Unit 4, Lesson 4
Comparing Quadratic and Exponential Functions
Integrated Math 2
4.1
Warm-up
Standards Alignment
Building On
6.EE.A.1
Write and evaluate numerical expressions involving whole-number exponents.
Addressing
Building Toward
HSF-LE.A.3
Observe using graphs and tables that a quantity increasing exponentially eventually exceeds a quantity increasing linearly, quadratically, or (more generally) as a polynomial function.
Instructional Routines
NoneMaterials
NoneActivity Narrative
In this Warm-up, students compare the values of exponential expressions, by making use of their structure (MP7). The reasoning here prepares them to think about exponential growth later in the lesson.
Students should recognize that and . Deciding whether or is greater requires some estimation or further reasoning using properties of exponents.
For example, some students may recognize that and , so , which is 256. Because is greater than , it follows that is greater than 256 and therefore greater than .
As students discuss their thinking, listen for strategies that involve using properties of exponents or thinking about the structure of the expressions.
Launch
Arrange students in groups of 2. Give students a moment of quiet think time and then time to share their thinking with a partner.
In order to encourage students to rely on the structure of the expressions, they should not use a calculator to evaluate the expressions in this activity.
Activity
NoneList these quantities in order, from least to greatest, without evaluating each expression. Be prepared to explain your reasoning.
Activity Synthesis
Select students to share their responses and reasoning. Highlight explanations that show that the expressions can be compared by analyzing their structure (as in the example in the Activity Narrative), and that it is not necessary to know their exact values to put the expressions in order.
4.2
Activity
Instructional Routines
Poll the ClassMaterials
To Gather
Graphing technologyActivity Narrative
This activity prompts students to contrast quantities that grow exponentially and quadratically, by writing equations and creating tables of values. Before students begin working, they are asked to make an estimate of the number of squares in each pattern at Step 5 and Step 10. Making a reasonable estimate and comparing a computed value to one’s estimate is often an important aspect of making sense of problems (MP1). Later from the tables, students notice that the output of the exponential function eventually outgrows that of the quadratic function. In the next activity, they will think further about whether this is always the case.
If students opt to use spreadsheet or graphing technology, they practice choosing appropriate tools strategically (MP5).
Launch
Display the image of the patterns for all to see, and ask students to read the description of how the patterns grow. Ask students to predict which pattern will have more small squares in Step 5.
Then, ask students to predict which pattern will have more small squares in Step 10. Poll the class to collect their predictions. Display the number of students who think pattern A will have more small squares and the number who think pattern B will have more small squares.
Arrange students in groups of 2.
Some students may choose to use a spreadsheet tool to study the pattern, and subsequently to use graphing technology to plot the data. Others may wish to use a calculator to compute growth factors. Provide access to graphing technology, a scientific calculator, or devices that can run a spreadsheet tool.
4.3
Activity
Instructional Routines
5 PracticesMaterials
To Gather
Graphing technologyActivity Narrative
Students continue to compare quadratic and exponential functions in this activity. This time, they decide how to compare the functions.
Monitor for students who use different strategies to compare the functions.
- Create one or more tables of values, and compare the values of and at increasingly large values of .
- Graph the functions defined by and , and compare the graphs.
- Create one or more tables of values, calculate the growth factors at equal intervals of input, and then compare the growth factors.
Have students present in this order to support moving them from checking large values for these particular functions toward noticing a pattern that can apply to more general quadratic and exponential functions.
Making graphing or spreadsheet technology available gives students an opportunity to choose appropriate tools strategically (MP5).
Lesson Synthesis
Ask students to reflect on how they analyzed the behaviors of quadratic and exponential functions. Discuss questions such as:
- “What are some ways for comparing quadratic growth and exponential growth?” (By comparing their values in a table, by graphing the equations representing them, or by comparing the growth factors as the input increases.)
- “When we compared and , we saw the value of become greater than at . When we compared and , we saw overtaking by the time reaches 5. If we compare, say, and , will the exponential still overtake the quadratic? If so, at what value do you think it would happen? If not, why not?” (Yes. It’d probably happen when is between 15 and 20.)
Student Lesson Summary
The graphs of quadratic functions and the graphs of exponential functions with a base that is greater than 1 both curve upward. To compare the two, let’s look at the quadratic expression and the exponential expression .
A table of values shows that is initially greater than , but eventually becomes greater.
| 1 | 3 | 2 |
| 2 | 12 | 4 |
| 3 | 27 | 8 |
| 4 | 48 | 16 |
| 5 | 75 | 32 |
| 6 | 108 | 64 |
| 7 | 147 | 128 |
| 8 | 192 | 256 |
Here's why exponential growth eventually overtakes quadratic growth.
- When increases by 1, the exponential expression always increases by a factor of 2.
- The quadratic expression increases by different factors, depending on , but these factors get smaller. For example, when increases from 2 to 3, the factor is or 2.25. When increases from 6 to 7, the factor is or about 1.36. As increases to larger and larger values, grows by a factor that gets closer and closer to 1.
In general, quadratic functions change with a factor that gets closer and closer to 1 as the input to the function gets larger. Exponential functions always grow with the same factor, so if that growth factor is greater than 1, then the exponential function will eventually grow faster than any quadratic function will.