Post History
#3: Post edited
by
Peter Taylor
·
2021-08-18T15:31:29Z (over 2 years ago)
Escaping workaround
- $\begin{bmatrix}a & b & c & d\end{bmatrix}$
$\begin{bmatrix}a \\ b \\ c \\ d \end{bmatrix}$<h6>Unable to create new line</h6> In second Matrix they are in a column.- Which one is $1$ dimensional Matrix? I think that first matrix is $1$ dimensional. But, when we put $2$ values in row and two values in column. Then, we call that $2$ dimensional Matrix. So, what's the dimension of second matrix? It has lots of values in column and, only $1$ in every row.
- $\begin{bmatrix}a & b & c & d\end{bmatrix}$
- $\begin{bmatrix}a \\\\ b \\\\ c \\\\ d \end{bmatrix}$
- Which one is $1$ dimensional Matrix? I think that first matrix is $1$ dimensional. But, when we put $2$ values in row and two values in column. Then, we call that $2$ dimensional Matrix. So, what's the dimension of second matrix? It has lots of values in column and, only $1$ in every row.
#1: Initial revision
If a matrix has lots of values in a column but, not in row than, what that actually called?
$\begin{bmatrix}a & b & c & d\end{bmatrix}$
$\begin{bmatrix}a \\ b \\ c \\ d \end{bmatrix}$
<h6>Unable to create new line</h6> In second Matrix they are in a column.
Which one is $1$ dimensional Matrix? I think that first matrix is $1$ dimensional. But, when we put $2$ values in row and two values in column. Then, we call that $2$ dimensional Matrix. So, what's the dimension of second matrix? It has lots of values in column and, only $1$ in every row.