A matrix resulted from elementary row and column transformation is not equivalent to the original matrix as it happens for just row or just column transformations. Given Equivalent means the matrices can be transformed into one another by a combination of elementary row and column operations.

True

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False

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Solution

The correct option is B
False

Irrespective of elementary transformations applied on rows or columns resulting matrix is always equivalent to original one i.e, the matrices can be transformed into one another by a combination of elementary row and column operations.

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A matrix resulted from elementary row and column transformation is not equivalent to the original matrix as it happens for just row or just column transformations. Given Equivalent means the matrices can be transformed into one another by a combination of elementary row and column operations.

The correct option is B False Irrespective of elementary transformations applied on rows or columns resulting matrix is always equivalent to original one i.e, the matrices can be transformed into one another by a combination of elementary row and column operations.

The correct option is B
False

Irrespective of elementary transformations applied on rows or columns resulting matrix is always equivalent to original one i.e, the matrices can be transformed into one another by a combination of elementary row and column operations.