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A drug is administrated once every four hours. Let D(n) be the amount of the drug in the blood system at the nth interval. The body eliminates a certain fraction p of the drug during each time interval. If the amount administrated is D0, find D(n) and limn→∞ D(n). Then assuming the initial values D(0) = 2 and p =0.25 find the solution.
Proof of Sum/Difference of Two Functions : (f(x) + g(x))′ = f ′(x) + g ′(x) It is easy adequate to prove by using the definition of the derivative. We will start wi
find the unit rate. Round to the nearest hundredth in necessary 325 meters in 28 seconds
#question.onstruct/draw geometric shapes with specific condition.
I need help with my homework, I am to the edge right now with this w=5pq/2
6.3/o.21
Verify Liouville''''''''s formula for y "-y" - y'''''''' + y = 0 in (0, 1) ?
Write the subsequent 2nd order differential equation as a system of first order, linear differential equations. 2 y′′ - 5 y′ + y = 0 y (3) = 6 y′ (3) = -1 We can wri
which shows the rate 12 inches of rain in 6 hours as a unit rate
Calculate the value of the following limits. Solution To remind us what this function such as following the graph. hence, we can see that if we reside to the r
Euler's Method Up to this point practically all differential equations which we've been presented along with could be solved. The problem along with this is which the exceptio
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