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

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

Copyright 2010 Cengage Learning. All Rights Reserved. May not be copied, scanned, or duplicated, in whole or in part. Due to electronic rights, some third party content may be suppressed from the eBook and/or eChapter(s).

圀圀圀⸀夀䄀娀䐀䄀一倀刀䔀匀匀⸀䌀伀䴀圀圀圀⸀夀䄀娀䐀䄀一倀刀䔀匀匀⸀䌀伀䴀