Beginning Algebra, 11th Edition

64 CHAPTER 1 The Real Number System

The distributive propertysays that multiplying a number aby a sum of num-

bers gives the same result as multiplying aby band aby cand then adding the

two products.

b+ c

Distributive Property

a 1 bc 2 abac and 1 bc 2 abaca

NOW TRY
EXERCISE 8
Simplify.

• 
  

1

3

x+ 7 +

1

3

x

NOW TRY ANSWER

8. 7

Using Properties to Simplify an Expression

Simplify.

Order of operations

Commutative property

Associative property

Inverse property

= 10 Identity property NOW TRY

= 10 + 0

= 10 + 31 - 2 x 2 + 2 x 4

= 310 + 1 - 2 x 24 + 2 x

= 1 - 2 x+ 102 + 2 x

- 2 x+ 10 + 2 x

EXAMPLE 8

For anyvalue of

and 2xare

additive inverses.

x, - 2 x

NOTEThe steps of Example 8may be skipped when we actually do the simplification.

OBJECTIVE 5 Use the distributive property.The word distributemeans “to

give out from one to several.” Look at the value of the following expressions:

, which equals or 26

, which equals or 26.

Since both expressions equal 26,

This result is an example of the distributive property of multiplication with respect to ad-

dition,the only property involving bothaddition and multiplication. With this property,

a product can be changed to a sum or difference. This idea is illustrated in FIGURE 18.

215 + 82 = 2152 + 2182.

2152 + 2182 10 + 16,

215 + 82 21132 ,

The area of the left part is 2(5) = 10.

The area of the right part is 2(8) = 16.

The total area is 2(5 + 8) = 2(13) = 26,

or the total area is 2(5) + 2(8) = 10 + 16 = 26.

Thus, 2(5 + 8) = 2(5) + 2(8).

2

5 8

2

FIGURE 18

As the arrows show, the aoutside the parentheses is “distributed” over the band cin-

side. The distributive property is also valid for multiplication over subtraction.

and

The distributive property can be extended to more than two numbers.

The distributive property can also be used “in reverse.”

acbc 1 ab 2 c

a 1 bcd 2 abacad

a 1 bc 2 abac 1 bc 2 abaca

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