APM1514
Assignment 7
Due 15 August 2025
, APM1514 Assignment 7 — Due: Friday, 15 August 2025
APM1514 Assignment 7
Due Date: Friday, 15 August 2025
Question 1
We are given the system:
dx dy
= x + 9, = − xy
dt dt
Equilibrium Points
Equilibria occur when:
x+9 = 0 and − xy = 0
From x + 9 = 0 we get x = −9. From − xy = 0 we have x = 0 or y = 0. Combining,
the only common solution is:
E = (−9, 0)
Stability Analysis
Let f ( x, y) = x + 9, g( x, y) = − xy. The Jacobian is:
" #
1 0
J ( x, y) =
−y − x
At (−9, 0): " #
1 0
J (−9, 0) =
0 9
Eigenvalues: λ1 = 1, λ2 = 9 (both positive) =⇒ unstable node.
Isoclines
• dx/dt = 0 =⇒ x = −9 (vertical line)
• dy/dt = 0 =⇒ x = 0 or y = 0 (y-axis and x-axis)
1
, APM1514 Assignment 7 — Due: Friday, 15 August 2025
Direction of Motion
Vertical: dy/dt = − xy
• x > 0, y > 0: down
• x > 0, y < 0: up
• x < 0, y > 0: up
• x < 0, y < 0: down
Horizontal: dx/dt = x + 9
• x > −9: right
• x < −9: left
Phase Diagram
x = −9 y 0
x=
yx = 0
E(−9, 0)
Outcome from Various Initial Points
- All trajectories move away from (−9, 0) since it is an unstable node. - In the right
half-plane (x > −9), motion is to the right; in the left half-plane (x < −9), motion is to
the left. - Above the x-axis: - Left of x = 0: y increases. - Right of x = 0: y decreases. -
Below the x-axis: - Left of x = 0: y decreases. - Right of x = 0: y increases.
2
Assignment 7
Due 15 August 2025
, APM1514 Assignment 7 — Due: Friday, 15 August 2025
APM1514 Assignment 7
Due Date: Friday, 15 August 2025
Question 1
We are given the system:
dx dy
= x + 9, = − xy
dt dt
Equilibrium Points
Equilibria occur when:
x+9 = 0 and − xy = 0
From x + 9 = 0 we get x = −9. From − xy = 0 we have x = 0 or y = 0. Combining,
the only common solution is:
E = (−9, 0)
Stability Analysis
Let f ( x, y) = x + 9, g( x, y) = − xy. The Jacobian is:
" #
1 0
J ( x, y) =
−y − x
At (−9, 0): " #
1 0
J (−9, 0) =
0 9
Eigenvalues: λ1 = 1, λ2 = 9 (both positive) =⇒ unstable node.
Isoclines
• dx/dt = 0 =⇒ x = −9 (vertical line)
• dy/dt = 0 =⇒ x = 0 or y = 0 (y-axis and x-axis)
1
, APM1514 Assignment 7 — Due: Friday, 15 August 2025
Direction of Motion
Vertical: dy/dt = − xy
• x > 0, y > 0: down
• x > 0, y < 0: up
• x < 0, y > 0: up
• x < 0, y < 0: down
Horizontal: dx/dt = x + 9
• x > −9: right
• x < −9: left
Phase Diagram
x = −9 y 0
x=
yx = 0
E(−9, 0)
Outcome from Various Initial Points
- All trajectories move away from (−9, 0) since it is an unstable node. - In the right
half-plane (x > −9), motion is to the right; in the left half-plane (x < −9), motion is to
the left. - Above the x-axis: - Left of x = 0: y increases. - Right of x = 0: y decreases. -
Below the x-axis: - Left of x = 0: y decreases. - Right of x = 0: y increases.
2
