Hi,
can somebody help me with the following problems:
*5. An n-dimensional vector space over the field of complex scalars is isomorphic to the vector space of n-tuples of complex numbers. If m vectors are given with m < n, state a test for linear dependence in terms of the rank of an n-by-m matrix formed by using the m n-tuples as columns. What happens in the case m > n?
*6. Prove that in an n-dimensional vector space any set of n+1 vectors is linearly dependent.
Thank you.
can somebody help me with the following problems:
*5. An n-dimensional vector space over the field of complex scalars is isomorphic to the vector space of n-tuples of complex numbers. If m vectors are given with m < n, state a test for linear dependence in terms of the rank of an n-by-m matrix formed by using the m n-tuples as columns. What happens in the case m > n?
*6. Prove that in an n-dimensional vector space any set of n+1 vectors is linearly dependent.
Thank you.
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