= {lu v w]T = 0} 4. Find an orthonormal basis for the subspace S : u + v = 0 and u – 2w of R".

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2. Find a basis for the subspace W = {[w y z]' : ax + by + cz = 0, a, b, c e R} of R". What is the dimension of W? 3. Let A be a square matrix, and that k1, k2 and A are scalars. Show that if Av = Xv and Aw = Xw then, A(k1v + k2w) = X(k1v+ k2w). What can you imply about kjv + k2w? Justify your answer. 4. Find an orthonormal basis for the subspace S = {[u v w]': :u + v = 0 and u – 2w = 0} of R".