Understanding Linear Transformations and Matrices

Algebraic and geometric

Numerical and symbolic

Theoretical and practical

Discrete and continuous

As static equations

As dynamic processes

As random variables

As transformations of inputs to outputs

Translation

Rotation

Scaling

Reflection

Non-linear transformations

Linear transformations

All possible transformations

Complex transformations

They change dimensions

They distort shapes

They preserve lines and the origin

They curve lines

As planes

As lines

As arrows

As points

It only applies to two-dimensional spaces

It simplifies calculations

It eliminates the need for matrices

It helps determine the transformation of any vector

A representation of transformations

A graphical representation

A type of vector

A set of equations

Arbitrary transformations are simpler

Linear transformations have algebraic constraints

Arbitrary transformations are always linear

Linear transformations are more complex

They are identical

They are opposing concepts

They are unrelated

They are two sides of the same coin