Eigenvalues and Determinants Concepts

The determinant is always zero.

The eigenvalues are always complex numbers.

The matrix is larger, making calculations more complex.

The eigenvectors are not unique.

A times a non-zero vector equals λ times the same non-zero vector.

A times a zero vector equals λ times the zero vector.

A times a non-zero vector equals zero.

A times any vector equals λ times the identity matrix.

The determinant of λ times the identity matrix plus A is zero.

The determinant of λ times the identity matrix minus A is zero.

The determinant of A is non-zero.

The determinant of A is equal to λ.

Gaussian Elimination

Laplace Expansion

Rule of Sarrus

Cramer's Rule

A polynomial whose roots are the eigenvectors of the matrix.

A polynomial whose roots are the eigenvalues of the matrix.

A polynomial that represents the trace of the matrix.

A polynomial that represents the inverse of the matrix.

Setting the determinant equal to zero.

Using the rule of Sarrus to find the determinant.

Factoring out common terms.

Expanding the determinant using cofactor expansion.

It indicates a solution for the eigenvectors.

It identifies a potential eigenvalue.

It confirms the matrix is invertible.

It shows the matrix is singular.

The trace of the matrix.

The coefficients of the polynomial.

The eigenvectors of the matrix.

The factors of the constant term.

0 and 1

1 and -1

3 and -3

2 and -2

Finding the inverse of the matrix.

Solving for the eigenvectors.

Determining the rank of the matrix.

Calculating the trace of the matrix.