§ 7.5 multiplying with more than one term and rationalizing denominators

§ 7.5

Multiplying With More Than One Term and Rationalizing Denominators

Blitzer, Intermediate Algebra, 5e – Slide #2 Section 7.5

Section objectives

In this section, you will learn to:

Multiply radical expressions having more than one term

Use polynomial special products to multiply radicals

Rationalize the denominators containing one term

Rationalize the denominators containing two terms


Multiplying Radicals

EXAMPLEEXAMPLE

Multiply: . 111023(b)4763(a) 333

SOLUTIONSOLUTION

Use the distributive property.

333 4763(a) 3333 47363

Multiply the radicals.

33 12718

111023(b)

112102113103 Use FOIL.

22203330 Multiply the radicals.



22543330 Factor the third radicand using the greatest perfect square factor.

CONTINUECONTINUEDD

22543330 Factor the third radicand into two radicals.

22523330 Simplify.



EXAMPLEEXAMPLE

Multiply: .2(b)73(a)2

33 yxxx

SOLUTIONSOLUTION

Group like terms.


Use FOIL.

73(a) 33 xx

7337 3333 xxxx

2137 333 2 xxx

2137 333 2 xxx

Combine radicals.21433 2 xx




Use the special product for

22(b) yx

CONTINUECONTINUEDD

22222 yyxx .2BA

yxyx 222


Rationalizing Denominators

EXAMPLEEXAMPLE

Rationalize each denominator: .16

10(b)

5(a)

5 23

2xy

SOLUTIONSOLUTION

(a) Using the quotient rule, we can express . We

have cube roots, so we want the denominator’s radicand to be a perfect cube. Right now, the denominator’s radicand is . We know that If we multiply the numerator and the

denominator of , the denominator becomes

3 2

3

32

5 as

5

yy

2y.3 3 yy

3

3 2

3

by 5

yy

.3 333 2 yyyy



The denominator no longer contains a radical. Therefore, we

multiply by 1, choosing .1for 3

3

y

y

3 2

3

32

55

yy

CONTINUECONTINUEDD

3

3

3 2

3 5

y

y

y

3 3

3 5

y

y

Use the quotient rule and rewrite as the quotient of radicals.

Multiply the numerator and denominator by to remove the radical in the denominator.

3 y

Multiply numerators and denominators.



CONTINUECONTINUEDD

y

y3 5 Simplify.

(b) The denominator, is a fifth root. So we want the denominator’s radicand to be a perfect fifth power. Right now, the denominator’s radicand is We know that

If we multiply the numerator and the denominator

of , the denominator becomes

5 216x

.2or 16 242 xx

.225 55 xx

5 3

5 3

5 2 2

2by

16

10

x

x

x

.22222 16 5 555 35 245 35 2 xxxxxx



CONTINUECONTINUEDD The denominator’s radicand is a perfect 5th power. The

denominator no longer contains a radical. Therefore, we

multiply by 1, choosing .1for 2

25 3

5 3

x

x

5 245 2 2

10

16

10

xx Write the denominator’s radicand

as an exponential expression.

5 3

5 3

5 24 2

2

2

10

x

x

x Multiply the numerator and the

denominator by .25 3x

5 55

5 3

2

210

x

x Multiply the numerators and

denominators.



CONTINUECONTINUEDD

x

x

2

2105 3

Simplify.



EXAMPLEEXAMPLE

Rationalize each denominator: .3

3(b)

37

12(a)

xy

yx

SOLUTIONSOLUTION

(a) The conjugate of the denominator is If we multiply the numerator and the denominator by the simplified denominator will not contain a radical. Therefore, we

multiply by 1, choosing

.37

1.for 37

37

,37

37

37

37

12

37

12

Multiply by 1.



CONTINUECONTINUEDD

22

37

3712

Evaluate the exponents.

22 BABABA

37

3712

Subtract. 4

3712

Divide the numerator and denominator by 4.

4

3712

3

1

37

37

37

12

37

12

Multiply by 1.



CONTINUECONTINUEDD

Simplify. 3373or 373

(b) The conjugate of the denominator is If we multiply the numerator and the denominator by the simplified denominator will not contain a radical. Therefore, we


xy

xy

xy

yx

xy

yx

3

3

3

3

3

3

.3 xy ,3 xy

.1for 3

3

xy

xy

Multiply by 1.



CONTINUECONTINUEDD

xy

xy

xy

yx

xy

yx

3

3

3

3

3

3

Multiply by 1.

22

22

3

323

xy

yyxx

Rearrange terms in the second numerator.xy

yx

xy

yx

3

3

3

3

222 2 BABABA 22 BABABA

xy

yxyx

9

69

Simplify.


Rationalizing Numerators

EXAMPLEEXAMPLE

Rationalize the numerator:

.7

7 xx

SOLUTIONSOLUTION

The conjugate of the numerator is If we multiply the numerator and the denominator by the simplified numerator will not contain a radical. Therefore, we


.7 xx

1.for 7

7

xx

xx

Multiply by 1.

,7 xx

xx

xxxxxx

7

7

7

7

7

7


Rationalizing Numerators

Leave the denominator in factored form.

xx

xx

77

722

CONTINUECONTINUEDD 22 BABABA

xx

xx

77

7Evaluate the exponents.

xx

77

7Simplify the numerator.

xx

7

1 Simplify by dividing the numerator and denominator by 7.


In Summary…

Important to Remember:

Radical expressions that involve the sum and difference of the same two terms are called conjugates. To multiply conjugates, use

22))(( BABABA

The process of rewriting a radical expression as an equivalent expression without any radicals in the denominator is called rationalizing the denominator.

GET THOSE RADICALS OUT OF THE DENOMINATOR!!!!


In Summary…

On Rationalizing the Denominator…

If the denominator is a single radical term with nth root:See what expression you would need to multiply by to obtain a perfect nth power in the denominator. Multiply numerator and denominator by that expression.

If the denominator contains two terms:Rationalize the denominator by multiplying the numerator and the denominator bythe conjugate of the denominator.

More than two terms in the denominator and rationalizing can get very complicated. Note that you don’t have rules here for those situations. To rationalize simply means to “get the radical out”. By common agreement, we usually rationalize the denominator in a rational expression. We make the denominator “nice” sometimes at the expense of making the numerator messy, but forcomparison and other purposes that you will understand later – this choice is best.

§ 7.5 multiplying with more than one term and rationalizing denominators

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