Lesson 9-5: Similar Solids

Slides:

Advertisements

Similar presentations

Scale Factor MA.7.4.2By:. What is Scale Factor? Scale factor is the ratio between the lengths of corresponding sides of two similar figures. Scale factor.

Advertisements

Lesson 9-5: Similar Solids

Congruence and Similarity

Surface Area and Volume of Similar Figures

Chapter Similar Solids Two Solids with equal ratios of corresponding linear measurements Ratios Not Equal Not Similar Ratios equal Solids are.

Proportions with Perimeter, Area, and Volume

12.7 Similar Solids. Vocabulary  Similar Solids- Two solids with equal ratios of corresponding linear measures, such as height or radii are called similar.

GEOMETRIC SOLIDS 1 Similar Solids. SIMILAR SOLIDS 2 Definition: Two solids of the same type with equal ratios of corresponding linear measures (such as.

Surface Area and Volume

Comparing Ratios of Perimeters and Areas Of Similar Figures.

Warm-Up Exercises 1. Right rectangular prism, side lengths 8 in., 5 in., and 10 in. 2. Right cone, radius 3 m, height 4 m ANSWER 340 in. 2 ; 400 in. 3.

Warm Up A shape has 5 faces, and 5 vertices how many edges does the shape have? A sphere has a radius of 7.5, what is its surface area and volume? What.

Lesson 11-7 Similar Solids. Two solids of the same type with equal ratios of corresponding linear measures are called similar solids.

12-7 Similar Solids Holt Geometry Warm Up Warm Up Lesson Presentation Lesson Presentation Lesson Quiz Lesson Quiz.

Lesson 9-5: Similar Solids

Section 12.7 Explore Similar Solids. Homework none.

GEOMETRY HELP Are the two solids similar? If so, give the similarity ratio. Both solid figures have the same shape. Check that the ratios of the corresponding.

Lesson 9-1: Area of 2-D Shapes 1 Part 1 Area of 2-D Shapes.

EXAMPLE 1 Identify similar solids Tell whether the given right rectangular prism is similar to the right rectangular prism shown at the right. a. b.

Similar Solids Lesson Draw and label two circles that are similar. Identify their scale factor. 2. Draw two rectangles that are similar. Identify.

8-10 Scaling Three-Dimensional Figures Course 3 Warm Up Warm Up Problem of the Day Problem of the Day Lesson Presentation Lesson Presentation.

10-8 Areas and Volumes of Similar Solids

LESSON 8.4 SURFACE AREAS AND VOLUME OF SIMILAR SOLIDS Advanced Two Chapter 8 Volume and Similar Solids.

By: David Samkutty and Viet Tran Blah ™. Objectives Identify Congruent or Similar Solids State the properties of similar solids.

Unit 6 Part 1 Using Proportions, Similar Polygons, and Ratios.

Surface Area and Volume of Similar Figures Section 12.7.

Areas & Volumes of Similar Solids Objective: 1) To find relationships between the ratios of the areas & volumes of similar solids.

Similar Ratios Are the following similar and if so what is their ratio? / 6 1 / 2 2 / 4 1 / 2 3 / 6 1 / 2 Yes, 1:2.

Warm-Up #1 11/30 1. Write down these 3 formulas:

Remember these!? Surface Area of a Prism = ph +2B

12.7 Exploring Similar Solids Hubarth Geometry. Two solids of the same type with equal ratios of corresponding linear measures, such as height or radii,

Dilations Advanced Geometry Similarity Lesson 1A.

Similar Solids definition Similar Solids Two solids in which their corresponding linear measures form equal ratios

Ms. Drake 7th grade Math Fractions Lesson 44 Similar Figures and Proportions.

 Two polygons are similar polygons if corresponding angles are congruent and if the lengths of corresponding sides are proportional.

11.5 Volumes of Prisms and Cylinders OBJ: SWBAT find volumes of prisms and cylinders, use the formula for density, and use volumes of prisms and cylinders.

G.14 The student will use similar geometric objects in two- or three-dimensions to a. compare ratios between side lengths, perimeters, areas, and volumes;

Prism & Pyramids. Lesson 9-2: Prisms & Pyramids2 Right Prism Lateral Area of a Right Prism (LA) = ph Surface Area (SA) = ph + 2B = [Lateral Area + 2 (area.

12.7 Similar Solids Geometry. Objectives Find and use the scale factor of similar solids. Use similar solids to solve real-life problems.

Opener Find the volume of each figure. 2) 1) V = cm 3 V ≈ 2,143,573 km 3 4 cm 80 km.

Similar Solids 12.7 Geometry. Similar Solids Two solids of the same type with equal ratios of corresponding linear measures (such as heights or radii)

12.7 Similar. Today we will… Return to the idea Of similar objects.

The Fundamental Theorem of Similarity. The FTS I 5 II Find the scale factor (ratio of similitude):

Surface Area and Volume of Similar Figures

8-10 Scaling Three-Dimensional Figures Warm Up Problem of the Day

Similar Polygons.

Scaling Three-Dimensional Figures

Explore Similar Solids

11.6 Perimeters and Areas of Similar Figures

8.4 Volume and Areas of Similar Figures

6.3 Use Similar Polygons.

Areas and Volumes of Similar Solids

Volume of Prisms and Cylinders

Similar Solids and Scale Factor

Chapter 2 Similarity and Dilations

12.7 Similar Solids THE LAST ONE!!!!!!! WOO-HOO!!!!!!!

13.4 Congruent and Similar Solids

Lesson 6.1 How do you find ratios and unit rates?

How dimension change affects surface area and volume.

Lesson 9-5: Similar Solids

Lesson 9-5 Similar Solids.

Areas and Volumes of Similar Solids

11.7: Surface Area and Volume for Similar Solids

Lesson: Similar Solids

Similar Shapes.

Volume Ratios of Similar Solids

25. Similarity and Congruence

Lesson 9-5: Similar Solids

8-10 Scaling Three-Dimensional Figures Warm Up Problem of the Day

Ch. 11 Similar Solids.

Presentation transcript:

Lesson 9-5: Similar Solids

Lesson 9-5: Similar Solids Two solids of the same type with equal ratios of corresponding linear measures (such as heights or radii) are called similar solids. Lesson 9-5: Similar Solids

Lesson 9-5: Similar Solids NOT similar solids Lesson 9-5: Similar Solids

Similar Solids & Corresponding Linear Measures To compare the ratios of corresponding side or other linear lengths, write the ratios as fractions in simplest terms. 12 3 6 8 2 4 Length: 12 = 3 width: 3 height: 6 = 3 8 2 2 4 2 Notice that all ratios for corresponding measures are equal in similar solids. The reduced ratio is called the “scale factor”. Lesson 9-5: Similar Solids

Lesson 9-5: Similar Solids Example: Are these solids similar? Solution: 16 12 8 6 9 All corresponding ratios are equal, so the figures are similar Lesson 9-5: Similar Solids

Lesson 9-5: Similar Solids Example: Are these solids similar? 8 18 4 6 Solution: Corresponding ratios are not equal, so the figures are not similar. Lesson 9-5: Similar Solids

Similar Solids and Ratios of Areas If two similar solids have a scale factor of a : b, then corresponding areas have a ratio of a2: b2. This applies to lateral area, surface area, or base area. 7 5 2 4 3.5 Ratio of sides = 2: 1 8 4 10 Surface Area = base + lateral = 10 + 27 = 37 Surface Area = base + lateral = 40 + 108 = 148 Ratio of surface areas: 148:37 = 4:1 = 22: 12 Lesson 9-5: Similar Solids

Similar Solids and Ratios of Volumes If two similar solids have a scale factor of a : b, then their volumes have a ratio of a3 : b3. 9 15 6 10 Ratio of heights = 3:2 V = r2h =  (92) (15) = 1215 V= r2h = (62)(10) = 360 Ratio of volumes: 1215:360 = 27:8 = 33: 23 Lesson 9-5: Similar Solids