Beginning Algebra, 11th Edition

We indicate the additive inverse of a number by writing the symbol in front of

the number. For example, the additive inverse of 7 is written We could write the

additive inverse of as , but we know that 3 is the additive inverse of.

Since a number can have only one additive inverse, 3 and must represent the

same number, so

This idea can be generalized.

- 1 - 32 = 3.

- 1 - 32

- 3 - 1 - 32 - 3

- 7.

-

32 CHAPTER 1 The Real Number System

Double Negative Rule

For any real number x, 1 x 2 x.

The table in the margin shows several numbers and their additive inverses.

OBJECTIVE 4 Find the absolute value of a real number. Because additive

inverses are the same distance from 0 on a number line, a number and its additive in-

verse have the same absolute value. The absolute valueof a real number x, written

and read“the absolute value of x,”can be defined as the distance between 0 and

the number on a number line. For example,

The distance between 2 and 0 on a number line is 2 units. The distance between and 0 on a number line is also 2 units.

Distance is a physical measurement, which is never negative. Therefore, the absolute

value of a number is never negative.

In symbols, the absolute value of xis defined as follows.

|- 2 |= 2. - 2

| 2 |= 2,

x

By this definition, if x is a positive number or 0, then its absolute value is x itself.

For example, since 8 is a positive number,

If x is a negative number, then its absolute value is the additive inverse of x.

|- 8 |=- 1 - 82 = 8 The additive inverse of - 8 is 8.

| 8 |= 8.

Absolute Value

For any real number x,

x e

x if x» 0

x if x<0.

The additive inverse of a nonzero number is found by changing the sign of the number.

Number Additive Inverse 7 3 00 19 19

0.52 -0.52

2

(^3)
2
3

1 - 32 , or 3

7

Additive Inverse

The additive inverseof a number xis the number that is the same distance from

0 on the number line as x, but on the oppositeside of 0.

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