Answer Happy

Let u=⎣⎡​−354​⎦⎤​ and v=⎣⎡​−6146​⎦⎤​ We want to determine if {u,v} is linearly independent. To do that we write the vectors as columns of a matrix A and row reduce that matrix. To check this we add times the first row to the second. We then add times the first row to the third. We then add thes new second row to the new third row. We conclude that A. The set {u,v} is linearly dependent. B. The set {u,v} is linearly independent. C. We cannot tell if the set {u,v} is linearly independent or not.
Let u=[33​], and v=[−15−16​] We want to determine if {u,v} is linearly independent. To do that we write the vectors as columns of a matrix A and row reduce that matrix. To check this we add times the first row to the second. We conclude that A. The set {u,v} is linearly dependent. B. The set {u,v} is linearly independent. C. We cannot tell if the set {u,v} is linearly independent or not.