Understanding Non-linear Systems and Critical Points

Understanding Non-linear Systems and Critical Points

Assessment

Interactive Video

•

Mathematics, Science

•

11th Grade - University

•

Hard

Created by

Lucas Foster

FREE Resource

The video tutorial discusses the challenges of analyzing centers in non-linear systems of ordinary differential equations. It explains how the behavior of trajectories near critical points is influenced by the eigenvalues of the Jacobian matrix, which can vary across different points. An example system is analyzed to illustrate these concepts, highlighting the need for further analysis when linearization results in a center. The tutorial concludes by emphasizing the complexity of such systems and the necessity for detailed examination, similar to other mathematical tests that require additional scrutiny.

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10 questions

Show all answers

1.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What determines whether a trajectory in a non-linear system moves towards or away from a critical point?

The determinant of the Jacobian matrix

The trace of the Jacobian matrix

The sign of the real part of the eigenvalues

The magnitude of the eigenvalues

2.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the role of the Jacobian matrix in analyzing non-linear systems?

It determines the system's equilibrium points

It helps in linearizing the system around critical points

It provides the solution to the differential equations

It calculates the system's energy

3.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the given system, what are the eigenvalues at the critical point (0,0)?

1 and -1

3 and -3

0 and 1

0 ± i

4.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the significance of the eigenvalues being zero plus or minus i at the critical point?

The system is asymptotically stable

The system has a center

The system is a stable node

The system is a spiral sink

5.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What type of stability is associated with complex eigenvalues having a positive real part?

Stable node

Spiral sink

Spiral source

Center

6.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What does a positive real part of eigenvalues indicate about the system's stability?

The system is stable

The system is unstable

The system is critically stable

The system is neutrally stable

7.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What happens to the trajectory near the origin when the real part of the eigenvalues is positive?

It oscillates around the origin

It remains at the origin

It spirals towards the origin

It moves away from the origin

8.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the behavior of the system at most points near the origin?

The trajectory moves away from the origin

The trajectory spirals towards the origin

The trajectory oscillates around the origin

The trajectory remains stationary

9.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

Why is further analysis needed when the linearization has a center?

Because the system is always stable

Because simple tests are often inconclusive

Because the eigenvalues are always real

Because the Jacobian matrix is always invertible

10.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is a common feature of mathematical tests like the second derivative test in calculus?

They require no additional analysis

They always provide conclusive results

They can be inconclusive and need further examination

They are only applicable to linear systems

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