Matrix Similarity and Transformations

They have different eigenvalues.

They have the same eigenvalues.

They have different dimensions.

They cannot be diagonalized.

Matrix multiplication

Matrix addition

Diagonalization

Matrix inversion

They help define the similarity relation.

They change the matrix dimensions.

They are used to invert matrices.

They are irrelevant to similarity.

Matrix transformation

Matrix inversion

Matrix subtraction

Matrix addition

A matrix with dependent columns

A matrix with identical columns

A matrix with independent columns

A matrix with zero columns

By using a linear combination of basis vectors

By adding vectors

By multiplying vectors

By subtracting vectors

It is multiplied by zero

It is transformed using a different set of coefficients

It remains unchanged

It is subtracted from vector X

Through matrix inversion

Through matrix addition

Through matrix subtraction

Through matrix P

Addition of vectors

Indirect path using P and P inverse

Subtraction of vectors

Direct multiplication

It shows matrices have different transformations

It shows matrices are identical

It shows matrices are unrelated

It shows matrices represent the same transformation in different bases