Teaching CSIR NET Mock Test Series Engineering Mathematics Linear Algebra Eigenvalues

Let T : ℝⁿ → ℝⁿ be a linear transformation, where n ≥ 2. For k ≤ n, let E = {v₁, v₂...v_k} ⊆ ℝⁿ and F = {Tv₁, Tv₂...Tv_k}. Then

1

If E is linearly independent, then F is linearly independent

2

If F is linearly independent, then E is linearly independent

3

If E is linearly independent, then F is linearly dependent

4

If F is linearly independent, then E is linearly dependent

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