Matrix Exponentials and Diagonalization Concepts

The matrix must be a diagonal matrix.

The matrix must be invertible.

The matrix must have n linearly independent eigenvectors.

The matrix must be symmetric.

e^(A+B) = e^A + e^B

e^(A+B) = e^Ae^B

e^(A^2) = (e^A)^2

e^(BAB^-1) = Be^AB^-1

Matrix multiplication

Matrix inversion

Diagonalization

Matrix transposition

A matrix with exponential entries on the diagonal

A zero matrix

An identity matrix

A matrix with all entries equal to one

Zeros and ones

Eigenvectors as columns

Eigenvalues as columns

Random values

Transposing the matrix

Multiplying the matrix by a scalar

Computing the eigenvalues and eigenvectors

Finding the inverse of the matrix

It is a zero matrix.

It is a diagonal matrix with eigenvalues on the diagonal.

It is the inverse of matrix A.

It contains the eigenvectors.

1 and 2

3 and -1

0 and 1

2 and -2

x = 4e^t, y = 2e^-t

x = 2e^t, y = 2e^t

x = 3e^3t + e^-t, y = 3e^3t - e^-t

x = e^t, y = e^-t

By using the formula e^(TA) = E * e^(TD) * E^-1

By multiplying the matrix A by T

By adding T to each entry of A

By transposing the matrix A