Intermediate Algebra (11th edition)

OBJECTIVES

2 CHAPTER 1 Review of the Real Number System

OBJECTIVE 1 Write sets using set notation.A setis a collection of objects

called the elementsor membersof the set. In algebra, the elements of a set are usu-

ally numbers. Set braces, {}, are used to enclose the elements.

For example, 2 is an element of the set Since we can count the number

of elements in the set it is a finite set.

In our study of algebra, we refer to certain sets of numbers by name. The set

Natural (counting) numbers

is called the natural numbers,or the counting numbers.The three dots (ellipsis

points) show that the list continues in the same pattern indefinitely. We cannot list all

of the elements of the set of natural numbers, so it is an infinite set.

Including 0 with the set of natural numbers gives the set of whole numbers.

Whole numbers

The set containing no elements, such as the set of whole numbers less than 0, is called

the empty set,or null set,usually written or 0 {}.

W 5 0, 1, 2, 3, 4, 5, 6, Á 6

N 5 1, 2, 3, 4, 5, 6, Á 6

5 1, 2, 3 6 ,

5 1, 2, 3 6.

Basic Concepts

1.1

1 Write sets using set notation. 2 Use number lines. 3 Know the common sets of numbers. 4 Find additive inverses. 5 Use absolute value. 6 Use inequality symbols. 7 Graph sets of real numbers.

CAUTION Do not write for the empty set. is a set with one element:.

Use the notation or { 0 } for the empty set.

506 506 0

To write the fact that 2 is an element of the set we use the symbol

(read “is an element of ”).

The number 2 is also an element of the set of natural numbers N.

To show that 0 is notan element of set N, we draw a slash through the symbol

Two sets are equal if they contain exactly the same elements. For example,

(Order doesn’t matter.) However, ( means “is

not equal to”), since one set contains the element 0 while the other does not.

In algebra, letters called variablesare often used to represent numbers or to de-

fine sets of numbers. For example,

(read “the set of all elements xsuch that xis a natural number between 3 and 15”)

defines the set

The notation is an example of set-

builder notation.

the set of all elements x such that xhas a given property P

5 x |x has property P 6

5 x |x is a natural number between 3 and 15 6

5 4, 5, 6, 7,Á, 14 6.

5 x |x is a natural number between 3 and 15 6

5 1, 2 6 = 5 2, 1 6. 5 1, 2 6 Z 5 0, 1, 2 6 Z

0 N

.

2 N

2 5 1, 2, 3 6

5 1, 2, 3 6 ,

⎩⎪⎨⎪⎧ ⎩⎪⎪⎨⎪⎪⎧ ⎩⎪⎨⎪⎧ ⎩⎪⎪⎪⎪⎨⎪⎪⎪⎪⎧

Intermediate Algebra (11th edition)

OBJECTIVES

2 CHAPTER 1 Review of the Real Number System

OBJECTIVE 1 Write sets using set notation.A setis a collection of objects

called the elementsor membersof the set. In algebra, the elements of a set are usu-

ally numbers. Set braces, {}, are used to enclose the elements.

For example, 2 is an element of the set Since we can count the number

of elements in the set it is a finite set.

In our study of algebra, we refer to certain sets of numbers by name. The set

is called the natural numbers,or the counting numbers.The three dots (ellipsis

points) show that the list continues in the same pattern indefinitely. We cannot list all

of the elements of the set of natural numbers, so it is an infinite set.

Including 0 with the set of natural numbers gives the set of whole numbers.

The set containing no elements, such as the set of whole numbers less than 0, is called

the empty set,or null set,usually written or 0 {}.

5 1, 2, 3 6 ,

5 1, 2, 3 6.

CAUTION Do not write for the empty set. is a set with one element:.

Use the notation or { 0 } for the empty set.

506 506 0

To write the fact that 2 is an element of the set we use the symbol

(read “is an element of ”).

The number 2 is also an element of the set of natural numbers N.

To show that 0 is notan element of set N, we draw a slash through the symbol

Two sets are equal if they contain exactly the same elements. For example,

(Order doesn’t matter.) However, ( means “is

not equal to”), since one set contains the element 0 while the other does not.

In algebra, letters called variablesare often used to represent numbers or to de-

fine sets of numbers. For example,

(read “the set of all elements xsuch that xis a natural number between 3 and 15”)

defines the set

The notation is an example of set-

builder notation.

5 x |x has property P 6

5 x |x is a natural number between 3 and 15 6

5 4, 5, 6, 7,Á, 14 6.

5 x |x is a natural number between 3 and 15 6

5 1, 2 6 = 5 2, 1 6. 5 1, 2 6 Z 5 0, 1, 2 6 Z

0 N

.

2 N

2 5 1, 2, 3 6

5 1, 2, 3 6 ,

⎩⎪⎨⎪⎧ ⎩⎪⎪⎨⎪⎪⎧ ⎩⎪⎨⎪⎧ ⎩⎪⎪⎪⎪⎨⎪⎪⎪⎪⎧

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