Do row reduction on a square matrix:

Do row reduction on a rectangular matrix:

m is an exact 4×4 matrix:

Use exact arithmetic for the Gaussian elimination:

With machine‐number arithmetic, the leading zeros and ones are still exact:

With higher‐precision arithmetic, the leading zeros and ones are still exact:

Row reduction for a random complex 3×4 matrix:

m is a matrix and b is a vector:

Form an augmented matrix :

Do row reduction on the augmented matrix:

The last column is the solution of :

Do it for another right‐hand side:

There is no solution to since there is a leading 1 in the last column:

m is a symbolic matrix:

Find the symbolic inverse:

This is the equivalent to what is given by Inverse:

m is a non-degenerate square matrix:

RowReduce[m] is IdentityMatrix[Length[m]]:

Augment m with the 3×3 identity matrix:

Do row reduction on the augmented matrix:

The last three columns of the result are Inverse[m]:

m is a 3×5 matrix:

m has its maximal MatrixRank of 3:

The first 3 columns of RowReduce[m] are the 3×3 identity matrix:

m is a degenerate square matrix:

Augment m with the 4×4 identity matrix:

Do row reduction on the augmented matrix:

The last 4 columns of any row with the leading one beyond the 4 column is in the null space:

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