![]() ![]() ![]() ![]() 2.13 Prove that if a set of vectors is linearly dependent, then at least one vector can be written as a linear combination of others.2.12 Prove that if a set of m vectors is linearly independent, then a subset of the m vectors also has to be linearly independent.2.11 Prove that if a set of vectors contains the null vector, the set of vectors is linearly dependent.2.10 What do you mean by the rank of a set of vectors?.2.9 What do you mean by vectors being linearly independent?.2.8 What do you mean by a linear combination of vectors?.2.7 How do you multiply a vector by a scalar?.1.21 Consequences of diagonally dominant matrices.1.19 Irreducible diagonally dominant matrix.1.18 Strictly diagonally dominant matrix:.1.15 Do non-square matrices have diagonal entries?.1.4 What are the special types of matrices?. ![]()
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