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anonymous
 5 years ago
dC/dt=kC+D(t) is the rate of change in the concentration of a drub w respect to time in a user's blood.D(t) is the dosage at time t, k is the rate that the drug leaves the blood stream. Solve this linear equation to show that if C(8)=0 then C(t)=e^(kt).[integrals from 0 to t]e^(ky)D(y)dy.(Hint:integrate both sides of the equation after multiplying by I(x) on both sides from 0 to t, and change the variable of the integration to y)
anonymous
 5 years ago
dC/dt=kC+D(t) is the rate of change in the concentration of a drub w respect to time in a user's blood.D(t) is the dosage at time t, k is the rate that the drug leaves the blood stream. Solve this linear equation to show that if C(8)=0 then C(t)=e^(kt).[integrals from 0 to t]e^(ky)D(y)dy.(Hint:integrate both sides of the equation after multiplying by I(x) on both sides from 0 to t, and change the variable of the integration to y)

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Owlfred
 5 years ago
Best ResponseYou've already chosen the best response.0Hoot! You just asked your first question! Hang tight while I find people to answer it for you. You can thank people who give you good answers by clicking the 'Good Answer' button on the right!

anonymous
 5 years ago
Best ResponseYou've already chosen the best response.0Sorry, it's actually C(0)= 0 :D Tks in advance :D

anonymous
 5 years ago
Best ResponseYou've already chosen the best response.0define D(t) unless u can't solve...

anonymous
 5 years ago
Best ResponseYou've already chosen the best response.0The problem is I don't know what the hypothesis C(0)=0 is for.
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