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

606 Chapter 18 Mathematics in Engineering

by a single value such as two hours. These types of physical variables which are identifiable by a

single value are calledscalars. Temperature is another example of a scalar variable. On the other

hand, if you were to describe the velocity of a vehicle, you not only have to specify how fast it is

moving (speed), but also its direction. The physical variables that possess both magnitude and

direction are calledvectors. There are also other quantities that require specifying more than two

pieces of information to describe them accurately. For example, if you were to describe the loca-

tion of a car parked in a multi-story garage (with respect to the garage entrance), you would need

to specify the floor (zcoordinate), and then the location of the car on that floor (xandycoordi-

nates). A matrix is often used to describe situations that require many values. Amatrixis an array

of numbers, variables, or mathematical terms. The numbers or the variables that make up the matrix

are called theelements of matrix. Thesizeof a matrix is defined by its number of rows and columns.

A matrix may consist ofmrows andncolumns. For example,

matrix [N] is a 3 by 3 (or 3 3) matrix whose elements are numbers, and {L} is a 3 by 1

matrix with its elements representing variablesx,y, andz. The [N] is called a square matrix. A

squarematrix has the same number of rows and columns. The element of a matrix is denoted

by its location. For example, the element in the first row and the third column of a matrix [N]

is denoted byn 13 (it readsnsub 13), which has a value of 9. In this book, we denote the matrix

by a boldface letterin brackets like [ ] and { }. For example, [N], [T], {F}, and the elements

of matrices are represented by regular lowercase letters. The { } is used to distinguish a column

matrix. A column matrix is defined as a matrix that has one column but could have many rows.

On the other hand, a row matrix is a matrix that has one row but could have many columns.

Examples of column and row matrices follow.

are examples of column matrices, whereas

are examples of row matrices.

Diagonal and Unit Matrices A diagonal matrix is one that only has elements along its principal

diagonal; the elements are zero everywhere else. An example of a 4 4 diagonal matrix

follows.

3 A 4 ≥

500 0

070 0

004 0

00011

¥

3 C 4  3502  34 and 3 Y 4  3 y 1 y 2 y 34

5 A 6 μ

1

5

 2

3

∂ and 5 X 6 •

x 1

x 2

x 3

¶

5 L 6 •

x

y

z

3 N 4 £ ¶

659

12614

 580

§

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