Question: (1 point) Consider the two lines L1 : x= -2t, y = 1+ 2t, z = 3t and L2 : x = -8 + 4s,

(1 point) Consider the two lines L1 : x= -2t, y = 1+ 2t, z = 3t and L2 : x = -8 + 4s, y = 4+s, z =4+2s Find the point of intersection of the two lines. P = ((1 point) Let A = (-2, 5, -3), B = (0, 9, -5), C = (-3, 12, -9), and D = (-5, 8, -7). Find the area of the parallelogram determined by these four points, the area of the triangle ABC, and the area of the triangle ABD. Area of parallelogram ABCD = Area of triangle ABC = Area of triangle ABD =(1 point) Find the volume of the paraHelepiped with one vertex at (,2, 5, ,3), and adjacent vertices at (1,3, 3), (74,12, ,3), and (,3, 1, 75). Volume = |

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