R.5 day2 Multiplying and Dividing Rational Expressions.ppt
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Aug 04, 2024
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R.5 day2 Multiply and Divide
Rational Expressions
Learning Target: You will be able to multiply and divide rational
expressions, and simplify the product or quotient.
Rational Expressions
Learning Target: You will be able to multiply and divide rational
expressions, and simplify the product or quotient.
Multiply rational expressions.
•The product of two fractions is found by multiplying the
numerators and multiplying the denominators. Rational
expressions are multiplied in the same way.
•The product of the rational expressions and is
•That is, to multiply rational expressions, multiply the
numerators and multiply the denominators.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Slide 7.2 - 3
P
Q
R
S
P R PR
Q S QS
•The product of two fractions is found by multiplying the
numerators and multiplying the denominators. Rational
expressions are multiplied in the same way.
•The product of the rational expressions and is
•That is, to multiply rational expressions, multiply the
numerators and multiply the denominators.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Slide 7.2 - 3
P
Q
R
S
P R PR
Q S QS
EXAMPLE 1
•Multiply. Write each answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Solution:
Multiplying Rational
Expressions
Slide 7.2 - 4
2 5
7 10
2
2
8 9
3
p q
pq
2 5
7 10
2
2
8 9
3
p q
p q
7
2 5
2 5
1
7
38
3
3p qp
p qq
24p
q
It is also possible to divide out common factors in the numerator
and denominator before multiplying the rational expressions.
•Multiply. Write each answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Solution:
Multiplying Rational
Expressions
Slide 7.2 - 4
2 5
7 10
2
2
8 9
3
p q
pq
2 5
7 10
2
2
8 9
3
p q
p q
7
2 5
2 5
1
7
38
3
3p qp
p qq
24p
q
It is also possible to divide out common factors in the numerator
and denominator before multiplying the rational expressions.
Multiply the fractions
Reduce before multiply.
1
6x
2
y
8x
21y
3
7y
2
16x
3
222x7yy
73yyy2222xxx
Reduce before multiply.
1
6x
2
y
8x
21y
3
7y
2
16x
3
222x7yy
73yyy2222xxx
Multiply the fractions
Reduce before multiply.
2ac
3
3b
2
5a
4
c
12b
24bc
2
15a
3
b
2
5aaaac2223bcc
232b35aaabb
Reduce before multiply.
2ac
3
3b
2
5a
4
c
12b
24bc
2
15a
3
b
2
5aaaac2223bcc
232b35aaabb
Example 2
Multiply rational expressions
Step 1: Factor and Multiply
2x
2
4x
x
2
4x12
x
2
9x18
2x
2x(x2)(x3)(x6)
(x2)(x6)2x
x3
Multiply rational expressions
Step 1: Factor and Multiply
2x
2
4x
x
2
4x12
x
2
9x18
2x
2x(x2)(x3)(x6)
(x2)(x6)2x
x3
Checkpoint
Multiply the expression
6x² + 18x x² - x – 2
x² + x – 6 * x² - 7x – 8
6x(x + 3)(x-2)(x+1)
(x+3)(x-2)(x-8)(x+1)
6x
x-8
Multiply the expression
6x² + 18x x² - x – 2
x² + x – 6 * x² - 7x – 8
6x(x + 3)(x-2)(x+1)
(x+3)(x-2)(x-8)(x+1)
6x
x-8
More Examples
•Multiply the expressions. Simplify the result.
3x
5
y
2
8xy
6xy
2
9x
3
y
2x
2
10x
x
2
25
x3
2x
2
x
2
y
2
4
x3
x
2
5x
•Multiply the expressions. Simplify the result.
3x
5
y
2
8xy
6xy
2
9x
3
y
2x
2
10x
x
2
25
x3
2x
2
x
2
y
2
4
x3
x
2
5x
Divide rational expressions.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Division of rational expressions is defined as follows.
If and are any two rational expressions with
then
That is, to divide one rational expression by another rational
expression, multiply the first rational expression by the reciprocal
of the second rational expression.
Slide 7.2 - 12
.
P R P S PS
Q S Q R QR
,0
R
S
R
S
P
Q
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Division of rational expressions is defined as follows.
If and are any two rational expressions with
then
That is, to divide one rational expression by another rational
expression, multiply the first rational expression by the reciprocal
of the second rational expression.
Slide 7.2 - 12
.
P R P S PS
Q S Q R QR
,0
R
S
R
S
P
Q
EXAMPLE 4
•Divide. Write each answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Solution:
4
3 44
5
3 16
4 5
12
5
3
2
3
3
p p
ppp
3 5
4 16
2
3
3 4
3 4
9
6
p p
p p
Dividing Rational Expressions
Slide 7.2 - 13
2 3
9 6
3 4 3 4
p p
p p
3
2p
•Divide. Write each answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Solution:
4
3 44
5
3 16
4 5
12
5
3
2
3
3
p p
ppp
3 5
4 16
2
3
3 4
3 4
9
6
p p
p p
Dividing Rational Expressions
Slide 7.2 - 13
2 3
9 6
3 4 3 4
p p
p p
3
2p
EXAMPLE 5
•Divide. Write the answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Solution:
2 2
5 10
2 8
a b ab
Dividing Rational Expressions
Slide 7.2 - 14
2
2
5 8
2 10
a b
ab
5 2 2
2 2 5
2a b
a
a
bb
2a
b
•Divide. Write the answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Solution:
2 2
5 10
2 8
a b ab
Dividing Rational Expressions
Slide 7.2 - 14
2
2
5 8
2 10
a b
ab
5 2 2
2 2 5
2a b
a
a
bb
2a
b
EXAMPLE 6
•Divide. Write the answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Dividing Rational Expressions
Slide 7.2 - 15
2
2
4 3 3
2 1 4 1
x x x x
x x
2
2
4 4
1
3
2 3
1xx x
x x x
2 1
1
4 2
2
1
1
x x
xx
x
x
4 2 1x
x
Solution:
•Divide. Write the answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
Dividing Rational Expressions
Slide 7.2 - 15
2
2
4 3 3
2 1 4 1
x x x x
x x
2
2
4 4
1
3
2 3
1xx x
x x x
2 1
1
4 2
2
1
1
x x
xx
x
x
4 2 1x
x
Solution:
EXAMPLE 7
•Divide. Write in the answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
2
2 2
1 2 1
ab a a b
a a a
Dividing Rational Expressions
(Factors Are Opposites)
Slide 7.2 - 16
Solution:
1 1
1
1
1
a aa b a
a ba a
2 2
2
2 1
1
ab a a a
a a b
1
1
a a
a
Remember to write −1 when dividing out factors that are opposite of
each other. It may be written in the numerator or denominator, but not
both.
•Divide. Write in the answer in lowest terms.
Copyright © 2008 Pearson Education, Inc. Publishing as
Pearson Addison-Wesley
2
2 2
1 2 1
ab a a b
a a a
Dividing Rational Expressions
(Factors Are Opposites)
Slide 7.2 - 16
Solution:
1 1
1
1
1
a aa b a
a ba a
2 2
2
2 1
1
ab a a a
a a b
1
1
a a
a
Remember to write −1 when dividing out factors that are opposite of
each other. It may be written in the numerator or denominator, but not
both.
Divide the Rational Expressions
You can only Reduce when Multiplying
4dx
10px
2
3c
2
d
5px
6c
2
d
2
25pxx23ccdd
3ccd5px
10px
2
3c
2
d
6c
2
d
2
5px
You can only Reduce when Multiplying
4dx
10px
2
3c
2
d
5px
6c
2
d
2
25pxx23ccdd
3ccd5px
10px
2
3c
2
d
6c
2
d
2
5px
Example 4
Divide rational expressions
3
x7
8x
2
8x
x
2
6x7
3
8x
Step 1: Multiply by reciprocal
Step 2: Factor and Multiply
Step 3: Simplify
Divide rational expressions
3
x7
8x
2
8x
x
2
6x7
3
8x
Step 1: Multiply by reciprocal
Step 2: Factor and Multiply
Step 3: Simplify
More Examples
•Divide each expression. Simplify the result.
4x
5x20
x
2
2x
x
2
6x8
2x
2
3x5
6x
2x
2
5x
4
5
(x1)(2x5)
6x
1
x(2x5)
x1
6x
2
•Divide each expression. Simplify the result.
4x
5x20
x
2
2x
x
2
6x8
2x
2
3x5
6x
2x
2
5x
4
5
(x1)(2x5)
6x
1
x(2x5)
x1
6x
2
Homework
•R.5 (pg 53) #33-49 odd
•R.5 (pg 53) #33-49 odd
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