lesson 8.3 , for use with pages 565-571
DESCRIPTION
4 x + 5. x – 1. Graph. y =. 1. 2. – . x. ANSWER. 2. Find the vertical and horizontal asymptotes of y = . ANSWER. vertical: x = 1; horizontal: y = 4. Lesson 8.3 , For use with pages 565-571. 8.4 Rationalize Expressions. x 2 – 2 x – 15. x 2 – 2 x – 15. - PowerPoint PPT PresentationTRANSCRIPT
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Lesson 8.3, For use with pages 565-571
ANSWER vertical: x = 1; horizontal: y = 4
ANSWER
2. Find the vertical and horizontal asymptotes of y = . 4x + 5
x – 1
1.2x– .Graph y =
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8.4 RATIONALIZE EXPRESSIONS
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EXAMPLE 1 Simplify a rational expression
x2 – 2x – 15x2 – 9Simplify :
x2 – 2x – 15x2 – 9
(x +3)(x –5)(x +3)(x –3)= Factor numerator and denominator.
(x +3)(x –5)(x +3)(x –3)= Divide out common factor.
Simplified form
SOLUTION
x – 5x – 3=
ANSWER x – 5x – 3
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EXAMPLE 2 Solve a multi-step problem
• Find the surface area and volume of each tin.
• Calculate the ratio of surface area to volume for each tin.
• What do the ratios tell you about the efficiencies of the two tins?
A company makes a tin to hold flavored popcorn. The tin is a rectangular prism with a square base. The company is designing a new tin with the same base and twice the height of the old tin.
Packaging
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s + 4h= sh Simplified form
EXAMPLE 2 Solve a multi-step problem
SOLUTION
Old tin New tin
STEP 1 S = 2s2 + 4sh S = 2s2 + 4s(2h) Find surface area, S.= 2s2 + 8sh
V = s2h V = s2(2h) Find volume, V.= 2s2h
STEP 2 SV
2s2 + 4sh=s2h
SV
2s2 + 8sh= 2s2hWrite ratio of S to V.
s(22 + 4h)= s(sh)2s(s + 4h)= 2s(sh) Divide out common factor.
2s + 4h=sh
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EXAMPLE 2 Solve a multi-step problem
STEP 3 2s + 4hsh
> s + 4hsh
Because the left side of the inequality has a greater numerator than the right side and both have the same (positive) denominator. The ratio of surface area to volume is greater for the old tin than for the new tin. So, the old tin is less efficient than the new tin.
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GUIDED PRACTICE for Examples 1 and 2
Simplify the expression, if possible.
2(x + 1)(x + 1)(x + 3)
1.
Divide out common factor.
= x + 32
Simplified form
(x +1)(x + 3)2(x +1)
=2(x + 1)
(x + 1)(x + 3)
SOLUTION
ANSWER x + 32
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GUIDED PRACTICE for Examples 1 and 2
40x + 2010x + 30
2.
Factor numerator and denominator.
Divide out common factor.
Simplified form
20(2x +1)10(x + 3)=
40x + 2010x + 30
= 20(2x +1)10(x + 3)
= 2(2x +1)x + 3
SOLUTION
2(2x +1)x + 3
ANSWER
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GUIDED PRACTICE for Examples 1 and 2
x(x + 2)43.
x(x + 2)4
Simplified form
SOLUTION
x(x + 2)4ANSWER
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GUIDED PRACTICE for Examples 1 and 2
x + 4x 2 –16
4.
(x + 4)(x – 4)x + 4x 2 –16
(x + 4)= Factor numerator and denominator.
Divide out common factor.
Simplified form
(x + 4)(x + 4)(x – 4)=
1x – 4=
ANSWER 1x – 4
SOLUTION
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GUIDED PRACTICE for Examples 1 and 2
x2 – 2x – 3x2 – x – 6
5.
(x – 3)(x + 1)(x – 3)(x + 2)
x2 – 2x – 3x2 – x – 6 = Factor numerator and denominator.
Divide out common factor.
x + 1x + 2= Simplified form
= (x – 3)(x + 1)(x – 3)(x + 2)
SOLUTION
x + 1x + 2ANSWER
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GUIDED PRACTICE for Examples 1 and 2
2x2 + 10x3x2 + 16x + 5
6.
2x2 + 10x3x2 + 16x + 5 (3x + 1)(x + 5)
2x(x + 5)= Factor numerator and denominator.
Divide out common factor.
2x3x + 1= Simplified form
(3x + 1)(x + 5)2x(x + 5)=
ANSWER 2x3x + 1
SOLUTION
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GUIDED PRACTICE for Examples 1 and 2
7. What If? In Example 2, suppose the new popcorn tin is the same height as the old tin but has a base with sides twice as long. What is the ratio of surface area to volume for this tin?
SOLUTION
Old tin New tin
STEP 1 S = 2s2 + 4sh S = 2 (2s)2 + 4(2s)h Find surface area, S.= 8s2 + 8sh
V = s2h V = (2s)2h Find volume, V.= 4s2h
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GUIDED PRACTICE for Examples 1 and 2
STEP 2 SV
2s2 + 4sh=s2h
SV
8s2 + 8sh= 2s2hWrite ratio of S to V.
s(2s + 4h)= s(sh)4s(2s + 2h)= 4s(sh) Divide out common factor.
= 2s + 4h=sh
2s + 4h== sh Simplified form
2s + 4h=shANSWER
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EXAMPLE 3 Standardized Test Practice
SOLUTION
8x 3y2x y2
7x4y3
4y56x7y4
8xy3= Multiply numerators and denominators.
8 7 x x6 y3 y8 x y3
= Factor and divide out common factors.
7x6y= Simplified form
The correct answer is B.ANSWER
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EXAMPLE 4 Multiply rational expressions
Multiply: x2 + x – 203x
3x –3x2
x2 + 4x – 5
x2 + x – 203x
3x –3x2
x2 + 4x – 53x(1– x)
(x –1)(x +5)= (x + 5)(x – 4)3x
Factor numerators and denominators.
3x(1– x)(x + 5)(x – 4)= (x –1)(x + 5)(3x)Multiply numerators and denominators.
3x(–1)(x – 1)(x + 5)(x – 4)= (x – 1)(x + 5)(3x)Rewrite 1– x as (– 1)(x – 1).
3x(–1)(x – 1)(x + 5)(x – 4)= (x – 1)(x + 5)(3x)Divide out common factors.
SOLUTION
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EXAMPLE 4 Multiply rational expressions
= (–1)(x – 4) Simplify.
= –x + 4 Multiply.
ANSWER –x + 4
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EXAMPLE 5 Multiply a rational expression by a polynomial
Multiply: x + 2x3 – 27
(x2 + 3x + 9)
x + 2x3 – 27
(x2 + 3x + 9)
Write polynomial as a rational expression.
= x + 2x3 – 27
x2 + 3x + 91
(x + 2)(x2 + 3x + 9)(x – 3)(x2 + 3x + 9)= Factor denominator.
(x + 2)(x2 + 3x + 9)(x – 3)(x2 + 3x + 9)= Divide out common factors.
= x + 2x – 3
Simplified form
SOLUTION
ANSWERx + 2x – 3
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GUIDED PRACTICE for Examples 3, 4 and 5
Multiply the expressions. Simplify the result.
3x5 y2
8xy6xy2
9x3y8.
3x5 y2
2xy6xy2
9x3y18x6y4
72x4y2= Multiply numerators and denominators.
Factor and divide out common factors.
Simplified form
18 x4 y2 x2 y2
18 4 x4 y2 =
=x2y2
4
SOLUTION
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GUIDED PRACTICE for Examples 3, 4 and 5
9.
x + 32x2
2x2 – 10xx2– 25
Factor numerators and denominators.
2x(x –5) (x + 3)= (x –5)(x + 5)2x (x)Multiply numerators and denominators.
x + 3=x(x + 5)
Divide out common factors.
x + 32x2
2x2 – 10xx2– 25
2x(x –5)(x –5)(x +5)= x + 3
2x (x)
= 2x(x –5) (x + 3)(x –5)(x + 5)2x (x)
Simplified form
SOLUTION
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GUIDED PRACTICE for Examples 3, 4 and 5
10.
Factor denominators.
Multiply numerators and denominators.
x + 5=x – 1
Divide out common factors.
x2 +x + 1x + 5x3– 1
Simplified form
x2 +x + 1x + 5x3– 1
= x2 +x + 1x + 5(x – 1) (x2 +x + 1) 1
= (x + 5) (x2 +x + 1)(x – 1) (x2 +x + 1)
(x + 5) (x2 +x + 1)(x – 1) (x2 +x + 1)=
SOLUTION
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EXAMPLE 6 Divide rational expressions
Divide : 7x2x – 10
x2 – 6xx2 – 11x + 30
7x2x – 10
x2 – 6xx2 – 11x + 30
7x2x – 10 x2 – 6x
x2 – 11x + 30= Multiply by reciprocal.
7x2(x – 5)=
(x – 5)(x – 6)x(x – 6)
=7x(x – 5)(x – 6)
2(x – 5)(x)(x – 6) Divide out common factors.
Factor.
72= Simplified form
SOLUTION
ANSWER 72
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EXAMPLE 7 Divide a rational expression by a polynomial
Divide : 6x2 + x – 154x2 (3x2 + 5x)
6x2 + x – 154x2 (3x2 + 5x)
6x2 + x – 154x2 3x2 + 5x= 1 Multiply by reciprocal.
(3x + 5)(2x – 3)4x2
= x(3x + 5)1 Factor.
Divide out common factors.
Simplified form2x – 34x3=
(3x + 5)(2x – 3)= 4x2(x)(3x + 5)
SOLUTION
ANSWER 2x – 34x3
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GUIDED PRACTICE for Examples 6 and 7
Divide the expressions. Simplify the result.
4x5x – 20
x2 – 2xx2 – 6x + 8
11.
4x5x – 20
x2 – 2xx2 – 6x + 8
Multiply by reciprocal.
Divide out common factors.
Factor.
Simplified form
4x5x – 20 x2 – 2x
x2 – 6x + 8=
4(x)(x – 4)(x – 2)5(x – 4)(x)(x – 2)=
4(x)(x – 4)(x – 2)5(x – 4)(x)(x – 2)=
45=
SOLUTION
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GUIDED PRACTICE for Examples 6 and 7
2x2 + 3x – 56x
(2x2 + 5x)12.
2x2 + 3x – 56x
(2x2 + 5x)
Multiply by reciprocal.
Divide out common factors.
Factor.
Simplified form
= 2x2 + 3x – 56x (2x2 + 5x)
1
(2x + 5)(x – 1)6x(x)(2 x + 5)=
(2x + 5)(x – 1)6x(x)(2 x + 5)=
x – 16x2=
SOLUTION