Unit 5, Lesson 3
More Movement
Integrated Math 3
3.1
Warm-up
Instructional Routines
NoneMaterials
NoneActivity Narrative
The purpose of this Warm-up is to elicit the idea that a graph can be translated horizontally and vertically on the coordinate plane in a variety of ways. One graph has a different shape than the center graph, A. This is intentional to make the point that horizontal and vertical translations change only the location of a graph and not the shape. Another important takeaway is that it is sometimes possible to describe a sequence of translations (sometimes called a transformation or rigid transformation) in different correct ways. In this case, whether the horizontal or vertical translation comes first does not change the outcome.
Launch
Arrange students in groups of 2 and display the image. Tell students that their job is to prepare to explain how to transform the graph of A to look like any of the other graphs, using horizontal and vertical translations. After 1–2 minutes of quiet work time, ask students to compare responses with their partners and decide if they are both correct, even if they are different. Follow with a whole-class discussion.
Activity
NoneHow can we translate the graph of A to match one of the other graphs?
Student Response
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Building on Student Thinking
Activity Synthesis
The purpose of this discussion is for students to describe how they see the translation(s) needed to take A to one of the other graphs. If the idea that graph D is a different shape than the other graphs does not come up during the conversation, ask students to discuss this idea with particular emphasis to the observation that since the shape does not match, there is no combination of vertical and horizontal translations that can take the graph of A to D.
Conclude the discussion by telling students that a sequence of translations is often called a transformation or, more specifically, a rigid transformation (since translations don't change the shape of the graph). In this Warm-up, we described the transformations that take the graph of A to the graphs of B, C, E, and F.
Lesson Synthesis
The purpose of this discussion is for students to express one function in terms of another using horizontal and vertical translations. Display the image from the Warm-up:
Tell students they are going to pick three of the functions and write equations for them in terms of one of the other functions. For example, . After 2 minutes of quiet work time, invite students to share their equations, recording responses for all to see and giving time for students to check each other's thinking.
Student Lesson Summary
Remember the pumpkin catapult? The function gives the height , in feet, of the pumpkin above the ground seconds after launch.
Now suppose represents the height , in feet, of the pumpkin if it were launched 5 seconds later. If we graph and on the same axes they looks identical, but the graph of is translated 5 units to the right of the graph of .
Since we know the pumpkin's height at time is the same as the height of the original pumpkin at time , we can write in terms of as .
Graph of two quadratic functions, origin O. Horizontal axis, time (seconds), scale 0 to 9 by 1’s. Vertical axis, height (feet), scale 0 to 90 by 10’s. Function h starts at the origin, goes through the vertex at (2 comma 66) and back down near (4, 0). Function k starts at (5 comma 0), goes through the vertex at (7 comma 66) and back down near (9 comma 0). The distance horizontally between the vertices of h and k is 5.
Suppose there was a third function, , where . Even without graphing , we know that the graph reaches a maximum height of 66 feet. To evaluate , we evaluate at the input , which is zero when . So the graph of is translated 4 seconds to the left of the graph of . This means that is the height, in feet, of a pumpkin launched from the catapult 4 seconds earlier.