Discover the Vital Property of Elementary Row Operations in Linear Systems

Is the statement​ Every elementary row operation is​ reversible true or​ false? Explain.

True, because​ replacement, interchanging, and scaling are all reversible.

The statement Every elementary row operation is reversible is true.

This is because elementary row operations involve adding, subtracting, or multiplying a row by a constant and these operations can be undone or reversed by performing the opposite operation.

For example, if we add two rows together, we can reverse this operation by subtracting the same two rows. If we multiply a row by a constant, we can reverse the operation by multiplying by the reciprocal of that constant.

Therefore, every elementary row operation can be reversed and this property is important in the process of row reduction and finding solutions to linear systems.

More Answers:
False statement: Two matrices are row equivalent if they have the same number of rows. Understanding Matrix Row Equivalence and the Misconception about the Number of Rows
Understanding the Significance of Existence and Uniqueness in Solving Linear Systems
Understanding Matrix Dimensions: Debunking the Myth of Six Rows in a 5×6 Matrix

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