The det( command calculates the determinant of a square matrix. If its argument is not a square matrix, ERR:INVALID DIM will be thrown.

Advanced Uses

If [A] is an N×N matrix, then the roots of det([A]-X identity(N)) are the eigenvalues of [A].

Formulas

For 2×2 matrices, the determinant is simply

<math> \det\left( \begin{bmatrix} a & b\\c & d \end{bmatrix} \right) = \begin{vmatrix} a & b\\c & d \end{vmatrix} = ad-bc </math>

For larger matrices, the determinant can be computed using the [wikipedia:Laplace_expansion Laplace expansion], which allows you to express the determinant of an n×n matrix in terms of the determinants of (n-1)×(n-1) matrices. However, since the Laplace expansion takes <math>O\left( n! \right)</math> operations, the method usually used in calculators is Gaussian elimination, which only needs <math>O\left( n^3 \right)</math> operations.

The matrix is first decomposed into a unit lower-triangular matrix and an upper-triangular matrix using elementary row operations:

<math> \begin{pmatrix}{1}&{}&{}\\ {\vdots}&{\ddots}&{}\\ {\times}&{\cdots}&{1}\end{pmatrix} \begin{pmatrix}{\times}&{\cdots}&{\times}\\ {}&{\ddots}&{\vdots}\\ {}&{}&{\times}\end{pmatrix} </math>

The determinant is then calculated as the product of the diagonal elements of the upper-triangular matrix.

Error Conditions

• ERR:INVALID DIM is thrown when the matrix is not square.

Related Commands

• Identity(
• Ref(
• Rref(