is a subspace of R². S={(x,y)|ax+by = 0, a, b real numbers}

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9. Show that S = {(x,y)|ax+by = 0, a, b real numbers} is a subspace of R². 10. Let u₁= (3, -4,5) and u₂ = (-3, 14,-7). (a) Show that {u₁, u₂} forms a linearly independent set. (b) Construct an orthonormal basis {w₁, W2} for the subspace span{u₁, u₂} of R³. (c) Write u = (3, 6, 3) span{w₁, W2} as a linear combination of the orthonormal basis vectors found in (b). (Hint: Similar to the ideas in Theorem 7.7.1).