1. (25 points) In an isolated region of the Canadian Northwest Territories, a population of arctic wolves, z(t), and a population of silver foxes, y(t), compete for survival. (For cach population, one unit represents 100 individuals). The two species have a common. limited food supply, which consists mainly of mice. The interaction of the two species can be modeled by the following system of differential equations,

where the proportionality constants were obtained from observation.

(a) Find the nullclines of the system for 20 and y ≥ 0.

X-nullclims

x=0

y=-x+1

y-nullclines

y=0

y=-x+4

(b) Find all of the equilibrium solutions for z≥ 0 and y≥ 0.

(0,0) (0,34)

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