You will see that the above two operations (addition and multiplication by a scalar) allows us to view the matrix dimensions m imes n as a vector that contains the dimensions of the set mn matrix with size equal to the vector quantity, it is not a kind of POO.
It is evident that the two above. (Addition and multiplication by a scalar) allows us to look at the matrix size m times n is a vector with dimension mn hence the set of matrices of size is the vector species. one
See, operating two above. Addition and multiplication by a (scalar). Help we can look at the matrix size M. Times n as vector dimension Mn hence, the set of matrices with the size of a vector space is a kind of