Question

43–44. Periodic dosesSuppose you take a dose of m mg of a particular medication once per day. Assume f equals the fraction of the medication that remains in your blood one day later. Just after taking another dose of medication on the second day, the amount of medication in your blood equals the sum of the second dose and the fraction of the first dose remaining in your blood, which is m + mf. Continuing in this fashion, the amount of medication in your blood just after your nth dose isAₙ = m + mf + ⋯ + mfⁿ⁻¹.For the given values of f and m, calculate A₅, A₁₀, A₃₀, and lim (n → ∞) Aₙ. Interpret the meaning of the limit lim (n → ∞) Aₙ.43. f = 0.25, m = 200 mg

Accepted Answer

Recognize that the amount of medication in the blood just after the nth dose, $$A_n$$, is given by the sum of a geometric series:

$$A_n = m + mf + mf^{2} + \cdots + mf^{n-1}.$$ Identify the first term $$a$$ and common ratio $$r of $$the geometric series:

$$a = m, \quad r = f.$$ Use the formula for the sum of the first $$n$$ terms of a geometric series:

$$A_n = m \frac{1 - f^{n}}{1 - f}.$$ Calculate $$A_5$$, $$A_{10}$$, and $$A_{30} by $$substituting $$n = 5, 10, 30$$ respectively, along with the given values $$m = 200$$ and $$f = 0.25$$, into the formula above (do not compute the final numerical values here). Find the limit as $$n$$ approaches infinity:

$$\lim_{n 	o \infty} A_n = \lim_{n 	o \infty} m \frac{1 - f^{n}}{1 - f} = \frac{m}{1 - f}$$

Interpret this limit as the steady-state amount of medication in the blood after many doses, where the amount stabilizes because the medication eliminated each day balances the new dose taken.

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Key Concepts

Geometric Series

Limit of a Geometric Series

Interpretation of the Limit in Context