Elementary Matrix corresponding to Elementary Row Operation/Exchange Rows

Theorem
Let $\map \MM {m, n}$ be a metric space of order $m \times n$ over a field $K$.

Let $\mathbf I$ denote the unit matrix of order $m$ in $\map \MM {m, n}$.

Let $e$ be the elementary row operation acting on $\mathbf I$ as:

for $1 \le i \le m$, $1 \le j \le m$.

Let $\mathbf E$ be the elementary row matrix of order $m$ defined as:
 * $\mathbf E = e \paren {\mathbf I}$

$\mathbf E$ is of the form:
 * $E_{a b} = \begin {cases} \delta_{a b} & : \text {if $a \ne i$ and $a \ne j$} \\ \delta_{j b} & : \text {if $a = i$} \\ \delta_{i b} & : \text {if $a = j$} \end {cases}$

where:
 * $E_{a b}$ denotes the element of $\mathbf E$ whose indices are $\tuple {a, b}$
 * $\delta_{a b}$ is the Kronecker delta:
 * $\delta_{a b} = \begin {cases} 1 & : \text {if $a = b$} \\ 0 & : \text {if $a \ne b$} \end {cases}$

Proof
By definition of the unit matrix:
 * $I_{a b} = \delta_{a b}$

where:
 * $I_{a b}$ denotes the element of $\mathbf I$ whose indices are $\tuple {a, b}$.

By definition, $\mathbf E$ is the square matrix of order $m$ formed by applying $e$ to the unit matrix $\mathbf I$.

That is, all elements of row $i$ of $\mathbf I$ are to have the corresponding elements of row $j$ added to them after the latter have been multiplied by $\lambda$.

By definition of unit matrix:
 * all elements of row $i$ are $0$ except for element $I_{i i}$, which is $1$.
 * all elements of row $j$ are $0$ except for element $I_{j j}$, which is $1$.

Thus in $\mathbf E$:
 * where $a \ne i$ and $a \ne j$, $E_{a b} = \delta_{a b}$ (all rows except $i$ and $j$ are unchanged)
 * where $a = i$, $E_{a b} = \delta_{j b}$ (the contents of row $j$)
 * where $a = j$, $E_{a b} = \delta_{i b}$ (the contents of row $i$)

That is:
 * $E_{a b} = \begin {cases} \delta_{a b} & : \text {if $a \ne i$ and $a \ne j$} \\ \delta_{j b} & : \text {if $a = i$} \\ \delta_{i b} & : \text {if $a = j$} \end {cases}$

Hence the result.