Exercise 1.1.16

Question

The rows of $R$ are a basis for the row space of $A .$ What does that sentence mean?

Neil Z. · Accepted Answer

The rows of $R$ are a basis for the row space of $A$, this means
that for any vector in the row space of $A$, it is a linear
combination of the row vectors in $R$. The row vectors in $R$ are
independent as well.

Exercise 1.1.16

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Exercise 1.1.16

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