Warm Up 1. If ∆QRS  ∆ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion. 2. 3. Q  Z; R 

Slides:

Advertisements

Similar presentations

Ratios in Similar Polygons

Advertisements

Similar and Congruent Figures Lesson 9-7. Figures that have the same size and shape are congruent figures These triangles have the same size and shape.

Ratios in Similar Polygons

Warm Up 1. If ∆ QRS  ∆ ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion x = 9x = 18 Q  Z;

Happy Monday 1.Pick up notes from the front table. 2.Take out your HW #1 and 7.1 notes. Tonight’s Homework P 465 # 1-6, 11, Start your Project (due.

Warm Up Lesson Presentation Lesson Quiz Holt Geometry.

Using Proportions to Solve Geometry Problems Section 6.3.

Ratios in Similar Polygons

7-1 Ratio and Proportion Warm Up Lesson Presentation Lesson Quiz

Objectives Identify similar polygons.

WARM-UP x = 18 t = 3, -7 u = ±7.

7.1 & 7.2 1/30/13. Bell Work 1. If ∆ QRS  ∆ ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion

/1/13 This PowerPoint will assist you with the packet.

CN #4 Ratios in Similar Polygons

Welcome to Math 6 Today’s subject is: Proportions and Similar Figures

Similar Polygons 8.2.

Chapter ratios in similar polygons. Objectives Identify similar polygons. Apply properties of similar polygons to solve problems.

Warm Up 1. If ∆QRS  ∆ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion Q  Z; R 

Solve the following proportions. a = 9 b = 7 c = 6 d = 6.

WARM UP: Write the ratio of the first measurement to the second measurement. Length of car: 14 ft. 10 in, Length of model car: 8 in. There are 238 juniors.

Geometry 6.3 Big Idea: Use Similar Polygons

7.2 Similar Polygons. Similar Polygons In geometry, two figures that have the same shape are called similar. Two polygons are similar polygons if corresponding.

Write and simplify ratios. Use proportions to solve problems. Objectives.

S IMILAR P OLYGONS. Warm Up 1. If ∆ QRS  ∆ ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion

Ratios in Similar Polygons

Warm-Up If ∆QRS  ∆ZYX, identify all 3 pairs of congruent angles and all 3 pairs of congruent sides.

Ratios in Similar Polygons

1. If ∆ QRS  ∆ ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion x = 9x = 18 Q  Z; R  Y;

Chapter 8 Lesson 2 Objective: To identify similar polygons.

Geometry Lesson 7 – 2 Similar Polygons Objective: Use proportions to identify similar polygons. Solve problems using the properties of similar polygons.

Similarity. Warm Up 1. If ∆ QRS  ∆ ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion x = 9x.

TODAY IN GEOMETRY…  WARM UP: SRF and Rationalizing the Denominator  Learning Target: 6.3 Use properties of similar polygons to solve proportions.  Independent.

Sec. 6–2 Similar Polygons. Figures that are similar (~) have the same shape but not necessarily the same size. Angles are congruent, Sides are proportional.

6.2 Similar Polygons What you’ll learn: To identify similar figures.

Holt McDougal Geometry 7-1 Ratios in Similar Polygons Warm Up 1. If ∆ QRS  ∆ ZYX, identify the pairs of congruent angles and the pairs of congruent sides.

Success Criteria:  Create proportion  Solve proportions Today’s Agenda Do now Check HW Lesson Check calendar for assignment Do Now: Chapter 7.2 Similar.

Holt McDougal Geometry 7-1 Ratios in Similar Polygons 7-1 Ratios in Similar Polygons Holt Geometry Warm Up Warm Up Lesson Presentation Lesson Presentation.

Ratios in similar polygons

Objectives Identify similar polygons.

Ratios in Similar Polygons

Vocabulary similar similar polygons similarity ratio.

Ratios in Similar Polygons

2-1: Properties of Similar Polygons

G-11 Similar Triangles I can demonstrate the equality of corresponding angles and proportionality of sides using similarity and similarity transformations.

Similar figures are figures that have the same shape but not necessarily the same size. The symbol ~ means “is similar to.” 1.

Class Greeting.

Chapter 2 Similarity and Dilations

Vocabulary 8.1 ratio proportion cross products similar

Warm Up #24 1. If ∆QRS  ∆ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion Q  Z; R.

Ratios in Similar Polygons

Ratios in Similar Polygons p. 244 in your book

Vocabulary 8.1 ratio proportion cross products similar

Ratios in Similar Polygons

Ratios in Similar Polygons

Ratios in Similar Polygons

Ratios in Similar Polygons

Objectives Identify similar polygons.

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Ratios in Similar Polygons

Bellwork: Solve the proportion. x = 18.

Ratios in Similar Polygons

Ratios in Similar Polygons

Ratios in Similar Polygons

Ratios in Similar Polygons

Warm Up 1. If ∆QRS  ∆ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion Q  Z; R 

Ratios in Similar Polygons

LEARNING GOALS – LESSON 7:2

Objectives Identify similar polygons.

Ratios in Similar Polygons

Warm Up 1. If ∆QRS  ∆ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion Q  Z; R 

Presentation transcript:

Warm Up 1. If ∆QRS  ∆ZYX, identify the pairs of congruent angles and the pairs of congruent sides. Solve each proportion. 2. 3. Q  Z; R  Y; S  X; QR  ZY; RS  YX; QS  ZX x = 9 x = 18

Objectives Identify similar polygons. Apply properties of similar polygons to solve problems.

Figures that are similar (~) have the same shape but not necessarily the same size.

Two polygons are similar polygons if and only if their corresponding angles are congruent and their corresponding side lengths are proportional.

Example 1: Describing Similar Polygons Identify the pairs of congruent angles and corresponding sides. 0.5 N  Q and P  R. By the Third Angles Theorem, M  T.

Check It Out! Example 1 Identify the pairs of congruent angles and corresponding sides. B  G and C  H. By the Third Angles Theorem, A  J.

A similarity ratio is the ratio of the lengths of the corresponding sides of two similar polygons. The similarity ratio of ∆ABC to ∆DEF is , or . The similarity ratio of ∆DEF to ∆ABC is , or 2.

Example 2A: Identifying Similar Polygons Determine whether the polygons are similar. If so, write the similarity ratio and a similarity statement. rectangles ABCD and EFGH

Example 2A Continued Step 1 Identify pairs of congruent angles. A  E, B  F, C  G, and D  H. All s of a rect. are rt. s and are . Step 2 Compare corresponding sides. Thus the similarity ratio is , and rect. ABCD ~ rect. EFGH.

Example 2B: Identifying Similar Polygons Determine whether the polygons are similar. If so, write the similarity ratio and a similarity statement. ∆ABCD and ∆EFGH

Example 2B Continued Step 1 Identify pairs of congruent angles. P  R and S  W isos. ∆ Step 2 Compare corresponding angles. mW = mS = 62° mT = 180° – 2(62°) = 56° Since no pairs of angles are congruent, the triangles are not similar.

Check It Out! Example 2 Determine if ∆JLM ~ ∆NPS. If so, write the similarity ratio and a similarity statement. Step 1 Identify pairs of congruent angles. N  M, L  P, S  J

Check It Out! Example 2 Continued Step 2 Compare corresponding sides. Thus the similarity ratio is , and ∆LMJ ~ ∆PNS.

Lesson Quiz: Part I 1. Determine whether the polygons are similar. If so, write the similarity ratio and a similarity statement. 2. The ratio of a model sailboat’s dimensions to the actual boat’s dimensions is . If the length of the model is 10 inches, what is the length of the actual sailboat in feet? no 25 ft

Lesson Quiz: Part II 3. Tell whether the following statement is sometimes, always, or never true. Two equilateral triangles are similar. Always

Homework Worksheet 7.2