Math, asked by bhsindhu57, 5 months ago

Show that the elementary transformation do not
alter the rank of matrix​

Answers

Answered by nathaarna
5

Answer:

Proof: Elementary row (resp. column) operations can be simulated as left (resp. right) multiplication by the elementary matrices. Since the elementary matrices are invertible, such multiplication does not change the rank of a matrix.

Step-by-step explanation:

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