Linear algebra and differential equations belong together.

MATH 5520H is not just a list of techniques. The point of this page is to connect vector spaces, eigenvalues, diagonalization, systems of differential equations, stability, and matrix exponentials so the course feels like one structure.

V Linear Algebra

Spaces, maps, bases, eigenvectors, diagonalization.

A Linear Systems

Use matrices to describe coupled change.

e Differential Equations

Solve and classify x' = Ax using algebraic information.

Drag the concepts while studying relationships.

Click a node to read what it contributes to the course.

Vector Spaces

A vector space gives the setting where linear combinations, bases, dimension, and coordinate representations make sense.

  • Ask: what objects are the vectors?
  • Track: basis, dimension, subspace, span, independence.

Classify x' = Ax from trace and determinant.

Move the matrix entries and watch the phase portrait update. This is the algebra-to-ODE bridge: eigenvalues control stability.

Matrix A
[1, -2; 2, -1]
Trace
0
Determinant
3
Classification
Center or spiral boundary

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