
Therefore, 12,000 milliliters of acid solution are put into a container in 60 seconds.
