To find all the fixed points and classify them for the system equation x ˙ = y 3 - 4x , y ˙ = y 3 - y - 3x . Show that the line x = y is invariant. Show that | x(t) - y(t) | → 0 as t → ∞ for all other trajectories. Sketch the phase portrait. Concept Introduction: Determine the fixed point of the system. Use linearize system and determine the stability for every fixed point. Represent the system equation in vector field on the phase plane. Show the fixed points in phase portrait.

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Answer 1

Question

Chapter 6.3, Problem 9E

Interpretation Introduction

Interpretation:

To find all the fixed points and classify them for the system equation x˙ = y3- 4x , y˙ = y3- y - 3x . Show that the line x = y is invariant. Show that |x(t) - y(t)|→0 as t →∞ for all other trajectories. Sketch the phase portrait.

Concept Introduction:

Determine the fixed point of the system.

Use linearize system and determine the stability for every fixed point.

Represent the system equation in vector field on the phase plane.

Show the fixed points in phase portrait.

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Answer 2

Question

Chapter 6.3, Problem 9E

Interpretation Introduction

Interpretation:

To find all the fixed points and classify them for the system equation x˙ = y3- 4x , y˙ = y3- y - 3x . Show that the line x = y is invariant. Show that |x(t) - y(t)|→0 as t →∞ for all other trajectories. Sketch the phase portrait.

Concept Introduction:

Determine the fixed point of the system.

Use linearize system and determine the stability for every fixed point.

Represent the system equation in vector field on the phase plane.

Show the fixed points in phase portrait.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 3

Question

Chapter 6.3, Problem 9E

Interpretation Introduction

Interpretation:

To find all the fixed points and classify them for the system equation x˙ = y3- 4x , y˙ = y3- y - 3x . Show that the line x = y is invariant. Show that |x(t) - y(t)|→0 as t →∞ for all other trajectories. Sketch the phase portrait.

Concept Introduction:

Determine the fixed point of the system.

Use linearize system and determine the stability for every fixed point.

Represent the system equation in vector field on the phase plane.

Show the fixed points in phase portrait.

Expert Solution & Answer

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Check out a sample textbook solution

See solution

Answer 4

Question

Chapter 6.3, Problem 9E

Interpretation Introduction

Interpretation:

To find all the fixed points and classify them for the system equation x˙ = y3- 4x , y˙ = y3- y - 3x . Show that the line x = y is invariant. Show that |x(t) - y(t)|→0 as t →∞ for all other trajectories. Sketch the phase portrait.

Concept Introduction:

Determine the fixed point of the system.

Use linearize system and determine the stability for every fixed point.

Represent the system equation in vector field on the phase plane.

Show the fixed points in phase portrait.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 5

Chapter 6.3, Problem 9E

Interpretation Introduction

Interpretation:

To find all the fixed points and classify them for the system equation x˙ = y3- 4x , y˙ = y3- y - 3x . Show that the line x = y is invariant. Show that |x(t) - y(t)|→0 as t →∞ for all other trajectories. Sketch the phase portrait.

Concept Introduction:

Determine the fixed point of the system.

Use linearize system and determine the stability for every fixed point.

Represent the system equation in vector field on the phase plane.

Show the fixed points in phase portrait.

Answer 6

Chapter 6.3, Problem 9E

Interpretation Introduction

Interpretation:

To find all the fixed points and classify them for the system equation x˙ = y3- 4x , y˙ = y3- y - 3x . Show that the line x = y is invariant. Show that |x(t) - y(t)|→0 as t →∞ for all other trajectories. Sketch the phase portrait.

Concept Introduction:

Determine the fixed point of the system.

Use linearize system and determine the stability for every fixed point.

Represent the system equation in vector field on the phase plane.

Show the fixed points in phase portrait.

Answer 7

Chapter 6.3, Problem 9E

Interpretation Introduction

Interpretation:

To find all the fixed points and classify them for the system equation x˙ = y3- 4x , y˙ = y3- y - 3x . Show that the line x = y is invariant. Show that |x(t) - y(t)|→0 as t →∞ for all other trajectories. Sketch the phase portrait.

Concept Introduction:

Determine the fixed point of the system.

Use linearize system and determine the stability for every fixed point.

Represent the system equation in vector field on the phase plane.

Show the fixed points in phase portrait.

Answer 8

Expert Solution & Answer

Answer 9

Expert Solution & Answer

Answer 10

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Answer 11

Ch. 6.1 - Prob. 1E Ch. 6.1 - Prob. 2E Ch. 6.1 - Prob. 3E Ch. 6.1 - Prob. 4E Ch. 6.1 - Prob. 5E Ch. 6.1 - Prob. 6E Ch. 6.1 - Prob. 7E Ch. 6.1 - Prob. 8E Ch. 6.1 - Prob. 9E Ch. 6.1 - Prob. 10E

Solution Summary: The author explains how to find fixed points and classify them for the system equation stackreldotx, y, and saddle points.

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