Question 6 Consider the following system i = ax - bay, -cy + dry, where a, b, c and d are strictly positive constants. (2.1) Show that the equilibrium points of the system are (0,0) and (,).

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plz solve question 6(2.1) it within 30-40 mins I'll give you multiple upvote
Question 6
Consider the following system
ax - bay,
-cy + day,
where a, b, c and d are strictly positive constants.
(2.1) Show that the equilibrium points of the system are (0,0) and (,).
(2.2) Given L(x, y)=da - clna + by - alny + K, where K is a constant. Verify that
L=0 along the solutions of the dynamical system.
(2.3) Determine the value for K such that L()-0.
(2.4) Show that L(x, y) is a Lyapunov function for the equilibrium point (,), using the
value of K determined above.
[6]
(2.5) Given that L(x, y) is a Lyapunov function for (2, 2), what can you conclude about
the nonlinear stability of the equilibrium? What can you conclude from the prop-
erties of L(x, y) about the solutions of the system close to this equilibrium?
Transcribed Image Text:Question 6 Consider the following system ax - bay, -cy + day, where a, b, c and d are strictly positive constants. (2.1) Show that the equilibrium points of the system are (0,0) and (,). (2.2) Given L(x, y)=da - clna + by - alny + K, where K is a constant. Verify that L=0 along the solutions of the dynamical system. (2.3) Determine the value for K such that L()-0. (2.4) Show that L(x, y) is a Lyapunov function for the equilibrium point (,), using the value of K determined above. [6] (2.5) Given that L(x, y) is a Lyapunov function for (2, 2), what can you conclude about the nonlinear stability of the equilibrium? What can you conclude from the prop- erties of L(x, y) about the solutions of the system close to this equilibrium?
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