Lower Triangular Matrix/Examples/m greater than n

Example of Lower Triangular Matrix
A lower triangular matrix of order $m \times n$ such that $m > n$:


 * $\mathbf L = \begin{bmatrix}

a_{1 1} &           0 &            0 & \cdots &                0 &            0 \\ a_{2 1} &     a_{2 2} &            0 & \cdots &                0 &            0 \\ a_{3 1} &     a_{3 2} &      a_{3 3} & \cdots &                0 &            0 \\ \vdots &      \vdots &       \vdots & \ddots &           \vdots &       \vdots \\ a_{n - 1, 1} & a_{n - 1, 2} & a_{n - 1, 3} & \cdots & a_{n - 1, n - 1} &           0 \\ a_{n 1} &     a_{n 2} &      a_{n 3} & \cdots &     a_{n, n - 1} &      a_{n n} \\ a_{n + 1, 1} & a_{n + 1, 2} & a_{n + 1, 3} & \cdots & a_{n + 1, n - 1} & a_{n + 1, n} \\ \vdots &      \vdots &       \vdots & \ddots &           \vdots &       \vdots \\ a_{m - 1, 1} & a_{m - 1, 2} & a_{m - 1, 3} & \cdots & a_{m - 1, n - 1} & a_{m - 1, n} \\ a_{m 1} &     a_{m 2} &      a_{m 3} & \cdots &     a_{m, n - 1} &      a_{m n} \\ \end{bmatrix}$