Question: (1 point) Suppose u = (1, 7, 0), v = (0, 3, -7), and w = (3, 3, -3). Compute the three triple scalar products

(1 point) Suppose u = (1, 7, 0), v = (0, 3, -7), and w = (3, 3, -3). Compute the three triple scalar products (u x v) . w, (v X w) . u, and (w x u) . U. Then find the volume of the parallelepiped determined by u, v, and w. (ux v) . w = 117 (3 X w) . u = (w X u) . v = Parallelepiped has volume

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