1
answer
0
watching
48
views
13 Nov 2019
#4 Researchers have modeled scarlet fever epidemics in Liverpool, England, during the 19th century using the system of differential equations dy where N is the population size, x is the fraction of the population that is susceptible, y is the fraction of the population that is infected, μ is the death rate, v is the rate of recovery from the disease, β is the transmission coefficient, and Ï is the angular frequency of 0scillations in susceptibility. Consider the case when there is no variation in susceptibility, so that δ = 0. Find the equilibrium point.
#4 Researchers have modeled scarlet fever epidemics in Liverpool, England, during the 19th century using the system of differential equations dy where N is the population size, x is the fraction of the population that is susceptible, y is the fraction of the population that is infected, μ is the death rate, v is the rate of recovery from the disease, β is the transmission coefficient, and Ï is the angular frequency of 0scillations in susceptibility. Consider the case when there is no variation in susceptibility, so that δ = 0. Find the equilibrium point.
Nestor RutherfordLv2
23 Feb 2019