Linear Algebra - Rows of a Matrix

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3 - Theorem

3.1 - Invertible

Let M, A, and B be matrices, if MA = B where M is invertible then Row A = Row B.

  • therefore change to row causes no change in row space
  • therefore basis for changed rowlist is also a basis for original rowlist.
linear_algebra/row.txt · Last modified: 2013/08/21 17:55 by gerardnico