Analyzing Critical Points in Differential Equations

Analyzing Critical Points in Differential Equations

Assessment

Interactive Video

•

Mathematics, Science

•

10th - 12th Grade

•

Hard

Created by

Lucas Foster

FREE Resource

The video tutorial explains how to find and classify critical points in a nonlinear system of differential equations. It covers the process of identifying critical points where derivatives are zero, verifying them using vector fields and phase portraits, and determining the Jacobian matrix. The tutorial further explains how to find eigenvalues to classify critical points as saddle points or sources, discussing their stability. The use of an online tool for visualization is also demonstrated.

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10 questions

Show all answers

1.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What are the critical points for the given nonlinear system of differential equations?

(0, 0) and (1, 0)

(0, 0) and (0, 1)

(0, 1) and (1, 1)

(1, 0) and (1, 1)

2.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What tool is used to verify the critical points in the video?

Spreadsheet software

Programming language

Online vector field tool

Graphing calculator

3.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the purpose of the Jacobian matrix in analyzing critical points?

To calculate the determinant of the system

To determine the linearity of the system at critical points

To find the solution of the system

To graph the system

4.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What are the eigenvalues of the Jacobian matrix at the critical point (0, 0)?

1 and 1

2 and -2

1 and -1

0 and 1

5.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What type of critical point is (0, 0) based on its eigenvalues?

Unstable node

Stable node

Center

Saddle point

6.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the determinant of the Jacobian matrix at the critical point (0, 0)?

Zero

Two

One

Negative one

7.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the significance of having real eigenvalues with opposite signs?

Indicates a stable node

Indicates a source

Indicates a saddle point

Indicates a center

8.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the stability of the critical point (1, 0)?

Stable

Stable node

Unstable

Neutral

9.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the multiplicity of the eigenvalue at the critical point (1, 0)?

One

Four

Two

Three

10.

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What does the phase portrait verify about the critical points?

Their location

Their existence

Their linearity

Their stability

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