Unit 2, Lesson 11
Side-Side-Angle (Sometimes) Congruence (Optional)
Integrated Math 1
11.1
Warm-up
Notice and Wonder: Congruence Fail
Instructional Routines
Notice and WonderMaterials
NoneActivity Narrative
The purpose of this Warm-up is to elicit the idea that not every set of three pairs of congruent corresponding parts will guarantee triangle congruence, which will be useful when students explore Side-Side-Angle Triangle Congruence in a later activity. While students may notice and wonder many things about these statements and images, the fact that the triangles are not congruent despite having so many corresponding congruent parts is the important discussion point.
Launch
First, display the congruence statements without the image for all to see. 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.
Next, display the image for all to see. Give students 1 minute to add to their lists.
Activity
NoneWhat do you notice? What do you wonder?
In triangles
- Angle
is congruent to angle . - Segment
is congruent to segment . - Segment
is congruent to segment .
Activity Synthesis
Ask students to share the things they noticed and wondered. Record and display their responses for all to see. If possible, record the relevant reasoning on or near the image. After all responses have been recorded without commentary or editing, ask students, “Is there anything on this list that you are wondering about now?” Encourage students to respectfully disagree, ask for clarification, or point out contradicting information. If students don’t express surprise that there are so many congruent parts yet the image shows triangles that are not congruent, ask students to discuss this idea.
Lesson Synthesis
The goal of this discussion is for all students to understand this statement: “When it is given that two pairs of corresponding sides are congruent and a pair of corresponding angles that are not between the sides are congruent, that is enough to guarantee triangle congruence if the longer side is opposite the given angle, but not enough information if the shorter side is opposite the given angle.”
Encourage students to sketch pictures of the ambiguous case, and the unambiguous case, and label them in ways that help them understand. Invite students to share their sketches with the class, and work as a class to annotate and understand the sketches. Make sure to discuss the case of the right triangle and how we know the hypotenuse must be the longest side.
A possible sketch might look like this:
Unique!
Unique!
Unique!
Not unique!
Student Lesson Summary
Imagine we know triangles have 2 pairs of corresponding, congruent side lengths and 1 pair of corresponding, congruent angles that is not between the given sides. What can we conclude?
Sometimes this is not enough information to determine that the triangles made with those measurements are congruent. These triangles have 2 pairs of congruent sides and 1 pair of congruent angles, but they are not congruent triangles.
If the longer of the 2 given sides is opposite the given angle, though, that does guarantee congruent triangles. In a right triangle, the longest side is always the hypotenuse. If we know the hypotenuse and the leg of a right triangle, we can be confident they are congruent.