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Unit 5, Lesson 5

Using Function Notation to Describe Rules (Part 2)

Algebra 1

5.1

Warm-up

Standards Alignment

Building On

Addressing

Building Toward

Instructional Routines

None

Materials

None

Activity Narrative

This Warm-up refreshes the idea of evaluating and solving equations, preparing students for the main work of the lesson. It reminds students that to solve a variable equation is to find one or more values for the variable that would make the equation true. In subsequent activities, students will work with equations in function notation to find unknown input or output values.

Launch

None

Activity

None

Consider the equation .

What value of would make the equation true when:
1. is 7?
2. is 100?
What value of would make the equation true when:
1. is 12?
2. is 60?

Be prepared to explain or show your reasoning.

Student Response

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Building on Student Thinking

Activity Synthesis

Invite students to share their response and strategy for answering the questions.

To find the values of in the second set of questions, some students may have guessed and checked, but many students should have recognized that they could solve the equations for (either before or after substituting the value of ). If no students mentioned solving the equations, bring it to their attention.

Remind students that to solve is to find the value of that makes the equation true.

5.2

Activity

Instructional Routines

5 Practices

Materials

None

Activity Narrative

In this activity, students work with rules of functions that arise from situations and continue to make connections between different representations of functions. They use rules to evaluate functions and interpret the input and output values in context. For instance, students see that represents the cost of using the service 1 month beyond the trial period, and find its value by computing .

Students also use rules of functions to solve for an unknown input value. For example, given the rule and the statement , they work to find a value of that makes true. Monitor for students who use these strategies:

Guessing and checking
Analyzing the graph of and identifying the -value when is 280
Reasoning that a budget of \$280 means that only \$30 is available for additional months, and at \$10 per month, it means 3 additional months of service.
Solving algebraically

Plan to have students present in this order to support moving students toward more precise algebraic thinking.

5.3

Activity

Optional

Instructional Routines

Graph It MLR8: Discussion Supports

Materials

To Gather

Graphing technology

Activity Narrative

In this optional activity, students learn to use graphing technology to graph an equation in function notation, evaluate the function at a specific input value, create a table of inputs and outputs, and identify the coordinates of the points along a graph. They also revisit how to set an appropriate graphing window.

In the digital version of the activity, students use an applet to find precise function values. The applet allows students to click on the graph of a function to find precise coordinate pairs. If available, use the digital version to increase precision and allow students to focus on the notation rather than estimation.

Lesson Synthesis

Refer back to the activity about gaming consoles. Display the two graphs for all to see.

Ask students to use the graphs to find:

The values of and . ( is a little more than 300.)
The solutions to and . ( does not happen for any value. when is about 45.)

(Hold off on discussing students’ responses.)

<p>Two functions. months after free trial and cost (dollars).</p>

Next, display the two equations for all to see.

Ask students to use the equations to find the same four values as they have just found using the graphs.

Invite students to compare and contrast the graphical and algebraic approaches for finding unknown inputs and outputs of linear functions. Discuss questions such as:

“How easy is it to use the graph of to find an output value, such as ? What about using the graph to find an input value, such as the in ?” (Both are fairly straightforward, but may not be very precise. Some estimation was necessary. It was very easy to see that there is no solution to .)
“How easy is it to use the rule to find an output value, such as ? What about finding an input value, such as the in ?” (Both are fairly simple, but if the rule or the given input or output involves numbers that are harder to compute by hand, it might be more complicated.)

If students did the optional activity on using graphing technology, ask students to identify some ways that technology could help to find unknown input and output values of a function.

to access Cool-down.

Student Lesson Summary

Knowing the rule that defines a function can be very useful. It can help us to:

Find the output when we know the input.
- If the rule defines , we can find by evaluating .
- If defines function , we can find by evaluating .

Create a table of values.

Here are tables representing functions and :


0	10
1	15
2	20
3	25
4	30


0	3
1
2	2
3
4	1

Graph the function. The horizontal values represent the input, and the vertical values represent the output.

For function , the values of are the vertical values, which are often labeled , so we can write . Because is defined by the expression , we can graph .

For function , we can write and graph .

Graph of a line, origin O. X axis from negative 4 to 4, by 2s. Y axis from negative 20 to 20, by 20s. Line passes through points negative 4 comma negative 10, negative 2 comma 0, 0 comma 10, and 2 comma 20.
Find the input when we know the output.

Suppose the output of function is 65 at some value of , or , and we want to find out what that value is. Because is equal to , we can write and solve for .

Each function here is a linear function because the value of the function changes by a constant rate and its graph is a line.

Launch

Arrange students in groups of 2.

As a class, read the opening paragraphs and the first question in the activity statement. Ask students, “What do and represent in this situation? What does the 1 in each expression mean?” Give students a minute of quiet think time and then time to discuss their thinking with their partner.

Invite students to share their interpretations, in particular the meaning of “trial period.” Many subscription services provide a trial period in which the service is free before users are charged for their time afterward. Before students begin the activity, make sure they see that an input value of 1 represents 1 month of the service after the trial period.

Also tell students that the providers will charge a “prorated” amount for canceling in the middle of the month. For example, if the service is canceled on the 15th of the month, the user will be charged for half of the usual month’s fees.

Select groups with different strategies, such as those described in the Activity Narrative, to share later.

Activity

None

Elena is looking at options for video game consoles. Every purchase of a console comes with a 1-month free trial period of the online gaming service. A store offers two options for purchasing a console and use of the gaming service. These functions represent the total cost for each option:

Option A:

Option B:

In each function, the input, , represents the number of months Elena uses the online gaming service after the free trial period.

Elena decides to find the values of and and compare them. What are those values?
When planning her budget, she compares and . What are those values?
Describe each option in words.
Graph each function on the same coordinate plane. Then, explain which option you think she should choose.
Elena budgeted only \$280 for the console and online service. She thought, “I wonder how many months I could have for \$280 if I go with Option B” and wrote . What is the answer to her question? Explain or show how you know.

Student Response

to access Student Response.

Building on Student Thinking

Students may question if is a function at all because unlike or other function rules they have seen so far, is defined with a constant instead of an expression containing the dependent variable. Or they may wonder why has the same value no matter what the input value is. Ask students to recall the definition of function and to consider whether each input value gives only one output value. Because it does, even though it is always the same output value, is still a function.

Activity Synthesis

The purpose of this discussion is to explore linear functions that represent situations and examine how to solve functions when the input or output value is known.

Select students to share their interpretations of the two options. Make sure students see that:

The equation tells us that, regardless of the number of months the service is used, , the cost, is always 600.
The in the rule of tells us that each extra month of service after the trial period costs \$10, and that there is a \$250 price for the console.

Explain to students that the two functions here are linear functions because the output of each function changes at a constant rate relative to the input. Option B involves a rate of change of \$10 per additional month after the trial period, while Option A has a rate of change of \$0 per additional month after the trial period.

Then, ask students how they went about graphing the functions. Students are likely to have plotted some input-output pairs of each function. If no students mention identifying the slope and vertical intercept of each graph, ask them about it.

Invite previously selected groups to share how they solved the last question. Sequence the discussion of the strategies by the order listed in the Activity Narrative. If possible, record and display their work for all to see.

Connect the different responses to the learning goals by asking questions, such as:

“How did the console price show up in your work of finding the number of months Elena could get for \$280?” (It is the constant 250 in the function. I subtracted that from the budgeted \$280 to see that there is \$30 left for additional months.)
“How would these methods change if Elena had budgeted \$300?” (I would replace the 280 with 300 in my equation and solve the new equation for .)
“Why is the graph of a horizontal line?” ( is the output of function and is represented by vertical values on a coordinate plane. The vertical values are typically labeled with the variable , so we can write and graph to represent function .)
“How can we see the slope and intercept of the graph of Option B in the function?” ( is the output of function and is represented by vertical values on a plane. We can write or to see that the slope is 10 and the -intercept is 250.)

If time permits, invite students to share which option they believe Elena should choose and why.

Representation: Internalize Comprehension. Use color coding and annotations to highlight connections between representations in a problem. For example, color code the two options and the graphs that represent the linear functions of each.
Supports accessibility for: Visual-Spatial Processing

Launch

Display the equation for all to see. Ask students,

“How would you go about finding the value of ?” (Substitute 1.482 into the expression and evaluate, or use the graph of to estimate the -value when is 1.482.)
“How would you find the value of that makes true? Try solving the equation.” (Solve , or use the graph of to estimate the -value when is 103.75.)

Explain that while it’s possible to use a graph to find or estimate unknown input or output values, it is hard to be precise when using a hand-drawn or printed graph. We can evaluate the expression or solve the equation algebraically, but computing by hand can get cumbersome (though a calculator can take care of the most laborious part). Let’s see how graphing technology can help us!

The digital version of this activity includes instructions for using the Desmos Math Tool to graph an equation, change the graphing window, and find the output of a function for a given input. If students will be using different graphing technology, consider preparing alternate instructions.

Demonstrate how to graph , change the graphing window, and find on the graph.
Ask students to find the value of when is 100. Then, demonstrate some ways (other than approximating visually) to solve for given :
1. Trace the line. Coordinates appear as we move along the line. Stop when the -coordinate is 100, and see what the -coordinate is.
2. Type in the expression list. A horizontal line appears. Find the intersection of this line and the graph of .

Ask students to use one or both of these strategies to complete the activity.

Action and Expression: Provide Access for Physical Action. Support effective and efficient use of tools and assistive technologies. To use graphing technology, some students may benefit from a demonstration or access to step-by-step instructions.
Supports accessibility for: Organization, Memory, Attention

Activity

None

The function is defined by the equation . Use graphing technology to:

Find the value of each expression:
Solve each equation:

Student Response

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Lesson 5

Using Function Notation to Describe Rules (Part 2)

Warm-up

Standards Alignment

Building On

Addressing

HSA-REI.A.1

Building Toward

Instructional Routines

Materials

Activity Narrative

Launch

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Activity

Instructional Routines

Materials

Activity Narrative

Activity

Instructional Routines

Materials

To Gather

Activity Narrative

Lesson Synthesis

Student Lesson Summary

Launch

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Launch

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Standards Alignment

Building On

Addressing

HSF-IF.A.2

HSF-IF.B.4

Building Toward

Standards Alignment

Building On

Addressing

Building Toward

HSF-IF.A.2

HSF-IF.B.4

HSF-IF.C.7