Learn on PengiReveal Math, Course 1Module 1: Ratios and Rates

1-5 Solve Ratio Problems

In this Grade 6 lesson from Reveal Math, Course 1, Module 1, students learn to solve real-world ratio problems using bar diagrams, double number lines, and equivalent ratios. They practice applying part-to-whole and part-to-part ratio relationships to find unknown quantities in contexts like surveys and comparisons. The lesson builds problem-solving skills by guiding students through step-by-step methods to set up and interpret visual models for ratio reasoning.

Section 1

Solving Ratio Problems with Bar Diagrams

Property

To solve ratio problems using tape (or bar) diagrams: 

  1. Draw: Sketch identical rectangular boxes to represent the ratio of each quantity.
  2. Identify: Locate the known quantity in the problem. This could be the amount of one specific part (Part-to-Part) or the total amount of all parts combined (Part-to-Whole).
  3. Calculate: Find the value of a single box by dividing the known quantity by its corresponding number of boxes:
Value per part=Known QuantityCorresponding Number of Parts\text{Value per part} = \frac{\text{Known Quantity}}{\text{Corresponding Number of Parts}}
  1. Solve: Multiply this single-part value by the number of boxes for any unknown quantity you need to find.

Examples

Section 2

Modeling Ratios on a Double Number Line

Property

A double number line is simply two number lines aligned so that they start at the same location and the first marks represent the ratio in question.

Examples

  • A car travels 120 miles in 2 hours. A double number line would align 0 miles with 0 hours, 120 miles with 2 hours, and 240 miles with 4 hours, showing the constant relationship.
  • A recipe calls for 3 cups of flour for every 2 eggs. Using a double number line, you can see that if you use 4 eggs, you will need 6 cups of flour.
  • An old printer prints 40 pages in 5 minutes. A double number line shows that in 10 minutes, it would print 80 pages, and in 15 minutes, it would print 120 pages.

Explanation

Ratios can connect different kinds of measurements, like miles and hours. A double number line is a great visual tool that places these two measurements side-by-side, helping you see how they increase together at a constant rate.

Book overview

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Module 1: Ratios and Rates

  1. Lesson 1

    1-1 Understand Ratios

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  2. Lesson 2

    1-2 Tables of Equivalent Ratios

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  3. Lesson 3

    1-3 Graphs of Equivalent Ratios

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  4. Lesson 4

    1-4 Compare Ratio Relationships

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  5. Lesson 5Current

    1-5 Solve Ratio Problems

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  6. Lesson 6

    1-6 Convert Customary Measurement Units

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  7. Lesson 7

    1-7 Understand Rates and Unit Rates

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  8. Lesson 8

    1-8 Solve Rate Problems

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Lesson overview

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Expand

Section 1

Solving Ratio Problems with Bar Diagrams

Property

To solve ratio problems using tape (or bar) diagrams: 

  1. Draw: Sketch identical rectangular boxes to represent the ratio of each quantity.
  2. Identify: Locate the known quantity in the problem. This could be the amount of one specific part (Part-to-Part) or the total amount of all parts combined (Part-to-Whole).
  3. Calculate: Find the value of a single box by dividing the known quantity by its corresponding number of boxes:
Value per part=Known QuantityCorresponding Number of Parts\text{Value per part} = \frac{\text{Known Quantity}}{\text{Corresponding Number of Parts}}
  1. Solve: Multiply this single-part value by the number of boxes for any unknown quantity you need to find.

Examples

Section 2

Modeling Ratios on a Double Number Line

Property

A double number line is simply two number lines aligned so that they start at the same location and the first marks represent the ratio in question.

Examples

  • A car travels 120 miles in 2 hours. A double number line would align 0 miles with 0 hours, 120 miles with 2 hours, and 240 miles with 4 hours, showing the constant relationship.
  • A recipe calls for 3 cups of flour for every 2 eggs. Using a double number line, you can see that if you use 4 eggs, you will need 6 cups of flour.
  • An old printer prints 40 pages in 5 minutes. A double number line shows that in 10 minutes, it would print 80 pages, and in 15 minutes, it would print 120 pages.

Explanation

Ratios can connect different kinds of measurements, like miles and hours. A double number line is a great visual tool that places these two measurements side-by-side, helping you see how they increase together at a constant rate.

Book overview

Jump across lessons in the current chapter without opening the full course modal.

Continue this chapter

Module 1: Ratios and Rates

  1. Lesson 1

    1-1 Understand Ratios

    LearnPractice
  2. Lesson 2

    1-2 Tables of Equivalent Ratios

    LearnPractice
  3. Lesson 3

    1-3 Graphs of Equivalent Ratios

    LearnPractice
  4. Lesson 4

    1-4 Compare Ratio Relationships

    LearnPractice
  5. Lesson 5Current

    1-5 Solve Ratio Problems

    LearnPractice
  6. Lesson 6

    1-6 Convert Customary Measurement Units

    LearnPractice
  7. Lesson 7

    1-7 Understand Rates and Unit Rates

    LearnPractice
  8. Lesson 8

    1-8 Solve Rate Problems

    LearnPractice