We have
 
Since there are  different
 different  -th roots of unity in
-th roots of unity in  , these vectors are
linearly independent
due to
fact,
and they generate a
, these vectors are
linearly independent
due to
fact,
and they generate a
 -dimensional
linear subspace
-dimensional
linear subspace
 of
 of  . In fact, we have
. In fact, we have
-   
Since the vectors
 ,
,  ,
are
fixed vectors,
the
,
are
fixed vectors,
the  together with the
 together with the
 ,
,  ,
form a basis consisting of eigenvectors of
,
form a basis consisting of eigenvectors of  . Hence,
. Hence,  is diagonalizable.
 is diagonalizable.