RowReduce

RowReduce[m]

gives the rowreduced form of the matrix m.

Details and Options

  • RowReduce performs a version of Gaussian elimination, adding multiples of rows together so as to produce zero elements when possible. The final matrix is in reduced row echelon form.
  • If m is a nondegenerate square matrix, RowReduce[m] is IdentityMatrix[Length[m]]. »
  • If m is a sufficiently nondegenerate rectangular matrix with rows and more than columns, then the first columns of RowReduce[m] will form an identity matrix. »
  • RowReduce works on both numerical and symbolic matrices.
  • The following options can be given:
  • MethodAutomaticmethod to use
    Modulus 0integer modulus to use
    Tolerance Automaticnumerical tolerance to use
    ZeroTest Automaticfunction to test whether matrix elements should be considered to be zero
  • RowReduce[m,Modulus->n] performs row reduction modulo n. »
  • RowReduce[m,ZeroTest->test] evaluates test[m[[i,j]]] to determine whether matrix elements are zero.
  • Possible settings for the Method option include "CofactorExpansion", "DivisionFreeRowReduction", and "OneStepRowReduction". The default setting of Automatic switches among these methods depending on the matrix given.

Examples

open allclose all

Basic Examples  (3)

Do row reduction on a square matrix:

Do row reduction on a rectangular matrix:

Row reduce a matrix with symbolic entries:

Scope  (13)

Basic Uses  (8)

Find the row reduction of a real machine-number matrix:

Row reduce a complex machine-precision matrix:

Row reduce an arbitrary-precision matrix:

Row reduce an exact matrix:

Row reduction of a symbolic matrix:

RowReduce assumes all symbols to be independent:

Row reduction of rectangular matrices:

The row reduction of a large numerical matrix is computed efficiently:

Row reduce a matrix with finite field elements:

Special Matrices  (5)

Row reduction of a sparse matrix:

Row reduction of a structured matrix:

RowReduce does not alter an identity matrix:

Row reduction of a Hilbert matrix:

Compute the row reduction of a matrix of univariate polynomials of degree :

Options  (3)

Modulus  (1)

m is a 3×3 matrix of integers between 0 and 4:

Row reduction of m in ordinary arithmetic:

Row reduction of m in arithmetic modulo 5:

Tolerance  (1)

m is an ill-conditioned matrix:

In exact arithmetic, m is clearly non-degenerate:

With machine arithmetic, the default is to consider elements that are too small as zero:

With zero tolerance, even small terms may be taken into account:

With an augmented matrix, you can see how possible solution components are amplified:

ZeroTest  (1)

By default, symbolic expressions are considered nonzero:

In this case, RowReduce is missing the special case that produces a singular matrix:

Write a function that tests if an expression might be zero:

Pass test[k] as the value of ZeroTest to get a more symbolic reduction:

This catches the special case at , but gives a non-reduced matrix for other values of :

Applications  (13)

Spans and Linear Independence  (5)

The following three vectors are not linearly independent:

The row-reduced form has a zero row:

The following three vectors are linearly independent:

Therefore the row-reduced form is the identity matrix:

Determine if the following vectors are linearly independent or not:

As does not reduce to an identity matrix, they are not linearly independent:

Find the dimension of the column space of the following matrix:

Since the row-reduced form is an identity matrix, the dimension of the column space equals the number of columns:

Find the dimension of the subspace spanned by the following vectors:

Since the row-reduced form has three nonzero rows, that is the dimension of the subspace:

Equation Solving and Invertibility  (8)

Determine if the following system of equations has a unique solution:

Rewrite the system in matrix form:

The coefficient matrix reduces to the identity matrix, so the system has a unique solution:

Verify the result using Solve:

Solve the system , with a matrix and a vector, using row reduction:

Form an augmented matrix :

Do row reduction on the augmented matrix:

The last column is the solution of :

Do it for another righthand side:

There is no solution to since there is a leading 1 in the last column; confirm using Solve:

Find all solutions of the following system of equations:

First, write the coefficient matrix , variable vector and constant vector :

Verify the rewrite:

Reduce the augmented matrix to find one solution:

Extract the last column, which forms one solution:

Since there is a zero row, the null space is nonempty. Row reduce the augmented matrix :

The last half of the last row is an element of the null space:

The general solution is the sum of and any multiple of :

Determine if the following matrix has an inverse:

It does not reduce to an identity matrix, so it is not invertible:

Verify the result using Inverse:

Determine if the following matrix has a nonzero determinant:

Since it reduces to an identity matrix, its determinant must be nonzero:

Confirm the result using Det:

is an eigenvalue of if does not reduce to an identity matrix. A matrix is deficient if it has an eigenvalue whose multiplicity is greater than the number of zero rows in the row-reduced form. Show that is an eigenvalue for the following matrix :

Confirm the result using Eigenvalues:

The matrix is deficient because 2 appears twice, but the row-reduced form only has one zero row:

Confirm the result with Eigensystem, which indicates deficiency by padding the eigenvector list with zeros:

Find the inverse of the following matrix using row reduction:

Form the augmented matrix :

Row-reduce the augmented matrix:

The first three columns of are the identity matrix:

The last three columns are the inverse of :

Verify the result using Inverse:

Estimate the fraction of random 10×10 01 matrices that are invertible:

Properties & Relations  (8)

RowReduce returns the leading zeroes as exact integers, irrespective the precision of the input:

A square matrix m is invertible iff RowReduce[m] is IdentityMatrix[Length[m]]:

Indeed, the inverse can be found by inverting the augmented matrix form by m and the identity matrix:

For a square matrix, m reduces to an identity matrix if and only if Det[m]!=0:

For a square matrix, m reduces to an identity matrix if and only if the null space is empty:

For a square matrix, m reduces to an identity matrix iff LinearSolve[m,b] has a solution for a generic b:

An matrix with has rank iff the first columns of RowReduce[m] form an identity matrix:

Format the row-reduced matrix:

MatrixRank[m] equals the number of nonzero rows in RowReduce[m]:

The null space of a square matrix m can be computed using RowReduce:

Do row reduction on the matrix augmented with the identity matrix:

The augmented half of a row is in the null space if the row has a leading 1 in the augmented half:

Get null vectors using NullSpace:

Even though the vectors are not the same, they are a basis for the same space:

Wolfram Research (1988), RowReduce, Wolfram Language function, https://reference.wolfram.com/language/ref/RowReduce.html (updated 2024).

Text

Wolfram Research (1988), RowReduce, Wolfram Language function, https://reference.wolfram.com/language/ref/RowReduce.html (updated 2024).

CMS

Wolfram Language. 1988. "RowReduce." Wolfram Language & System Documentation Center. Wolfram Research. Last Modified 2024. https://reference.wolfram.com/language/ref/RowReduce.html.

APA

Wolfram Language. (1988). RowReduce. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/ref/RowReduce.html

BibTeX

@misc{reference.wolfram_2025_rowreduce, author="Wolfram Research", title="{RowReduce}", year="2024", howpublished="\url{https://reference.wolfram.com/language/ref/RowReduce.html}", note=[Accessed: 10-July-2025 ]}

BibLaTeX

@online{reference.wolfram_2025_rowreduce, organization={Wolfram Research}, title={RowReduce}, year={2024}, url={https://reference.wolfram.com/language/ref/RowReduce.html}, note=[Accessed: 10-July-2025 ]}