Basic Mathematics for College Students

694 Chapter 8 An Introduction to Algebra

Identify the base and the exponent in each expression. See Example 1.

Write each expression in an equivalent form using an exponent. See Example 2.

m m m m m

r r r r r r

a a b b b

m m m n n

Use the product rule for exponents to simplify each expression. Write the results using exponents.See Example 3.

(c^5 )(c^8 ) 40. (d^4 )(d^20 )

x^2 y x y^10 46. x^3 y x y^12

m^100 m^100 48. n^600 n^600

cd^4 cd ab^3 ab^4

(a^2 b^3 )(a^3 b^3 ) (u^3 v^5 )(u^4 v^5 )

bb^2 b^3 aa^3 a^5

a^3 a^3 m^7 m^7

53 54 34 36

5 uuu

4 ttttt

5 u( 5 u)( 5 u)( 5 u)( 5 u)

4 t 4 t 4 t 4 t

(y9)^4 (z2)^3

9 m^12 3.14r^4

x^4

1

3

y^6

( 3 x)^2 (2xy)^10

a

5

x b

3 x^5

43 (8)^2

GUIDED PRACTICE

SECTION 8.6 STUDY SET

Fill in the blank.

Expressions such as , and are called
expressions.

Match each expression with the proper description.

a. Product of exponential expressions with the same base b. Power of an exponential expression c. Power of a product

Fill in the blanks.

a.
b.

a. b.
c. d.

To simplify each expression, determine whether you
add, subtract, multiply, or divide the exponents.
a.
b.
c.

To simplify , what factors within the
parentheses must be raised to the fourth
power?

Simplify each expression, if possible.

a. b.

Complete each solution to simplify each expression. 11.

(x^4 )^3 (x^2 )^3
x^12 x^6
x

x

(x^4 x^2 )^3 ( )^3

NOTATION

42 24 x^3 y^2

x^3 x^2 x^3 x^2

x^2 x x^2 x

x^2 x^2 x^2 x^2

(2y^3 z^2 )^4

(a^4 b^2 )^5

(n^8 )^4

b^6 b^9

(xy)n (ab)c

xx xmxn

( 5 y)( 5 y)( 5 y)

(3x)^4

CONCEPTS

(a^4 b^2 )^5 (a^8 )^4 a^5 a^3

x^4 , 10^3 (5t)^2

VOCABULARY

Basic Mathematics for College Students

53 54 34 36

1

3

5

43 (8)^2

GUIDED PRACTICE

NOTATION

CONCEPTS

VOCABULARY

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