Lesson 1

Understanding Proportional Relationships

Let’s study some graphs.

1.1: Notice and Wonder: Two Graphs

two graphs. both graphs, horizontal axis, scale 0 to 18, by 2's. vertical axis, scale 0 to 6, by 1's. 

What do you notice? What do you wonder?

1.2: Moving Through Representations

A ladybug and ant move at constant speeds. The diagrams with tick marks show their positions at different times. Each tick mark represents 1 centimeter.

4 number lines, 30 evenly spaced tick marks. 
graph. horizontal axis, distance traveled in centimeters, 20 units. vertical axis, elapsed time in seconds, 6 units. 2 lines graphed, labeled u and v. 
  1. Lines \(u\) and \(v\) also show the positions of the two bugs. Which line shows the ladybug’s movement? Which line shows the ant’s movement? Explain your reasoning.

  2. How long does it take the ladybug to travel 12 cm? The ant?

  3. Scale the vertical and horizontal axes by labeling each grid line with a number. You will need to use the time and distance information shown in the tick-mark diagrams.

  4. Mark and label the point on line \(u\) and the point on line \(v\) that represent the time and position of each bug after traveling 1 cm.



  1. How fast is each bug traveling?
  2. Will there ever be a time when the ant is twice as far away from the start as the ladybug? Explain or show your reasoning.

1.3: Moving Twice as Fast

Refer to the tick-mark diagrams and graph in the earlier activity when needed.

  1. Imagine a bug that is moving twice as fast as the ladybug. On each tick-mark diagram, mark the position of this bug.
  2. Plot this bug’s positions on the coordinate axes with lines \(u\) and \(v\), and connect them with a line.
  3. Write an equation for each of the three lines.

Summary

Graphing is a way to help us make sense of relationships. But the graph of a line on a coordinate axes without scale or labels isn’t very helpful. For example, let’s say we know that on longer bike rides Kiran can ride 4 miles every 16 minutes and Mai can ride 4 miles every 12 minutes. Here are the graphs of these relationships:

graph. horizontal axis, 15 units. vertical axis, 12 units. 2 lines graphed. 

Without labels we can’t even tell which line is Kiran and which is Mai! Without labels and a scale on the axes, we can’t use these graphs to answer questions like:

  1. Which graph goes with which rider?
  2. Who rides faster?
  3. If Kiran and Mai start a bike trip at the same time, how far are they after 24 minutes?
  4. How long will it take each of them to reach the end of the 12 mile bike path?

Here are the same graphs, but now with labels and scale:

graph. horizontal axis, distance in miles, scale 0 to 14, by 2's. vertical axis, time in minutes, scale 0 to 48, by 8's. 2 lines graphed. 

Revisiting the questions from earlier:

  1. Which graph goes with each rider? If Kiran  rides 4 miles in 16 minutes, then the point \((4,16)\) is on his graph. If he rides for 1 mile, it will take 4 minutes. 10 miles will take 40 minutes. So the upper graph represents Kiran’s ride. Mai’s points for the same distances are \((1,3)\), \((4,12)\), and \((10,30)\), so hers is the lower graph. (A letter next to each line would help us remember which is which!)

  2. Who rides faster? Mai rides faster because she can ride the same distance as Kiran in a shorter time.

  3. If Kiran and Mai start a bike trip at the same time, how far are they after 20 minutes? The points on the graphs at height 20 are 5 miles for Kiran and a little less than 7 miles for Mai.

  4. How long will it take each of them to reach the end of the 12 mile bike path? The points on the graphs at a horizontal distance of 12 are 36 minutes for Mai and 48 minutes for Kiran. (Kiran’s time after 12 miles is almost off the grid!)

Glossary Entries

  • constant of proportionality

    In a proportional relationship, the values for one quantity are each multiplied by the same number to get the values for the other quantity. This number is called the constant of proportionality.

    In this example, the constant of proportionality is 3, because \(2 \boldcdot 3 = 6\), \(3 \boldcdot 3 = 9\), and \(5 \boldcdot 3 = 15\). This means that there are 3 apples for every 1 orange in the fruit salad.

    number of oranges number of apples
    2 6
    3 9
    5 15