Mathematics, 06.03.2020 23:26, ununoctrium5401
Consider a population P = P(t) with constant relative birth and death rates α and β, respectively, and a constant emigration rate m, where α, β, and m are positive constants. Assume that α > β. Then the rate of change of the population at time t is modeled by the differential equation: dP/dt = kP - m where k = α - β(a) Find the solution of this equation that satisfies the initial condition P(0) = P0. (Write an equation involving P, P0, k, m, and t.).
Answers: 3
Other questions on the subject: Mathematics
Mathematics, 20.06.2019 18:04, alvarezmrs1913
For a read-a-thon, jay and odhràn each started reading a book at the same time and continued reading for several hours. jay's book had 278 pages, and he read 55 pages per hour. odhràn's book had 238 pages, and he read 45 pages per hour. after how many hours did they have the same number of pages left, and how many pages were left?
Answers: 2
Mathematics, 21.06.2019 15:20, ayoismeisalex
1-for what value of x is line a parallel to line b 2-for what value of x is line a parallel to line b
Answers: 1
Mathematics, 21.06.2019 17:30, margaret1758
Use the distributive law to multiply. 3(4x + 5y + 6)
Answers: 2
Mathematics, 21.06.2019 18:00, lovemykay2355
If f(x) = 4x – 3 and g(x) = 8x + 2, find each function value a. f[g(3)] b. g[f(5)] c. g{f[g(-4)]}
Answers: 3
Do you know the correct answer?
Consider a population P = P(t) with constant relative birth and death rates α and β, respectively, a...
Questions in other subjects:
Mathematics, 12.10.2020 18:01
Mathematics, 12.10.2020 18:01
Mathematics, 12.10.2020 18:01
