2., Given three vectors; A = 2 3 + 4 B = + 2 and C = 2 +2 k a. Find A . B b. Find B x C. ( the magnitude of B x C is the area of a parallelogram bounded by A and B) c. Find A . (B x C). ( A . (B x C) is the volume of parallelepiped bounded by A, B, and C) d. For A = Ax + Ay + AZ B = BX + By + BZ and C = Cx + Cy + CZ Evaluate A . (B x C) (This is the formula for the volume of a parallelepiped) using the formula below. Ax Ay AZ Bx By BZ A . (B x C) = Cx Cy Cz ii) by evaluating first the cross product (B x C) . iii) Why is it not allowed to evaluate A.B first