b.) Let X = 1 2 y 0 2x + 3y||. (3 Marks) vectors 2 =...

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b.) Let X = 1 2 y 0 2x + 3y||. (3 Marks) vectors 2 = W = 2 3 c.) Given that and y are orthogonal vectors, Simplify the expression (x+2y) · (3x – 2y.) (3 Marks) . -1 d.) Define linear depence. Show that the -- -61·04- 3 5 linearly dependent. And show clearly how one of the vectors is a linear combination of the vectors. (4marks) Evaluate e.) Let V R². Show that = space of R². (3 Marks) 5 12 are 25 {{ [*] | x+2y=0} is a vector b.) Let X = 1 2 y 0 2x + 3y||. (3 Marks) vectors 2 = W = 2 3 c.) Given that and y are orthogonal vectors, Simplify the expression (x+2y) · (3x – 2y.) (3 Marks) . -1 d.) Define linear depence. Show that the -- -61·04- 3 5 linearly dependent. And show clearly how one of the vectors is a linear combination of the vectors. (4marks) Evaluate e.) Let V R². Show that = space of R². (3 Marks) 5 12 are 25 {{ [*] | x+2y=0} is a vector

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As requested lets address part b of the question Given x 1 ... View the full answer