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6 Nov 2019
Show that {u vector _1, u vector _2, u vector_3} is an orthogonal basis for R^3, and write x vector as a linear combination of the vectors {u vector _1, u vector _2, u vector_3}. u {u vector _1, u vector _2, u vector_3}_1 = [-1 -1 4], u {u vector _1, u vector _2, u vector_3}_2 = [2 2 1], u{u vector _1, u vector _2, u vector_3}_3 = [-1 1 0], x {u vector _1, u vector _2, u vector_3} = [4 7 -2] Show transcribed image text
Show that {u vector _1, u vector _2, u vector_3} is an orthogonal basis for R^3, and write x vector as a linear combination of the vectors {u vector _1, u vector _2, u vector_3}. u {u vector _1, u vector _2, u vector_3}_1 = [-1 -1 4], u {u vector _1, u vector _2, u vector_3}_2 = [2 2 1], u{u vector _1, u vector _2, u vector_3}_3 = [-1 1 0], x {u vector _1, u vector _2, u vector_3} = [4 7 -2]
Show transcribed image text Lelia LubowitzLv2
15 May 2019