Lesson 4Proportional Relationships and Equations

Learning Goal

Let’s write equations describing proportional relationships.

Learning Targets

  • I can write an equation of the form to represent a proportional relationship described by a table or a story.

  • I can write the constant of proportionality as an entry in a table.

Lesson Terms

  • constant of proportionality

Warm Up: Number Talk: Division

Problem 1

Find each quotient mentally.

Activity 1: Feeding a Crowd, Revisited

Problem 1

A recipe says that 2 cups of dry rice will serve 6 people. Complete the table as you answer the questions. Be prepared to explain your reasoning.

cups of dry rice

number of people

  1. How many people will 1 cup of rice serve?

  2. How many people will 3 cups of rice serve? 12 cups? 43 cups?

  3. How many people will cups of rice serve?

Problem 2

A recipe says that 6 spring rolls will serve 3 people. Complete the table as you answer the questions. Be prepared to explain your reasoning.

number of spring rolls

number of people

  1. How many people will 1 spring roll serve?

  2. How many people will 10 spring rolls serve? 16 spring rolls? 25 spring rolls?

  3. How many people will spring rolls serve?

Problem 3

How was completing this table different from the previous table? How was it the same?

Activity 2: Denver to Chicago

Problem 1

A plane flew at a constant speed between Denver and Chicago. It took the plane 1.5 hours to fly 915 miles.

A map of 6 states that include Colorado, Nebraska, Kansas, Iowa, Missouri, and Illinois.
  1. Complete the table.

    time (hours)

    distance (miles)

    speed (miles per hour)

  2. How far does the plane fly in one hour?

  3. How far would the plane fly in hours at this speed?

  4. If represents the distance that the plane flies at this speed for hours, write an equation that relates and .

  5. How far would the plane fly in 3 hours at this speed? in 3.5 hours? Explain or show your reasoning.

Are you ready for more?

Problem 1

A rocky planet orbits Proxima Centauri, a star that is about 1.3 parsecs from Earth. This planet is the closest planet outside of our solar system.

  1. How long does it take light from Proxima Centauri to reach the Earth? (A parsec is about 3.26 light years. A light year is the distance light travels in one year.)

  2. There are two twins. One twin wants to explore the planet near Proxima Centauri and leaves on a spaceship traveling at 90% of the speed of light, while the other twin stays home on Earth. How much does the twin on Earth age while the other twin travels to Proxima Centauri? (Do you think the answer would be the same for the other twin? Consider researching “The Twin Paradox” to learn more.)

Activity 3: Revisiting Bread Dough

Problem 1

A bakery uses 8 tablespoons of honey for every 10 cups of flour to make bread dough. Some days they bake bigger batches and some days they bake smaller batches, but they always use the same ratio of honey to flour.

  1. Complete the table.

    honey (tbsp)

    flour (c)

  2. If is the cups of flour needed for tablespoons of honey, write an equation that relates and .

  3. How much flour is needed for 15 tablespoons of honey? 17 tablespoons? Explain or show your reasoning.

Lesson Summary

The table shows the amount of red paint and blue paint needed to make a certain shade of purple paint, called Venusian Sunset.

Note that “parts” can be any unit for volume. If we mix 3 cups of red with 12 cups of blue, you will get the same shade as if we mix 3 teaspoons of red with 12 teaspoons of blue.

red paint
(parts)

blue paint
(parts)

The last row in the table says that if we know the amount of red paint needed, , we can always multiply it by 4 to find the amount of blue paint needed, , to mix with it to make Venusian Sunset. We can say this more succinctly with the equation . So the amount of blue paint is proportional to the amount of red paint and the constant of proportionality is 4.

We can also look at this relationship the other way around.

If we know the amount of blue paint needed, , we can always multiply it by to find the amount of red paint needed, , to mix with it to make Venusian Sunset. So . The amount of red paint is proportional to the amount of blue paint and the constant of proportionality .

blue paint
(parts)

red paint
(parts)

In general, when is proportional to , we can always multiply by the same number the constant of proportionality—to get . We can write this much more succinctly with the equation .