row-echelon matrix form (not reduced)
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what is row-echelon matrix form (not reduced) in matlab?
Answers (2)
Nagabhushan SN
on 9 Oct 2018
lu(A)
performs LU factorization of a matrix. So, you can get upper triangular matrix from there. Not sure though if it performs Gauss reduction
[L,U,P] = lu(A);
Ivan van der Kroon
on 31 May 2011
With rref you will produce the reduced row echelon form, see
doc rref
But a non-reduced form is not unique. See for instance wikipedia: http://en.wikipedia.org/wiki/Gaussian_elimination. You can multiply individual rows with a scalar and/or add rows to other rows. It is in echelon form as long as it is upper-triangular.
3 Comments
Eric T
on 28 Jun 2016
That's fine, though: eigenvectors are not unique either, and there is a function that returns eigenvectors. It wouldn't be that hard to produce it, as you said, as long as it is in upper triangular form (this is like LU factorization which is also underdetermined, but matlab does). I think it would be instructive for Matlab to provide this for my students....I could have them compare rref(A) and (the nonexistent) ref(A)...
Carol Hurwitz
on 20 Jul 2018
yes ,it would be a good idea, especially since Lay's Linear Algebra seems to prefer Matlab
Charles Daniels
on 23 Sep 2020
it should be implemented the same way TI does in their calculators, for consistency
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