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10 Nov 2019
Prove:
(A) Every matrix is row equivalent to itself.
(B) If B is row equivalent to A ,then A is row equivalent toB.
(C)If C is row equivalent to B and B is row equivalent to A, then Cis row equivalent to A
Prove:
(A) Every matrix is row equivalent to itself.
(B) If B is row equivalent to A ,then A is row equivalent toB.
(C)If C is row equivalent to B and B is row equivalent to A, then Cis row equivalent to A
Hubert KochLv2
27 Jul 2019