Question: In Exercise 8 we modeled populations of aphids and ladybugs with a Lotka-Volterra system. Suppose we modify those equations as follows: (a) In the absence
(a) In the absence of ladybugs, what does the model predict about the aphids?
(b) Find the equilibrium solutions.
(c) Find an expression for dL/dA.
(d) Use a computer algebra system to draw a direction field for the differential equation in part (c). Then use the direction field to sketch a phase portrait. What do the phase trajectories have in common?
(e) Suppose that at time t = 0 there are 1000 aphids and 200 ladybugs. Draw the corresponding phase trajectory and use it to describe how both populations change.
(f) Use part (e) to make rough sketches of the aphid and ladybug populations as functions of t. How are the graphs related to each other?
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dA 2A(1 0.0001A) - 0.01AL dt dL -0.5L + 0.0001AL dt
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a If L 0 dAdt 2A 100001A so dAdt 0 A 0 or A 00001 10000 Since dAdt 0 for 0 10000 we expect the aphid ... View full answer
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