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transformatiebasis

In linear algebra, transformatiebasis refers to a basis that is obtained by applying a linear transformation to an existing basis of a vector space. If V is an n-dimensional vector space over a field F and B = {v1, ..., vn} is a basis, and T: V → V is a linear transformation, then the set T(B) = {T(v1), ..., T(vn)} is called a transformatiebasis of V with respect to T.

If T is invertible, then T(B) is again a basis of V, because T preserves linear independence

Transformatiebasis is closely related to change of basis. If B is the original basis and B' = T(B)

and
spans
V.
If
T
is
not
invertible,
T(B)
spans
the
image
im(T)
and
may
not
be
a
basis
of
V,
although
it
still
describes
how
the
original
basis
vectors
are
transformed.
The
most
familiar
case
is
when
V
=
R^n
and
the
transformation
is
represented
by
a
matrix
A.
The
transformatiebasis
is
then
the
set
of
columns
of
A
(when
A
is
viewed
as
acting
on
the
standard
basis),
and
these
vectors
form
a
basis
if
A
is
invertible.
is
the
transformatiebasis,
the
change-of-basis
matrix
from
B
to
B'
encodes
how
coordinates
transform
between
the
two
bases.
In
computations,
selecting
an
appropriate
transformatiebasis
can
simplify
the
representation
of
T,
such
as
by
diagonalizing
the
operator
when
possible,
or
by
aligning
with
particular
geometric
or
computational
goals.