Kak: ok first of all
a linear vector space is n-dimensional iff it has a basis of n vectors
now ur case the a matrix group
vectors can be a basis for some space if satisfy 2 things
they are linearly independent set
n spans the space (linear combinations)
so nmpk kaitan?
a linear vector space is n-dimensional iff it has a basis of n vectors
now ur case the a matrix group
vectors can be a basis for some space if satisfy 2 things
they are linearly independent set
n spans the space (linear combinations)
so nmpk kaitan?
p/s - still find the other reason...
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