Exercise Use the LCM to rename these ratios with a common denominator.

Slides:

Advertisements

Similar presentations

4.2 Using Similar Shapes How can you use similar shapes to find unknown measures?

Advertisements

I can use proportions to find missing measures in similar figures

DO NOW ft 4ft On a Sunny Day, a person who is 6ft tall casts a 4ft shadow. This is proportional to the height of a nearby flagpole which casts.

Converting Customary Units

Similar Shapes and Scale Drawings

Similar figures have exactly the same shape but not necessarily the same ______________. Corresponding sides of two figures are in the same relative position,

Proportions, Ratio, Rate and Unit Rate Review

Chapter 5 Ratios, Rates, Proportions

EXAMPLE 3 Standardized Test Practice.

EXAMPLE 3 Standardized Test Practice. EXAMPLE 3 Standardized Test Practice SOLUTION The flagpole and the woman form sides of two right triangles with.

2.5 Solving Proportions Write and use ratios, rates, and unit rates. Write and solve proportions.

Using Cross Products Lesson 6-4. Cross Products When you have a proportion (two equal ratios), then you have equivalent cross products. Find the cross.

Solve for unknown measures

6.2.1 Use Proportions to solve Geometry Problems.

Similar Polygons: Ratio and Proportion. Objectives Find and simplify the ratio of two numbers Use proportions to solve real-life problems.

7.1 Ratio and Proportion Textbook page 357.

Chapter 6.1: Similarity Ratios, Proportions, and the Geometric Mean.

Copyright © Cengage Learning. All rights reserved. Rational Expressions and Equations; Ratio and Proportion 6.

Solving systems of equations with 2 variables

1 Math Solving Proportions. 2 Vocabulary ► Proportion—an equation that shows that two ratios are equivalent. ► Cross Product—the product of the numerator.

Bell Work 1/22/13 1) Simplify the following ratios: a)b)c) 2) Solve the following proportions: a)b) 3) A map in a book has a scale of 1 in = 112 miles,

Ratio and Proportion Ratio - Given two numbers x and y, y  0, a ratio is the quotient x divided by y. A ratio can be written as x to y, x:y, or x/y. All.

Proportions Mrs. Hilton’s Class. Proportions What are proportions? - If two ratios are equal, they form a proportion. Proportions can be used in geometry.

More Applications of Proportions SIMILAR FIGURES.

Chapter 6.1 Notes: Ratios, Proportions, and the Geometric Mean Goal: You will solve problems by writing and solving proportions.

Unit 7 Similarity. Part 1 Ratio / Proportion A ratio is a comparison of two quantities by division. – You can write a ratio of two numbers a and b, where.

Solving Proportions. 2 ways to solve proportions 1. Equivalent fractions (Old) Cross Products (New)

“Missed it by that much!”. Unit 7: Similarity (7.1) Ratios and Proportions Obj: Write and solve proportions.

Chapter 4 Rates, Ratio, and Proportions.. Ratio- Is the comparison of two quantities that have the same units, often written in fraction form.Is the comparison.

1. In ABC and XZW, m A = m X and m B = m Z

Dimensional Analysis. Measurement Ratios In order to use dimensional analysis, you have to understand that you need to use ratios that have a value of.

1. Ratio: A comparison of 2 numbers by division. i.e.a to b a:ba/b 2. Rate: When a ratio is made up of DIFFERENT units. i.e.3in/4ft$2/5 days UNIT RATE:

Notes Over 11.1 Proportions Vocabulary Proportion - an equation that states that two ratios are equal. Cross Product Property - the product of the extremes.

5-5 Similar Figures Matching sides are called corresponding sides A B C D E F 1.) Which side is corresponding to ? 2.) Which side is corresponding to ?

7.1 Ratios and Proportions. Ratios Ratio: A comparison of two quantities by division. 1) The ratio of a to b 2) a : b Ratios can be written in three ways…

SATMathVideos.Net Water is pumped into an tank at 20 gallons per minute. The tank has a length of 10 feet and a width of 5 feet. If the tank starts empty,

Aim: How do we solve proportion problems?

Converting Customary Units

Copyright © 2014 Pearson Education, Inc.

Understanding Ratio, Proportion, and Percent

Chapter 2: Graphing & Geometry

Ratios, Proportions, and the Geometric Mean

7.1 Ratio and Proportions Pg 356

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Section 8.1 Ratio and Proportion

Chapter 7-1: Proportions

Section 8.1 Ratio and Proportion

Solve: 3x + 2 = 6x – 1 a.) -1 b.) 1/3 c.) 1.

Using Similar Figures to Find Missing Lengths

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Proportions, Ratio, Rate and Unit Rate Review

Proportions, Ratio, Rate and Unit Rate Review

Using Similar Figures to Find Missing Lengths

Proportional Reasoning

Lesson 6.5 Similarity and Measurement

Ratios, Proportions, and the Geometric Mean

Similar triangles.

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

3.5 Writing Ratios & Proportion

Rates, Ratios, and Proportions

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Similar Figures and Indirect Measurement

Algebra 1 Section 3.2.

Ratio and Proportion.

Similar Figures The Big and Small of it.

2.6 Solving Equations Involving the Distributive property

Using Cross Products Chapter 3.

Rates, Ratios and Proportions

Presentation transcript:

Exercise Use the LCM to rename these ratios with a common denominator. 1 2 2 3 and 3 6 4 6 ,

Exercise Use the LCM to rename these ratios with a common denominator. 2 3 3 5 and 10 15 9 15 ,

Exercise Use the LCM to rename these ratios with a common denominator. 1 3 3 4 2 5 , , and 20 60 45 60 , 24 60

Exercise Change these ratios to equivalent ratios by multiplying by 1 in the form of 2 over 2 and 3 over 3. 2 5 4 10 6 15 ,

Exercise Change these ratios to equivalent ratios by multiplying by 1 in the form of 2 over 2 and 3 over 3. 4 3 8 6 12 9 ,

Proportion A proportion is a statement of equality between two ratios.

6 8 9 12 = 1st 3rd 2nd 4th The 1st and 4th are called the extremes. The 2nd and 3rd are called the means.

Property of Proportions The product of the extremes is equal to the product of the means.

6 8 9 12 = 6 8 9 12 = 8 6 12 9 = also

6 8 9 12 = 6 8 9 12 = 9 6 12 8 = also

6 8 9 12 = 6 8 9 12 = 6 9 8 12 = also

Example 1 3 5 12 20 Given = , write a proportion by inversion of ratios and a proportion by alternation of terms. 5 3 2012 = 3 12 5 20 =

Example 2 6 15 8 n Solve = for n. 8 n 6 15 = 6n 6 1206 = 6n = 15 • 8

Example 3 32 x 108 27 Solve = for x. 108 27 32 x = 108x 108 864108 =

Example 4 x 7 2 Solve = . x ≈ 1.14

Example x 8 9 50 Solve = . x = 1.44

Example 4 The ratio of adults to students on a bus is 2 to 7. If there are 8 adults, how many students are on the bus? 8 n 2 7 = 2n 2 56 2 = 2n = 56 n = 28 students

Example 5 Sam can paint 200 ft. of privacy fence in 3 hr. To the nearest foot, how many feet can he paint in 5 hr.? 3 hr. 5 hr. 200 ft. x ft. = 3x 3 1,000 3 = 3x = 200(5) x ≈ 333 ft. 3x = 1,000

Example A rectangle whose width is 5 ft. and whose length is 12 ft. is similar to a rectangle whose width is 8 ft. What is the length of the larger rectangle? 19.2 ft.

Example What is the height of a tree if a 6 ft. man standing next to the tree makes an 8 ft. shadow and the tree makes a 50 ft. shadow? 37.5 ft.

Example If a car can go 250 mi. on 8 gal., how many gallons will it take to go on a 600 mi. trip? 19.2 gal.

Example If a 50 ft. fence requires 84 2” x 4”s, how many 2” x 4”s are needed for a 160 ft. fence? 269

Example The product of ratios is also a ratio. For example, suppose a production line can assemble 130 cars per hour. How many days, at 8 hr./day, will it take to produce 100,000 cars? 97 days