Let A be an m x n matrix, and let u and 7 be vectors in R" such that Au 0 and Av = 0. = a. Prove that A (u + v) = 0. Your work should be legible, and all your logic should be clear and justified. Edit ▾ === Insert Formats ▾ Edit - 블 B I U x₂x² Ie A b. Prove that A (cu + dv) = 0 for each pair of scalars c and d. Your work should be legible, and all your logic should be clear and justified. Insert Formats B I U x₂x² A ▼ GO <> # Σ+ Σ Α Σ+ Σ Α

plz do not use the topics rank, vector spaces, subspaces, column spaces, etc. or their associated theory to prove the answer

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