to a space is a chosen
set of vectors so that any vector 
in the space can be
uniquely expressed in terms of the basis vectors:
A basis to a space is a chosen
set of vectors so that any vector in the space can be
uniquely expressed in terms of the basis vectors:
Example: 
are a basis to coordinate space:
Basis vectors are required to be independent, which means you
need all of them to express any arbitrary vector in the space. If
some basis vector can be expressed in terms of the others, you do not
need that vector and should throw it out. For example if 
would
be 
, then you would not need it. But there is no way to
get from a linear combination of 
and 
To check independence of ,verify that
are zero.
(If there are nonzero solutions, you can express a vector with a
nonzero coefficient in terms of the others.)
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