Grade 6 Module 1 Lesson 8 Homework Answer Key.

Slides:

Advertisements

Similar presentations

Lesson 26 Percent of a Quantity

Advertisements

Lesson Topic: Percent of a Quantity

Visual Fraction Models

Chapter 7 Add and Subtract Fractions. What You Will Learn To find a common denominator and use it to write equivalent fractions To add and subtract fractions.

Lesson 3: Writing Products as Sums and Sums as Products

Unit 7 Lesson 1.5 Sharing Several Brownies

Math Module 1 Lesson 4 Equivalent Ratios.

Ratios and Proportions

Solving Problems Involving Equivalent Ratios

Grade 6 Module 1 Lesson 7 Homework Answer Key.

6th Grade: Module 1 Lesson 5

Lesson 12: Percents and Tape Diagrams Essential Question: How can we represent percents visually to help us solve problems?

Lesson 27 Solving Percent Problems

People Fractions. Problem 1 of 20 Answer 1 = 10 Problem 2 of 20 Answer 2 = 5.

5 Minute Check Estimate and Multiply. Complete on your homework x x x x 6.

Section 4-1 p. 156 Goal – to express ratios as fractions - to determine unit rates.

Grade 6 Module 1 Lesson 8.

The following are some examples of fractions: This way of writing number names is called fraction notation. The top number is called the numerator and.

Lesson 6-1 Understanding Percents. Obj: To model percents and to write percents using equivalent ratios HWK: p all all Vocab: 1) percent.

Lesson Menu Main Idea Example 1:Real-World Example: Solve Ratio Problems Example 2:Real-World Example: Solve Ratio Problems Example 3:Real-World Example:

Representing Ratios as Concrete Models & Fractions Lesson 2 3 rd 6 Weeks TEKS 6.3B.

Ratios, Rates, and Unit Rates Ratios Number of Boys Number of Girls Ratio of Boys to Girls Class 1 Class 2 Are these ratios in the table equivalent?

Course Percent Problems 6 th Grade Math HOMEWORK Page 428 #1-14 ANSWERS!

Write and Solve Proportions

Lesson 1-1 Example Solve. VIDEO GAMES Jerome has $20 to buy a video game. The game costs $60. Jerome’s uncle gives him $15. How much more money does.

Proportions Wednesday, November 24 Math Workshop 3 rd Period.

Course Ratios and Proportions Warm Up Write each fraction in lowest terms

Chapter 9: Lesson 4: Solving Percent Problems with Proportions

Chapter 10: Lesson 4: Solving Percent Problems with Proportions

Copyright © 2010 Study Island - All rights reserved. Name: _________________________________ Multiply Fractions Directions: Answer the following questions.

Understanding Unit Rates Unit 2. DIRECTIONS Use the word to complete each section. The answers are in order make sure they make sense. Answer the discuss.

Topic E multiplying decimals STANDARD - 5.NBT.2, 5.NBT.3, 5.NBT.7.

Lesson 25 S.110 A Fraction as a Percent.

Lesson Topic: Solving Percent Problems Lesson Objective: I can…  Find the percent of a quantity. Given a part and the percent, I can solve problems involving.

Proportions Lesson 6-3. A proportion is an equation stating that two ratios are equivalent. Determine if the quantities in each pair of rates are proportional.

Chapter 9 Lesson 9-1: Understanding Percents

Pre-Algebra 7-1 Ratios and Proportions Warm Up Write each fraction in lowest terms. Pre-Algebra 7-1 Ratios and Proportions

1.6 SOLVE PROPORTIONAL RELATIONSHIPS OBJECTIVE: USE PROPORTIONS TO SOLVE PROBLEMS PROPORTIONS – BRAIN POP.

Module 1: Standards.  Explain the concept of a ratio  Use ratio language to describe a relationship between two quantities Example: The ratio of girls.

Ratio and Units Rates Module 1

Lesson Topic: Associated Ratios, Value of a Ratio & Equivalent Ratios Lesson Objective: I can… Understand the relationship between ratios and fractions.

Section Setting Up Word Problems. Lesson Objective: Students will: Learn to set up the type of complicated word problems that are often found in.

Section 5-1 p. 206 Goal – to write ratios as percents and vice versa.

Grade 6 Honors Fractions, Decimals, Percent, Ratios

Lesson 12: Percents and Tape Diagrams

Lesson 85 Warm Up Pg. 441.

Equivalent Ratios.

Ratios and Proportions

Homework Review: Sect 5.5 # 8 – 19

Equivalent Fractions What fraction of the bun cases are full ?

Multiply Fractions Name: _________________________________

Unit 3: Rational Number Conversions

Equivalent ratios.

Math Module 1 Ratios and Unit Rates

Friday, March 9, 2018 Day D AM Advisory 7:55 – 8:00 Math 8:02 – 8:34

Name _______________________ Date __________________ Tape Diagrams

Lesson Day 2 – Teacher Notes

Ratios Module 1: Lesson 8.

Math Module 1 Ratios and Unit Rates

“Day E” November 22, :51 - 8:51 Math 8:53 - 9:53 Science

“Day C” November 16, :01 - 9:01 Math 9: :03 Science

Equivalent Fractions = = = = = = = = = = = =

Must Do (8/29) – (-7) 8 – 12 (-7) + (-4)

Lesson – Teacher Notes Standard:

“Day B” December 5, :01 - 9:01 Exploratory 9: :03

6.RP.3a Make tables of equivalent ratios relating quantities with whole number measurements, find missing values in the tables, and plot the pairs of values.

Scale factors and similarity

“Day C” October 13, :51 - 8:51 Math 8:53 - 9:53 Science

I CAN write equivalent fractions

Geometry/Trig Name __________________________

Presentation transcript:

Grade 6 Module 1 Lesson 8 Homework Answer Key

Problem 1 The ratio of the number of shaded sections to the number of unshaded is 4 to 2. What is the value of the ratio of the number of shaded pieces to the number of unshaded pieces? 4/2 = 2/1 = 2

Problem 2 Use the value of the ratio to determine which ratio(s) is equivalent to 7:15. 21:45 because 7x3=21 and 15x3=45 d. 63:135 because 7x9=63 and 15x9=135

Problem 3 Sean was at batting practice. He swung 25 times but only hit the ball 15 times. Describe and write more than one ratio to this situation. Ratio of the number of hits to the total number of swings is 15:25 Ratio of the number hits to the number of misses is 15:10 Ratio of the number of misses to the number of hits is 10:15 Ratio of the number of misses to the total number of swings is 10:25

Problem 3 Sean was at batting practice. He swung 25 times but only hit the ball 15 times. For each ratio you created, use the value of the ratio to express one quantity as a fraction of the other quantity. The number of hits is 15/25 or 3/5 of the total number of swings. The number of hits is 15/10 or 3/2 the number of misses. The number of misses is 10/15 or 2/3 the number of hits. The number of misses is 10/25 or 2/5 of the total number of swings.

Problem 3 Make up a word problem that a student can solve using one of the ratios and its value. If Sean estimates he will take 10 swings in his next game, how many hits would he expect to get, assuming his ratio of hits-to-swings does not change.

Problem 4 Your middle school has 900 students. 1/3 of the students bring their lunch instead of buying lunch at school. What is the value of the ratio of the number of students who do bring their lunch to the number of students who do not. = 900 students 300 Students bring lunch 600 students buy lunch

Problem 4 First, I created a tape diagram. In the tape diagram, 1/3 of the students bring their lunch instead of buying lunch at school. I determined that 300 students bring their lunch, leaving 600 students who buy their lunch. One unit of the tape diagram represents 300, and 2 units of the tape diagram represent 600. This creates a ratio of 1:2. As such, the value of the ratio of the number of students who bring their lunch to the number of students who buy their lunch is 1/2. = 900 students 300 Students bring lunch 600 students buy lunch