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Friday August 9 th 2013

Friday August 9 th 2013. Holt Geometry. Unit 1; Module 8-2 Similarity & Transformations p. 252 in your book. Holt McDougal Geometry. Module 8.1 Review (Similarity)…. Determine if ∆ JLM ~ ∆ NPS . If so, write the similarity ratio and a similarity statement. Today’s Objectives.

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Friday August 9 th 2013

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  1. Friday August 9th 2013 Holt Geometry Unit 1; Module 8-2 Similarity & Transformations p. 252 in your book Holt McDougal Geometry

  2. Module 8.1 Review (Similarity)… Determine if ∆JLM ~∆NPS. If so, write the similarity ratio and a similarity statement.

  3. Today’s Objectives Draw and describe similarity transformations in the coordinate plane. Use properties of similarity transformations to determine whether polygons are similar and to prove circles similar.

  4. Warm Up (Review from Alg I CC) Find the image point when the indicated transformation is applied to the given pre-image point. 1. (x, y) → (x + 3, y – 1); (2, 4) (5, 3) 2. (x, y) → (x, –y); (–2, 1) (-2, -1) 3. (x, y) → (3x, 3y); (–5, 0) (-15, 0)

  5. Vocabulary • DILATION • - A transformation that maps (x, y) to (kx, ky) where k > 0 • SCALE FACTOR (k) • If 0 < k < 1, the dilation is a reduction • If k > 1, the dilation is an enlargement

  6. Dilation Review A’ = _______ B’ = _______ C’ = _______

  7. Example 1: Drawing and Describing Dilations A. Apply the dilation D to the polygon with the given vertices. Describe the dilation. D: (x, y) → (3x, 3y)A(1, 1), B(3, 1), C(3, 2) A’ = _______ B’ = _______ C’ = _______ dilation with center (0, 0) and scale factor 3

  8. A transformation that produces similar figures is a similarity transformation. A similarity transformationis a dilation or a composite of one or more dilations and one or more congruence transformations. Two figures are similar if and only if there is a similarity transformation that maps one figure to the other figure.

  9. Remember! Translations, reflections, and rotations are congruence transformations.

  10. Ex 2 : Determining Whether Polygons are Similar Determine whether the polygons with the given vertices are similar. A. A(–6, 3), B(-6, -6), C(3, 3), D(3, -6) and H(-2, -2), J(-2, 1), K(1, 1), L(1, -2) Yes; ABCD maps to HJKL by a dilation: (x, y) → 1 1 x y , 3 3

  11. Ex 2: Continued B. P(2, 0), Q(2, 4), R(4, 4), S(4, 0) and W(5, 0), X(5, 10), Y(8, 10), Z(8, 0). No; (x, y) → (2.5x, 2.5y) maps P to W, but not S to Z.

  12. Are A’B’C’ and DFE similar? C. A(1, 2), B(2, 2), C(1, 4) and D(4, -6), E(6, -6), F(4, -2) A’ = _______ B’ = _______ C’ = _______ Yes; ABC maps to A’B’C’ by a translation: (x, y) → (x + 1, y - 5). Then A’B’C’ maps to DEF by a dilation: (x, y) → (2x, 2y).

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