Consider the components model dp / dt = p(a - benp) solve the equation, discuss
ID: 3422095 • Letter: C
Question
Consider the components model dp / dt = p(a - benp) solve the equation, discuss its equilibrium and stability, and use the model to simulate the growth of some cancer cells. Consider the Latka-volterra predator-Prey model dx / dt = x (a - bz) dz / dt = y (-d + cx). Where x(t) - density of prey population at time t y(t) - density of predator population at t, solve for the solutions, discuss the periodic solutions, and equlibria and their stability. Study the SIR model and apply it to some infections diseases.Explanation / Answer
Consider the components model dp / dt = p(a - benp) solve the equation, discuss