2.6 Vector products and changes of coordinates in E; 10511 Prove that if u and v and w are vectors having scalar components ul,
u2, u3 and v1, 82, V3 and w1, w2, w3, then
X w) = (uli + u2j + u3k)X w) =u1
91
W1U2 U3
V2 83
W2 W3i j k
fl1^5393
W1 w2 w3Remark: The number X w) is called the scalar triple product of the three
vectors, and we shall see how it is related to volumes of tetrahedrons and paral-
lelepipeds. Let v and w be nonzero nonparallel vectors having their tails at a
point .Q as in Figure 2.691. Then
(3) v Xw=lviJwJ sinOn=2IT2ln,
where 0 is the angle between v and w, n is the unit normal determined by the
right-hand rule, and I T21 is the area of the two dimensional triangle T2 of whichFigure 2.691v and w form two sides. Let u be a third vector which has its tail at d and makes
the angle 0 with n. In case 0 < 0 < a/2, the number is the distance from
the tip of u to the plane of the vectors v and w. The volume V of the tetrahe-
dron having base T2 and opposite vertex B is therefore given by the formula(4)Hence(5)V =V = x w).
The volume of the tetrahedron is half the volume of the pyramid whose vertex
is B and whose base is the parallelogram of which v and w are two adjacent sides.
The volume of this pyramid is one-third the volume V5 of the parallelepiped of
which u, v, w are adjacent edges. Therefore,(6) Vp = X W).Thus, when 0 < 4, < r/2, the scalar triple product X w) is the volume of
the parallelepiped of which u, v, w are three adjacent edges. When 0 = 7r/2,
the vector u lies in the plane of v and w and the scalar triple product is zero.