RowReduce

gives the row‐reduced 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 non‐degenerate square matrix, RowReduce[m] is IdentityMatrix[Length[m]]. »
If m is a sufficiently non‐degenerate 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:

Method	Automatic	method to use
Modulus	0	integer modulus to use
Tolerance	Automatic	numerical tolerance to use
ZeroTest	Automatic	function 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.