Calculus: Early Transcendentals (2nd Edition)

2nd Edition

ISBN: 9780321947345

Author: William L. Briggs, Lyle Cochran, Bernard Gillett

Publisher: PEARSON

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Textbook Question

Chapter D1.3, Problem 34E

Logistic equation for an epidemic When an infected person is introduced into a closed and otherwise healthy community, the number of people who contract the disease (in the absence of any intervention) may be modeled by the logistic equation

d P d t = k p ( 1 − P A ) , P ( 0 ) = P 0 ,

where k is a positive infection rate. A is the number of people in the community, and P₀ is the number of infected people at t = 0. The model also assumes no recovery.

a. Find the solution of the initial value problem, for t ≥ 0, in terms of k, A, and P₀.
b. Graph the solution in the case that k = 0.025, A = 300, and P₀ = 1.
c. For a fixed value of k and A, describe the long-term behavior of the solutions, for any P₀ with 0 < P₀ < A.

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Chapter D1.3, Problem 33E

Chapter D1.3, Problem 35E

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Chapter D1 Solutions

Calculus: Early Transcendentals (2nd Edition)

Ch. D1.1 - Prob. 1E Ch. D1.1 - Prob. 2E Ch. D1.1 - Prob. 3E Ch. D1.1 - If the general solution of a differential equation...Ch. D1.1 - Does the function y(t) = 2t satisfy the...Ch. D1.1 - Does the function y(t) = 6e3t satisfy the initial...Ch. D1.1 - Verifying general solutions Verify that the given...Ch. D1.1 - Verifying general solutions Verify that the given...Ch. D1.1 - Verifying general solutions Verify that the given...Ch. D1.1 - Verifying general solutions Verify that the given...

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