10.4 Perimeters and Areas of Similar Figures You can use ratios to compare the perimeters and areas of similar figures. If the scale factor of two similar.

Slides:

Advertisements

Similar presentations

8.6 Perimeters and Areas of Similar Figures (1 card)

Advertisements

11-7 Areas and Volumes of Similar Solids. Problem 1: Identifying Similar Solids Are the two rectangular prisms similar? If so what is the scale factor.

You will use the ratio of two similar figures to find their perimeter and area.

Perimeter and Area of Similar Figures

10-4 Perimeters and Areas of Similar Figures

RATIOS OF SCALE DRAWINGS. SCALE DRAWINGS SCALE DRAWINGS: A scale drawing is a drawing that represents a real object. The scale of the drawing is the ratio.

Section 8-6 Perimeter and Area of Similar Figures SPI 22d: determine the perimeter & area given the ratio of 2 similar polygons.

11.3 Perimeter and Area of Similar Figures. Two rectangles are similar. One has width 4 in. and length 6 in. The other has width of 6 in. and length of.

A cube has a total surface area of 24 cm2

Similar Triangles and Polygons

Using Proportions to Solve Geometry Problems Section 6.3.

Essential UnderstandingEssential Understanding  You can use ratios to compare the perimeters and areas of similar figures  Students will be able to.

No warmup Grab a note sheet off of table and have out your challenge packets.

Chapter 10: Area Section 10-4: Perimeters and Areas of Similar Figures.

8.6:Perimeters and Areas of Similar Figures

Find the Perimeter and Area:

Geometry with Cosby Missy Cosby Okemos High School Math Instructor.

Section 11-3 Perimeters and Areas of Similar Figures.

Similar Figures Examples and Step by Step Directions.

2.7: Dilations.

Dilations Section 9.7. Dilation A dilation is a transformation that stretches or shrinks a figure to create a similar figure. A dilation is not an isometry.

7.2 Similar Polygons Similar figures – have the same shape but not necessarily the same size. You can abbreviate is similar to with the symbol ~ . Two.

 Warm-up 8 x x. A. How are these ’s similar? B. Write a similarity statement. Lets Get Started! C. Write the proportions and solve for.

10-8 Areas and Volumes of Similar Solids

11.3 Perimeters and Area of Similar Figures

5 Minute Check Find the area. Complete on the back of

Similar Figures and Scale Drawings

Find the area of the equilateral triangle if one of the sides is 8.

Final Exam Review Answers on last slide. 1.What is the geometric mean of 15 and 8?

 You can use similar figures to find missing information about one of the figures, when you know the measurements of at least one of the figures and.

Quick Start Expectations d 135⁰ d 45⁰ Teaching Target: I can use rep-tiles to see the effect of scale factor on side lengths, angles, perimeter, and area.

Geometry/TrigName: __________________________ Ratio of Perimeters & Areas ExplorationDate: ___________________________ Recall – Similar Figures are figures.

Solve for x: Choice: change to decimals or change to fractions Solve: Warm-Up: December 8, 2015.

10.4 Perimeters & Areas of Similar Figures

Section 10–4 Perimeters & Areas of Similar Figures Objectives: 1) To find perimeters & areas of similar figures.

8-6 P ERIMETERS AND A REAS OF S IMILAR F IGURES M11.C G Objectives: 1) To find the perimeters and areas of similar figures. PDN: Pg. 454 #4-6.

Percent Change of Dimensions Lesson 71. Increase and Decrease ›Increase: Dilation ›Decrease: Reduction ›Creates similar figures; proportional measures.

Take out your homework and math journals Check your homework and record effort on your half sheet. Be ready to start class at 11:08 – with your math journals.

Perimeters and Areas of Similar Figures. You will use the ratio of two similar figures to find their perimeter and area.

10.4 Perimeters and Areas of Similar Figures. Perimeters and Areas of Similar Figures  If the similarity ratio is, then:  The ratio of the perimeters.

6.3.1 Use similar Polygons Chapter 6: Similarity.

P T K L R x Two sides of ΔPRT are extended to create a similar triangle, ΔPLK, as shown. If x represents the length of segment LK, then What is.

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.

4/2=225/15=5/36/8=3/4.  Quiz on Friday  One of your assignments will be collected on Friday for a daily grade. Be sure to complete all questions to.

SIMILAR POLYGONS Lesson 3 – 2 MATH III. 1:18 Model Original car.

Lesson 11.5 & 11.6: 1.Homework Discussion 2.Proportions with Area 3.Proportions with Volume.

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

Corresponding Parts of Similar Triangles

Group Work: Predict(and record) before you work!

C 5 4 A B 6 Z 10 8 X Y 12.

Area and Perimeter of Similar Figures

7.1 Proportions Solving proportions

Perimeters and Areas of Similar Figures

11.6 Perimeters and Areas of Similar Figures

Objective: To find the perimeters and areas of similar figures.

Areas and Volumes of Similar Solids

11.3 – Perimeter and Area of Similar Figures

7.7: Perimeters and Areas of Similar Figures

Warm Up Identify each number as rational, irrational or not real and explain why ) …… 6) -16 7) 6/0 8) 0/4.

Section 8.3 Similar Polygons

11.3 Perimeters and Area of Similar Figures

Ratios, Rates and Percents

11.3 Perimeters and Area of Similar Figures

Similar Figures.

11.7: Surface Area and Volume for Similar Solids

7.7 Perimeters and Area of Similar Figures

AIM 7-5: How can we use ratios to make indirect measurements?

Chapter 10 Concepts- section by section

11.7 Perimeters and Areas of Similar Figures

Presentation transcript:

10.4 Perimeters and Areas of Similar Figures You can use ratios to compare the perimeters and areas of similar figures. If the scale factor of two similar figures is a : b, then 1.The ratio of their perimeters is a : b 2.The ratio of their areas is a² : b².

Finding Ratios in Similar Figures The trapezoids are similar. The ratio of the lengths of corresponding sides is 6 : 9 or 2 : 3. A.What is the ratio (smaller to larger) of the perimeters? B.What is the ratio(smaller to larger) of the areas?

Finding Areas Using Similar Figures The area of the smaller regular pentagon is about 27.5 cm². What is the best approximation for the area of the larger regular pentagon?

Applying Area Ratios During the summer, a group of high school students cultivated a plot of city land and harvested 13 bushels of vegetables that they donated to a food pantry. Next summer, the city will let them use a larger, similar plot of land. In the new plot, each dimension is 2.5 times the corresponding dimension of the original plot. How many bushels can the students expect to harvest next year?

Finding Perimeter Ratios The triangles are similar. What is the scale factor? What is the ratio of their perimeters?

More Practice!!!!! Homework – Textbook p. 638 – 639 #9 – 23 ALL.