Engineering Fundamentals: An Introduction to Engineering, 4th ed.c

(Steven Felgate) #1

18.5 Matrix Algebra 611


This is a good place to define a symmetric matrix. Asymmetric matrixis a square matrix
whose elements are symmetrical with respect to its principal diagonal. An example of a sym-
metric matrix follows.

Example 18.2 Given the following matrices: , perform the


following operations: (a) [A]
T
? and (b) [B]
T
?

(a) As explained earlier, the first, second, third,... , andmth rows of a matrix become the first,
second, third, ..., andmth column of the transpose matrix, respectively.

(b) Similarly,


Determinant of a Matrix


Up to this point, we have defined essential matrix terminology and discussed basic matrix oper-
ations. In this section, we will define what is meant by adeterminant of a matrix. Let us con-
sider the solution to the following set of simultaneous equations:

(18.14a)


a 21 x 1 a 22 x 2 b 2 (18.14b)


a 11 x 1 a 12 x 2 b 1


3 B 4
T

47 1


62 3


 23  4


§


3 A 4
T

08 9


53  2


07 9


§


3 A 4 £


050


837


9  29


§ and 3 B 4 £


46  2


72 3


13  4


§


3 A 4 ≥


14 2 5


4 5 15 20


215  38


520 8 0


¥


5 U 6 e


7


4


9


6


12


u by 3 U 4
T
 37496124

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