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Problem 1
594 Chapter 9 Transformations
Similarity Transformations
9-7
Objectives To identify similarity transformations and verify properties of similarity
Your friend says that she performed a composition of transformations to map ABC to A B C . Describe the composition of transformations. A
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Lesson Vocabulary
transformationsimilar
LessonVocabularyLesson VocabularyLessonLesson LessonLesson VocabularyVocabularyVocabularyVocabularyVocabulary
a composition of transformations to map composition of transformations.
Is there more than one composition of transformations possible to map
ABC to A B C ?
In the Solve It, you used a composition of a rigid motion and a dilation to describe the mapping from ABC to A B C .
Essential Understanding You can use compositions of rigid motions and dilations to help you understand the properties of similarity.
Drawing Transformations
DEF has vertices D(2, 0), E(1, 4), and F(4, 2). What is the image of DEF when you apply the composition D1.5 Ry-axis?
Step 1 Find the vertices of Ry-axis( DEF). �en connect the vertices to draw the image.
Ry-axis (D) D ( 2, 0) Ry-axis (E) E ( 1, 4) Ry-axis (F) F ( 4, 2)
Step 2 Find the vertices of the dilation of D E F . �en connect the vertices to draw the image.
D1.5 (D ) D ( 3, 0) D1.5 (E ) E ( 1.5, 6) D1.5 (F ) F ( 6, 3)
�e vertices of the image after the composition of transformations are D ( 3, 0), E ( 1.5, 6), and F ( 6, 3).
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Content StandardsG.SRT.2 Given two figures, use the definition of similarity in terms of similarity transformations to decide if they are similar . . . Also G.SRT.3
MATHEMATICAL PRACTICES
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1 Common Core
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Problem 2
Got It?
Got It?
Lesson 9-7 595
1. Reasoning LMN has vertices L( 4, 2), M( 3, 3), and N( 1, 1). Suppose the triangle is translated 4 units right and 2 units up and then dilated by a scale factor of 0.5 with center of dilation at the origin. Sketch the resulting image of the composition of transformations.
Describing Transformations
What is a composition of rigid motions and a dilation that maps RST to PYZ?
Study the figures to determine how the image could have resulted from the preimage. Then use the vertices to verify the composition of transformations.
Study the figures to determine how the image could have resulted from the preimage. Then use the vertices to verify the composition of
A composition of transformations that maps RST to PYZ
A composition of transformations that maps to
The vertices of the preimage and image
It appears that RST was rotated and then enlarged to create PYZ. To verify the composition of transformations, begin by rotating the triangle 180 about the origin.
r(180 , O) (R) R ( 1, 1) Use the rule r(180 , O)(x, y) ( x, y).
r(180 , O) (S) S ( 1, 3)
r(180 , O) (T) T ( 3, 1)
PYZ appears to be about twice as large as RST. Scale the vertices of the intermediate image R S T to verify the composition.
D2( 1, 1) P( 2, 2) Use the rule D2(x, y) (2x, 2y).
D2( 1, 3) Y( 2, 6)
D2( 3, 1) Z( 6, 2)
�e vertices of the dilation of R S T match the vertices of PYZ.
A rotation of 180 about the origin followed by a dilation with scale factor 2 maps RST to PYZ.
2. What is a composition of rigid motions and a dilation that maps trapezoid ABCD to trapezoid MNHP?
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Problem 3
Got It?
596 Chapter 9 Transformations
Finding Similarity Transformations
Is there a similarity transformation that maps PAQ to TNO? If so, identify the similarity transformation and write a similarity statement. If not, explain.
Although PA TN, there is a scale factor k such that k PA TN. Dilate PAQ using this scale factor. �en
P A TN. Since dilations preserve angle measure, you also know that P T and A N. �erefore, P A Q TNO by ASA. �is means that there is a sequence of rigid motions that maps P A Q onto TNO.
So, there is a dilation that maps PAQ to P A Q , and a sequence of rigid motions that maps P A Q to TNO. �erefore, there is a composition of a dilation and rigid motions that maps PAQ onto TNO.
3. Is there a similarity transformation that maps JKL to RST? If so, identify the similarity
transformation and write a similarity statement. If not, explain.
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Here’s Why It Works Consider the composition of a rigid motion and a dilation shown at the right.
Because rigid motions and dilations preserve angle measure, m P m P , m Q m Q , and m R m R . So, corresponding angles are congruent.
Because there is a dilation, there is some scale factor k such that:
PQ kP Q QR kQ R PR kP R
k PQ
P Q k QR
Q R k PRP R
So, PQ
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Q RPR
P R .
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Although k
Pyou also know that �erefore, there is a sequence of rigid motions that maps
Does it matter what the center of dilation is? No. All that matters is that k PA TN.
Notice that the �gures in Problems 1 and 2 appear to have the same shape but di�erent sizes. Compositions of rigid motions and dilations map preimages to similar images. For this reason, they are called similarity transformations. Similarity transformations give you another way to think about similarity.
Key Concept Similar Figures
Two �gures are similar if and only if there is a similarity transformation that maps one �gure onto the other.
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Lesson Check
Problem 4
Got It?
Lesson 9-7 597
How can you determine whether two figures are similar if you have no information about side lengths or angle measures?Any two plane figures are similar if you can find a similarity transformation that maps one onto the other.
Similarity transformations provide a powerful general approach to similarity. In Problem 3, you used similarity transformations to verify the AA Postulate for triangle similarity. Another advantage to the transformational approach to similarity is that you can apply it �gures other than polygons.
Determining Similarity
A new company is using a computer program to design its logo. Are the two �gures used in the logo so far similar?
If you can �nd a similarity transformation between two �gures, then you know they are similar. �e smaller lightning bolt can be translated so that the tips coincide. �en it can be enlarged by some scale factor so that the two bolts overlap.
�e �gures are similar because there is a similarity transformation that maps one �gure onto the other. �e transformation is a translation followed by a dilation.
4. Are the �gures at the right similar? Explain.
Do you know HOW?Use the diagram below for Exercises 1 and 2.
1. What is a similarity transformation that maps RST to JKL?
2. What are the coordinates of (D14
r(180 , O))( RST)?
Do you UNDERSTAND? 3. Vobabulary Describe how the word dilation is
used in areas outside of mathematics. How do these applications relate the mathematical de�nition?
4. Open Ended For TUV at the right, give the vertices of a similar triangle after a similarity transformation that uses at least 1 rigid motion.
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MATHEMATICAL PRACTICES
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598 Chapter 9 Transformations
Practice and Problem-Solving Exercises
MAT has vertices M(6, 2), A(4, 5), and T(1, 2). For each of the following, sketch the image of the composition of transformations.
5. re�ection across the x-axis followed by a dilation by a scale factor of 0.5
6. rotation of 180 about the origin followed by a dilation by a scale factor of 1.5
7. translation 6 units up followed by a re�ection across the y-axis and then a dilation by a scale factor of 2
For each graph, describe the composition of transformations that maps FGH to QRS.
8. 9. 10.
For each pair of �gures, determine if there is a similarity transformation that maps one �gure onto the other. If so, identify the similarity transformation and write a similarity statement. If not, explain.
11. 12. 13.
Determine whether or not each pair of �gures below are similar. Explain your reasoning.
14. 15.
PracticeA See Problem 1.
See Problem 2.
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See Problem 3.
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See Problem 4.
MATHEMATICAL PRACTICES
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Lesson 9-7 599
16. Writing Your teacher uses geometry software program to plot ABC with vertices A(2, 1), B(6, 1), and C(6, 4). �en he used a similarity transformation to plot DEF with vertices D( 4, 2), E( 12, 2), and F( 12, 8). �e corresponding angles of the two triangles are congruent. How can the Distance Formula be used to verify that the ratios of the corresponding sides are proportional? Verify that the �gures are similar.
17. Think About a Plan Suppose that JKL is formed by connecting the midpoints of ABC. Is AJL similar to ABC? Explain.
How are the side lengths of AJL related to the side lengths of ABC ?Can you �nd a similarity transformation that maps AJL to
ABC ? Explain.
18. Writing What properties are preserved by rigid motions but not by similarity transformations?
Determine whether each statement is always, sometimes, or never true.
19. �ere is a similarity transformation between two rectangles.
20. �ere is a similarity transformation between two squares.
21. �ere is a similarity transformation between two circles.
22. �ere is a similarity transformation between a right triangle and an equilateral triangle.
23. Indirect Measurement A surveyor wants to use similar triangles to determine the distance across a lake as shown at the right.
a. Are the two triangles in the �gure similar? Justify your reasoning.
b. What is the distance d across the lake?
24. Photography A 4-inch by 6-inch rectangular photo is enlarged to �t an 8-inch by 10-inch frame. Are the two photographs similar? Explain.
25. Reasoning Is a rigid motion an example of a similarity transformation? Explain your reasoning and give an example.
26. Art A printing company enlarges a banner for a graduation party by a scale factor of 8.
a. What are the dimensions of the larger banner? b. How can the printing company be sure that the
enlarged banner is similar to the original?
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600 Chapter 9 Transformations
27. If ABC has vertices given by A(u, v), B(w, x), and C(y, z), and NOP has vertices given by N(5u, 4v), O(5w, 4x), and P(5y, 4z), is there a similarity transformation that maps ABC to NOP? Explain.
28. Overhead Projector When Mrs. Sheldon places a transparency on the screen of the overhead projector, the projector shows an enlargement of the transparency on the wall. Does this situation represent a similarity transformation? Explain.
29. Reasoning Tell whether each statement below is true or false. a. In order to show that two �gures are similar, it is su�cient to show that there is a
similarity transformation that maps one �gure to the other. b. If there is a similarity transformation that maps one �gure to another �gure, then
the �gures are similar. c. If there is a similarity transformation that maps one �gure to another �gure, then
the �gures are congruent.
ChallengeC
Mixed Review34. Which capital letters of the alphabet are rotation images of themselves?
Draw each letter and give an angle of rotation ( 360 ).
35. �ree vertices of an isosceles trapezoid are ( 2, 1), (1, 4), and (4, 4). Find all possible coordinates for the fourth vertex.
Get Ready! To prepare for Lesson 10-1, do Exercises 34–37.
Find the area of each �gure.
36. a square with 5-cm sides 37. a rectangle with base 4 in. and height 7 in.
38. a 4.6 m-by-2.5 m rectangle 39. a rectangle with length 3 ft and width 12 ft
See Lesson 9-3.
See Lesson 6-7.
See Lesson 1-8.
Standardized Test Prep
30. STU has vertices S(1, 2), T(0, 5), and U( 8, 0). What is the x-coordinate of S after a 270 rotation about the origin?
31. �e diagonals of rectangle PQRS intersect at O. PO 2x 5 and OR 7 x.
What is the length of QS?
32. �e length of the hypotenuse of a 45 -45 -90 triangle is 55 in. What is the length of one of its legs to the nearest tenth of an inch?
33. You place a sprinkler so that it is equidistant from three rose bushes at points A, B, and C. How many feet is the sprinkler from A?
SAT/ACT
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