If we modify the LotkaVolterra equations by including a self-limiting term x2 in the
Chapter 9, Problem 15(choose chapter or problem)
If we modify the LotkaVolterra equations by including a self-limiting term x2 in the prey equation, and then assume constant-effort harvesting, we obtain the equations x = x(a x y E1), y = y(c + x E2). In the absence of harvesting the equilibrium solution of interest is x = c/ , y = (a/) (c)/(). (a) How does the equilibrium solution change if the prey is harvested, but not the predator (E1 > 0, E2 = 0)? (b) How does the equilibrium solution change if the predator is harvested, but not the prey (E1 = 0, E2 > 0)? (c) How does the equilibrium solution change if both are harvested (E1 > 0, E2 > 0)?
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