Linearization PROOF | Nonlinear Dynamics (Part 3 extra)

To determine where the flow has maximum velocity

To identify points where the flow has zero velocity

To locate points of infinite velocity

To find points where the flow changes direction

To find the exact solution of the system

To eliminate all terms in the equation

To approximate the function as a polynomial

To convert the system into a nonlinear equation

It increases the accuracy of the solution

It makes the equation more complex

It has no effect on the equation

It simplifies the equation to a linear form

To make the system nonlinear

To simplify the equation by centering it at the fixed point

To eliminate the fixed points from the equation

To introduce new variables that complicate the system

It allows for the determination of eigenvalues and eigenvectors

It provides an exact solution to the system

It is only useful for nonlinear systems

It can be solved using complex numbers

It is applicable to all systems without exception

It only describes dynamics near fixed points

It is only valid far from fixed points

It can only be applied to systems with no fixed points

When the system has no fixed points

When the trace squared minus four times the determinant equals zero

When the determinant of matrix A is non-zero

When the trace of matrix A is non-zero