Question

Question 3 (20 points) Consider the following differential equation = y(y2 - 4). (a) Find all critical values. (6) Draw the phase diagram to classify each as stable, semi-stable or unstable.

Answer 1

Solcetion da y² (4²4) finding critical points consider (a for o dy y²cy²4) = 0 y² (4+2) (4-2) = 0 are the y zo, y=2, y=-2 critical points Let fcy) = y² (4²4) YL-2 fcy) > o & for - -2<ylo tey) co f for oly (2 foy lo for 2LY fcyl > o o phase diagram is 4 - 2 of -2 o goes i) Both sides arrow comes towards the -2 oo y=-2 is stable ii) Left sided arrow of & right sided arrow comes towards the o y=0 is semi stable ili) Both sides arrow of are goes away from 2 o y = 2 is unstable away from o Hence 2