Lesson 19

At the beginning of this unit, students compared linear and exponential growth. They return to this comparison in this lesson. This warm-up aims to show that, visually, it could be very difficult to distinguish linear and exponential growth for some domain of the function. While any exponential function eventually grows very quickly, it also can look remarkably linear over a portion of the domain.

Invite students to share the rationales for their decision and their ideas for improving the clarity of the graph.

Help students understand that the graph of a linear function always looks like a line regardless of the domain where it is plotted. An exponential function, however, can look linear depending on the domain and range. Graphs are very helpful for seeing the general behavior of a function but not always for determining what kind of function is being graphed.

Consider showing students this image of the graph showing a larger domain and range as well as the original window (the red rectangle in the lower left).

Or show a dynamic graph of \(y=120\boldcdot(1.03)^x\) starting with a small window where the graph looks linear and then zooming out until the curve is visible

In this activity, students compare linear and exponential growth in a context involving simple and compound interest. The initial balances are chosen so that the two options stay pretty close for small values of time. The intersection of their graphs is far enough from 0 that it is not easily noticed with only a few calculations. The graph for simple interest is linear. The graph for compound interest is exponential, but it is relatively flat for small values of time. As the domain values increase, students may notice that the values of the two options get closer and closer, or they may notice from the graph that the gap between the two graphs gets smaller.

Look for students who make different choices for the investment option, as the better option would depend on the length of investment, which is unspecified. As in the case of the genies' offers in the opening lesson, simple interest is better if the investment term is short, but compound interest becomes increasingly more favorable as time passes. Some students may not recognize this until they graph the two functions in the last question. Identify students who decide to change their earlier choice and can defend the change. Ask them to share later.

Arrange students in groups of 2. Encourage students to think quietly about the questions before conferring with their partner. Provide access to graphing technology.

Students may have trouble choosing an option without additional information. Ask them to think about what might make sense for their own family or to give circumstances that would justify a choice.

Consider surveying the class to see the choices students made. Select students who made different choices to explain their responses, starting with those who opted for the bonds. Display their reasoning and graphs for all to see. If no students consider a time frame beyond 8 or 9 years, ask students which option would be better if the money could be left alone for 20 years. Discuss questions such as:

• How does the fee for the savings account affect the function? (It reduces the account balance, at the beginning, by $20. In the equation, there is a subtraction of 20.)
• Where can we see the fees on the graph? (The vertical intercept of the graph for the savings account is at 980, which is 20 less than 1,000.)
• When might the bonds be the better investment, if ever? (When the investment is shorter than a decade, as that is when the savings account surpasses it.)
• When might the savings account be the better investment, if ever? (When it is left for more than 10 years, after the compounding effects of interest make up for the initial fees.)

Point out that the exponential function here (the balance of the savings account) has a relatively slow rate of growth. It takes it a relatively long time before it overtakes the linear function, but it eventually does.

This activity prompts students to again compare a linear function with an exponential one, but this time without a context, and the exponential function grows much more slowly over a long period of time. Even if students predict that the exponential function will grow more quickly because it is exponential, they still need to decide which one reaches 2,000 first. To do that, students may try:

• continuing the table of values with increasingly larger values
• using graphing technology
• finding when \(f(x) = 2,\!000\) and substituting this value (\(x=1,\!000\)) into \(g(x)\)

Making graphing and spreadsheet technology available gives students an opportunity to choose appropriate tools strategically (MP5).

Present the two equations that define two functions \(f\) and \(g\): \(f(x) = 2x\) and \(g(x) = (1.01)^x\). Give students a moment to share what they notice and wonder about the functions. Ask questions such as:

• What is happening in the first function? What about in the second function?
• Which function do you think will reach a value of 2,000 first?

Select students who used contrasting approaches to share. The exponential function \(g\) grows sufficiently slowly that it looks like it will not catch up with or ever overtake the linear function \(f\). This is true for a table of values as well as using a graph. Invite students who used contrasting methods to share, in the order shown in the Activity Narrative.

Emphasize that the table needs to be continued for a long time to identify when the values of \(g\) become greater than those of \(f\). Similarly, the window of the graph needs to be chosen carefully. A very efficient method is to identify that \(f(1,\!000)=2,\!000\) and then evaluate \(g(1,\!000)\). Since \(g(1,\!000)\) is much greater than 2,000, \(g\) reaches 2,000 first.

If not already illustrated by students who used graphing, show this dynamic sketch and zoom out:

Though for quite a while it doesn't seem like the values of \(g\) would ever catch up with those of \(f\), if the growth is allowed to take place long enough, exponential eventually surpasses linear.