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Unit 3, Lesson 5

Splitting Triangle Sides with Dilation (Part 1)

Geometry

5.1

Warm-up

Standards Alignment

Building On

Addressing

Building Toward

Instructional Routines

Notice and Wonder

Materials

None

Activity Narrative

The purpose of this Warm-up is to elicit conjectures about lines connecting the midpoints of sides in triangles, which will be useful when students formalize and prove these conjectures in later activities in this lesson. While students may notice and wonder many things about these images, lengths, angles, and parallel lines are the important discussion points. This prompt gives students opportunities to see and make use of structure (MP7). The specific structure they might notice is that triangles formed by segments connecting midpoints are dilations of the larger triangle, and have several of the properties of dilations.

Launch

Arrange students in groups of 2. Display the image. Ask students to think of at least one thing they notice and at least one thing they wonder. Give students 1 minute of quiet think time and then 1 minute to discuss with their partner the things they notice and wonder.

Activity

None

Here’s a triangle with midpoints , and . What do you notice? What do you wonder?

<p>Triangle A B C with midpoints M, L and N drawn forming a triangle.</p>

Activity Synthesis

Ask students to share the things they noticed and wondered. Record and display their responses, without editing or commentary. If possible, record the relevant reasoning on or near the image. Next, ask students, “Is there anything on this list that you are wondering about now?” Encourage students to observe what is on display and to respectfully ask for clarification, point out contradicting information, or voice any disagreement.

If the possibility of the segments connecting midpoints being parallel to a side of the triangle does not come up during the conversation, ask students to discuss this idea.

5.2

Activity

Instructional Routines

MLR2: Collect and Display

Materials

None

Activity Narrative

The purpose of this activity is for students to practice using the definitions and properties of dilations in proofs. Students first describe the dilation by finding its center and scale factor, then convince their partner informally that it’s a dilation, and finally use the definition of dilation to make sure that the triangles really fit all the requirements of being a dilation. Then students convince a partner followed by a skeptic that the triangles have a specific property of dilations. They get an opportunity to write a proof that would convince a skeptic that the triangles really are dilations and, therefore, that they have a property of dilations.

While writing their proof, students must construct a viable argument (MP3).

This activity uses the Collect and Display math language routine to advance conversing and reading as students clarify, build on, or make connections to mathematical language.

Launch

Arrange students in groups of 2. Give students quiet work time and then time to share their work with a partner.

Use Collect and Display to create a shared reference that captures students’ developing mathematical language. Collect the language that students use to refer to the lengths of segments and . Display words and phrases, such as “corresponding,” “ratio,” and “In a dilation, you get the same number when you divide the side lengths.”

Representation: Internalize Comprehension. Use color coding and annotations to highlight connections between representations in a problem. For example, color code the two triangles in different colors or draw the triangles separated.
Supports accessibility for: Visual-Spatial Processing

5.3

Activity

Instructional Routines

5 Practices

Materials

None

Activity Narrative

Students get an additional opportunity to draw conclusions about segments dividing two sides of a triangle proportionally. In this activity, students do not need to formally prove their conjectures. The main focus of this activity is on spotting dilations and recognizing the properties of segments that divide two sides of a triangle proportionally.

Monitor for students who use these approaches, in order of precision:

Write, “It’s a dilation so the line is parallel”
Name the center and scale factor of the dilation
Use aspects of the definition of dilation, such as that and have to be collinear

Lesson Synthesis

The purpose of this discussion is for students to recognize that triangles formed by connecting midpoints of sides of a triangle are a special case of dilating a triangle using one vertex as the center.

Ask students why it’s useful to prove that a shape is a dilation of another shape. Follow up by asking, “What specifically does it tell you about the shapes if one is a dilation of the other?” (Lines in the dilated figure are parallel to lines in the original figure. Corresponding angles in the two figures are congruent. Corresponding lengths can be longer or shorter according to the same ratio given by the scale factor. Distances in the two figures are in the same proportion.)

Ask students what they need to look for to prove that one figure is a dilation of the other, using the definition of dilation. Students may refer to the fact that the distance from the center to points in the image need to be times the distance from the center to corresponding points in the original figure. Ask students if the points could be anywhere as long as the distance is correct. Support students to describe how the points in the image need to be on the same ray from the center as the points in the original figure. Invite multiple students to explain why the three small triangles from the image in the Warm-up are dilations of the original triangle. Prompt students to refer to both the distances to the center and the rays from the center of the dilation.

to access Cool-down.

Student Lesson Summary

Let's examine a segment whose endpoints are the midpoints of 2 sides of the triangle. If is the midpoint of segment and is the midpoint of segment , then what can we say about and triangle ?

Segment is parallel to the third side of the triangle and half the length of the third side of the triangle. For example, if , then . This happens because the entire triangle is a dilation of triangle , with a scale factor of .

<p>Triangle A B C. Point E is midpoint of segment B A. Point D is midpoint of segment B C. Segment E D drawn. On both segments A E and E B, two tick marks. On both segments B D and C D, one tick mark.<br>
</p>

In triangle , segment divides segments and proportionally. In other words, =. Again, there is a dilation that takes triangle to triangle , so is parallel to , and we can calculate its length using the same scale factor.

<p>Triangle A B C. Point G on segment A B. Point F on segment B C. Directed line segments A C and G F drawn with arrows point towards Points C and F.<br>
</p>

Activity Synthesis

The goal of this activity synthesis is for students to see the value of proving that one figure is a dilation of the other.

Direct students’ attention to the reference created using Collect and Display. Ask students to share what they learned about the relationship between segment and segment . Invite students to borrow language from the display as needed. As they respond, update the reference to include additional phrases. (For example, the display may have “dividing the side lengths is always the same” already on it and can be updated with the more precise phrase “corresponding segment lengths have the same ratio.”)

Invite multiple students to share how they know that triangle is a dilation of triangle . Play the role of skeptic, or invite other students to play the role of skeptic. For example, you may ask,

“How do you know that is the center?” (Because it does not move after the dilation.)
“How do you know that the scale factor is 2?” (Because and are midpoints of the sides, is twice as far from as is, and is twice as far from as is.)

If the explanations for why triangle is a dilation of triangle are vague, discuss some details of a good proof. Discuss the parts of the definition of dilation that students need to account for in their explanations and some of the reasoning they could use.

Ask students what else they can say for sure must be true, now that they know for sure that is a dilation of . Record for all to see. ( is parallel to or the same line, , angle is congruent to angle .) If students don’t mention parallel lines or congruent angles, ask them to look at their reference chart to see what else they can say must be true.

Emphasize to students that we now have multiple ways to prove that lines are parallel to each other:

Use corresponding, alternate interior, or other angle pairs when the lines are cut by a transversal.
Prove that the lines correspond under a translation or rotation.
Prove that the lines correspond under a dilation.

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Lesson 5

Splitting Triangle Sides with Dilation (Part 1)

Warm-up

Standards Alignment

Building On

Addressing

Building Toward

HSG-CO.C.10

Instructional Routines

Materials

Activity Narrative

Launch

Activity

Activity Synthesis

Activity

Instructional Routines

Materials

Activity Narrative

Launch

Activity

Instructional Routines

Materials

Activity Narrative

Lesson Synthesis

Student Lesson Summary

Student Response

Building on Student Thinking

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Launch

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Standards Alignment

Building On

HSG-SRT.A.1

Addressing

HSG-CO.C.10

Building Toward

Standards Alignment

Building On

HSG-CO.C.10

HSG-SRT.A.1

Addressing

HSG-SRT.B.4

Building Toward