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

(Steven Felgate) #1

18.5 Matrix Algebra 607


The diagonal along which values 5, 7, 4, and 11 lies is called theprincipal diagonal. Anidentity
orunit matrixis a diagonal matrix whose elements consist of a value of 1. An example of an iden-
tity matrix follows.

Matrix Addition or Subtraction


Two matrices can be added together or subtracted from each other provided that they are
of the same size — each matrix must have the same number of rows and columns. We can add
matrix [A]mnof dimensionmbyn(havingmrows andncolumns) to matrix [B]mnof the
same dimension by adding the like elements. Matrix subtraction follows a similar rule, as shown.

Matrix Multiplication


In this section, we will discuss the rules for multiplying a matrix by a scalar quantity and by
another matrix.

Multiplying a Matrix by a Scalar Quantity When a matrix [A] is multiplied by a scalar quantity with a mag-
nitude such as 5, the operation results in a matrix of the same size, whose elements are the prod-
uct of elements in the original matrix and the scalar quantity. For example, when we multiply
matrix [A] of size 3 3 by a scalar quantity 5, this operation results in another matrix of size

E


110  2213  122 .. 12  82


15  1211  72 .. 10  152


.....


.....


19  4212  552 .. 17  102


U


3 A 4  3 B 4 E


103..2


51..0


. ....
. ....


92..7


UE


212.. 8


1 7..15


. ....
. ....


455..10


U


3 I 4 G


100..00


010..00


001..00


.......


.......


000..10


000..01


W


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

Free download pdf