2.5 Determinants and applications 8728 What can be said about the tip of the vector OP ifOP = c,OPI + c2OP2 + c30P3,where cl, c2, c3 are scalars for which cl + Cl + c3 = 1? Ans.: It lies in the plane
(or each plane) which contains P1, P2, and P3.2.5 Determinants and applications Rectangular arrays of elements
such asa21 a22)'an a12 a23
a21 a22 a23 ,
a31 a32 a33are called matrices. For the present we may think of the elements a2a as
being numbers. The middle matrix has three rows, the elements of the
second row being a21, a22, a23, and three columns (columns are things that
stand in vertical positions), the elements of the third column being
an, a23, ass. A matrix is square if it contains as many columns as rows,
and in this case the number of rows is called the order of the matrix.
With each square matrix we associate a number which is called the
determinant of the matrix or simply a determinant. The symbols 02, A3,
and A4 appearing in
(2.51) A2 =ail, axe
a21 'a22A3=
all
all
a31a12 a13
all a23
a32 anA4 =all all a13 a14
a21 a22 a23 a24
a31 a32 a33 a34
a41 a42 a43 a44are numbers, not matrices. It *ill, however, be a convenience to say
that an is the element in the third row and second column of the deter-
minant As instead of saying that it is the element in the third row and
second column of the matrix of which As is the determinant. A little time
spent learning about determinants can pay very handsome dividends.
The number A2 is defined by the formula(2.52) A2 = alla22 - a12a21This shows how to evaluate determinants of order 2. For example,
1 0
0 1 = 1, a bl =ab-ab=0,1 2
-3 4= 4 - (-6) = 10.
The definitions of As and A4 are more complicated, and we introduce
helpful words and notations. To each element a;k of a determinant
there corresponds the minor A;k which remains after the row and column