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8.7 Dilations

8.7 Dilations. Geometry Ms. Reser. Objectives/Assignment. Identify dilations Use properties of dilations to create a real-life perspective drawing. Assignment: pp. 509-510 #4-21. Identifying Dilations.

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8.7 Dilations

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  1. 8.7 Dilations Geometry Ms. Reser

  2. Objectives/Assignment • Identify dilations • Use properties of dilations to create a real-life perspective drawing. • Assignment: pp. 509-510 #4-21

  3. Identifying Dilations • In chapter 7, you studied rigid transformations, in which the image and preimage of a figure are congruent. In this lesson, you will study a type of nonrigid transformation called a dilation, in which the image and preimage are similar.

  4. What is it? • A dilation with center C and a scale factor k is a transformation that maps every point P in the plane to a point P’ so that the following properties are true. • If P is not the center point C, then the image point P’ lies on CP. The scale factor k is a positive number such that k = and k ≠1. 2. If P is the center point C, then P = P’. CP’ CP

  5. Reduction/Enlargement • The dilation is a reduction if 0 < k < 1 and it is an enlargement if k > 1. CP’ 3 1 REDUCTION: = = CP 6 2 6

  6. CP’ 5 = ENLARGEMENT: CP 2 5 Because ∆PQR ~ ∆P’Q’R’ P’Q’ Is equal to the scale factor of the dilation. PQ

  7. Ex. 1: Identifying Dilations • Identify the dilation and find its scale factor. CP’ 2 = REDUCTION: CP 3 2 The scale factor is k = This is a reduction. 3

  8. Ex. 1B -- Enlargement • Identify the dilation and find its scale factor. CP’ 2 = 2 = ENLARGEMENT: CP 1 2 The scale factor is k = This is an enlargement. = 2 1

  9. Notes: • In a coordinate plane, dilations whose centers are the origin have the property that the image of P (x, y) is P’ (kx, ky)

  10. Ex. 2: Dilation in a coordinate plane • Draw a dilation of rectangle ABCD with A(2, 2), B(6, 2), C(6, 4), and D(2, 4). Use the origin as the center and use a scale factor of ½. How does the perimeter of the preimage compare to the perimeter of the image?

  11. SOLUTION: Because the center of the dilation is the origin, you can find the image of each vertex by multiplying is coordinates by the scale factor A(2, 2) A’(1, 1) B(6, 2) B’(3, 1) C(6, 4) C’(3, 2) D(2, 4) D’(1, 2)

  12. Solution continued • From the graph, you can see that the preimage has a perimeter of 12 and the image has a perimeter of 6. A preimage and its image after a dilation are similar figures. Therefore, the ratio of perimeters of a preimage and its image is equal to the scale factor of the dilation.

  13. Using Dilations in Real Life—p.508 • Finding Scale Factor: Shadow puppets have been used in many countries for hundreds of years. A flat figure is held between a light and a screen. The audience on the other side of the screen sees the puppet’s shadow. The shadow is a dilation, or enlargement of the shadow puppet. When looking at a cross sectional view, ∆LCP ~ ∆LSH.

  14. Shadow Puppet continued • The shadow puppet shown is 12 inches tall. (CP in the diagram). Find the height of the shadow, SH, for each distance from the screen. In each case, by what percent is the shadow larger than the puppet? • A. LC = LP = 59 in.; LS = LH = 74 in. • B. LC = LP = 66 in.; LS = LH = 74 in.

  15. Finding Scale Factor 59 12 LC CP = ENLARGEMENT: = 74 SH LS SH 59SH = 75(12) 59SH = 888 SH ≈15 INCHES To find the percent of the size increase, use the scale factor of the dilation. SH Scale factor = CP 15 1.25 = 12 • So, the shadow is 25% larger than the puppet.

  16. Finding Scale Factor Notice that as the puppet moves closer to the screen, the shadow height increase. 66 12 LC CP = ENLARGEMENT: = 74 SH LS SH 66SH = 75(12) 66SH = 888 SH ≈13.45 INCHES Use the scale factor again to find the percent of size increase. SH Scale factor = CP 13.45 1.12 = 12 • So, the shadow is 12% larger than the puppet.

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