Understanding Non-linear Systems and Critical Points

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

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

1 and -1

3 and -3

0 and 1

0 ± i

The system is asymptotically stable

The system has a center

The system is a stable node

The system is a spiral sink

Stable node

Spiral sink

Spiral source

Center

The system is stable

The system is unstable

The system is critically stable

The system is neutrally stable

It oscillates around the origin

It remains at the origin

It spirals towards the origin

It moves away from 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

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

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