$ \newcommand{\braket}[1]{\langle #1 \rangle} \newcommand{\abs}[2][]{\left\lvert#2\right\rvert_{\text{#1}}} \newcommand{\ket}[1]{\left\lvert#1 \right.\rangle} \newcommand{\bra}[1]{\langle\left. #1\right\rvert} \newcommand{\braket}[1]{\langle #1 \rangle} \newcommand{\dd}{\text{d}} \newcommand{\dv}[2]{\frac{\dd #1}{\dd #2}} \newcommand{\pdv}[2]{\frac{\partial}{\partial #1}} $
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A $m\times n$ matrix is elementary if it is obtained from the identity matrix $I_m$ by applying a single elementary row operation.

Concepts

Elementary matrices are invertible with other elementary row operations.

Used In

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Hypothesis

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A $m\times n$ matrix is elementary if it is obtained from the identity matrix $I_m$ by applying a single elementary row operation.

Concepts

Elementary matrices are invertible with other elementary row operations.

Used In

Coming soon

Hypothesis

Coming soon

Results

Coming soon
FullPage
definition
concepts
used in
hypothesis
results
FullPage
definition
concepts
used in
hypothesis
results
A $m\times n$ matrix is elementary if it is obtained from the identity matrix $I_m$ by applying a single elementary row operation.

Concepts

Elementary matrices are invertible with other elementary row operations.

Used In

Coming soon

Hypothesis

Coming soon

Results

Coming soon
A $m\times n$ matrix is elementary if it is obtained from the identity matrix $I_m$ by applying a single elementary row operation.

Concepts

Elementary matrices are invertible with other elementary row operations.

Used In

Coming soon

Hypothesis

Coming soon

Results

Coming soon
FullPage
definition
concepts
used in
hypothesis
results