Students work independently on the Think About It problem. This problem asks students to interpret the meaning of each piece of the two equations. My students are usually able to answer the questions fairly quickly. We discuss which variables are independent and which are dependent. In this unit, I don't use the word 'intercept,' but students are starting to internalize what the y-intercept in an equation represents, and how it impacts the graph and values of an equation.
Later in this lesson, students will be writing equations given real life situations using what we know about identifying 2 variables and how they are related.
To start the Intro to New Material section, I ask students what the first example is asking us to do. Students identify the information that is given, identify the variables, and then also the relationship between the variables. At this point it can be helpful to construct an input/output table, so that students can see the relationship between the two variables.
In the second example, students will need to construct the equation on their own. The equation has an initial value, which can be tricky for students. I have students brainstorm other instances where there might be a starting amount. After they do so, we talk through the pieces of the equation. It's useful to have students test the equation we create. I ask them how much Daisy has after 2 months in her account. We then substitute 2 into the equation and make sure that we get $280 as our value.
I have students complete the check for understanding problem. Normally, I have students work in partners before completing a written CFU. However, I use this problem to determine if students are ready to move on to partner practice or if I should guide them through more examples.
I am asking:
After 10 minutes of partner practice time, students complete the Check for Understanding problem independently. I put a student response on the document camera and the class gives feedback on the work that is displayed.
Students work on the Independent Practice problem set. If students are having trouble, I have them continue to create input/output tables, as it helps them to make sense of the relationship between the variables.
The student work sample here showed me that I needed to work with students to be more precise in how they defined their variables. This particular student was not being precise enough.
After independent work time, I have students share out anything that was difficult for them. They can ask for help or clarification from their peers. My role in this discussion is as facilitator - I keep the conversation moving, if needed, but I want students to drive the discussion.
After a few students have the opportunity to get clarification from the class, I then ask students to help me create an exemplar definition for the variables in problem 4. I want to drive home that defining a variable as m = money is not precise enough. We work together to craft strong definitions for the variables.
Students work on the Exit Ticket independently to close the lesson.