A set of two, three, or four red vectors in R² or R° is shown in each picture below. Determine whether each set of vectors is a basis (for the appropriate subspace, R? or R). Note: For the pictures in R³, a grid is drawn in the xy-plane, and vectors with their tip on the grid are in the xy-plane, while vectors with their tip not on the grid are not in the xy-plane. Y choose choose choose choose basis choose

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A set of two, three, or four red vectors in R² or R³ is shown in each picture below. Determine whether each set of vectors is a basis (for the appropriate subspace, R? or R³). Note: For the pictures in R³, a grid is drawn in the xy-plane, and vectors with their tip on the grid are in the æy-plane, while vectors with their tip not on the grid are not in the æy-plane. choose choose choose choose basis choose