Let denote a
field,
and let be an
-dimensional vector space
with a
basis
,
and let be an -dimensional vector space with a basis
.
For a
linear mapping
-
the
matrix
-
where is the -th
coordinate
of with respect to the basis , is called the describing matrix for with respect to the bases.
For a matrix
,
the linear mapping determined by
-
in the sense of
fact,
is called the linear mapping determined by the matrix .