Navigation

9-12 Geometry Unit 1 Lesson 22

Gradeband

K-5 Math 6-8 Math •9-12 Math

Course

Algebra 1 •Geometry Algebra 2 Extra Support Materials for Algebra 1

Unit

•Unit 1 Unit 2 Unit 3 Unit 4 Unit 5 Unit 6 Unit 7 Unit 8

Modeling Prompts

Lesson

Lesson 1 Lesson 2 Lesson 3 Lesson 4 Lesson 5 Lesson 6 Lesson 7 Lesson 8 Lesson 9 Lesson 10 Lesson 11 Lesson 12 Lesson 13 Lesson 14 Lesson 15 Lesson 16 Lesson 17 Lesson 18 Lesson 19 Lesson 20 Lesson 21 •Lesson 22

K-5
6-8
9-12

Algebra 1
Geometry
Algebra 2
Extra Support Materials for Algebra 1

Integrated Math 1
Integrated Math 2
Integrated Math 3

Unit 1
Unit 2
Unit 3
Unit 4
Unit 5
Unit 6
Unit 7
Unit 8

Modeling Prompts

Lesson 1
Lesson 2
Lesson 3
Lesson 4
Lesson 5
Lesson 6
Lesson 7
Lesson 8
Lesson 9
Lesson 10
Lesson 11
Lesson 12
Lesson 13
Lesson 14
Lesson 15
Lesson 16
Lesson 17
Lesson 18
Lesson 19
Lesson 20
Lesson 21
Lesson 22

Lesson | Practice | Loading...

Sign in to access protected content and invite other educators

Sign in using your existing Kendall Hunt account. If you don’t have one, create an educator account.

Curriculum

IM K-5 Math
IM 6-8 Math
IM 9-12 Math

Professional Learning

Illustrative Mathematics® has operated as an independent 501(c)3 non-profit organization since 2013.

©2024 Illustrative Mathematics®. Licensed under CC BY-NC 4.0.

The Illustrative Mathematics name and logo are not subject to the Creative Commons license and may not be used without the prior and express written permission of Illustrative Mathematics.

This site includes public domain images or openly licensed images that are copyrighted by their respective owners. Openly licensed images remain under the terms of their respective licenses. See the image attribution section for more information.

Settings

Audience

family

Not all roles available for this page.

Assessment Access

Sign in to view assessments and invite other educators

Sign in using your existing Kendall Hunt account. If you don’t have one, create an educator account.

teacher
student
family

Unit 1, Lesson 22

Now What Can You Build?

Geometry

Practice

Problem 1

This design began from the construction of a regular hexagon. Name 2 pairs of congruent figures.

<p>Hexagon with line segments.</p>

Problem 2

This design began from the construction of a regular hexagon. Describe a rigid motion that will take the figure to itself.

<p>Regular hexagon with center I and vertices A B C D E F. Segment F C contains points H I G. Segment A E passes through H. Segment B D passes through G. Segment B E passes through I. Triangles I H E and I G B are highlighted.</p>

Problem 3

For

Lesson 21: One Hundred Eighty

Noah starts with triangle and makes 2 new triangles by translating to and by translating to . Noah thinks that triangle is congruent to triangle . Do you agree with Noah? Explain your reasoning.

<p>Large triangle BFE has small triangle ADC at its midpoints.</p>

Problem 4

ForLesson 21: One Hundred Eighty

In the image, triangle is congruent to triangle and triangle . What are the measures of the 3 angles in triangle ? Show or explain your reasoning.

<p>Trapezoid DECB base BC and point A midpoint of DE making triangle ABC. Angle D is 45 degrees and angle BAC is 75 degrees.</p>

Problem 5

ForLesson 20: Transformations, Transversals, and Proof

In the figure shown, Angle 3 is congruent to Angle 6. Select all statements that must be true.

<p>Parallel lines f and g cut by a transversal, creating angles 1, 2, 3 and 4 at intersection of lines g and transversal, and creating angles 5, 6, 7 and 8 at intersection of lines f and transversal.</p>

Lines and are parallel.
Angle 2 is congruent to Angle 6.
Angle 2 and Angle 5 are supplementary.
Angle 1 is congruent to Angle 7.
Angle 4 is congruent to Angle 6.

Problem 6

ForLesson 20: Transformations, Transversals, and Proof

In this diagram, point is the midpoint of segment , and is the image of by a rotation of around .

Explain why rotating using center takes to .
Explain why angles and have the same measure.

<p>Point M is the midpoint of segment AC and B Prime is the image of B by a rotation of 180 degrees around Point M.</p>

Problem 7

ForLesson 19: Evidence, Angles, and Proof

Lines and are perpendicular. The dashed rays bisect angles and .

Select all statements that must be true:

<p>Lines AB and BC are perpendicular and meet at point B. Dashed rays BF and BE bisect angles ABD and CBD.</p>

Angle is congruent to angle .

Problem 8

ForLesson 19: Evidence, Angles, and Proof

Lines and meet at point .

Give an example of a rotation using an angle greater than 0 degrees and less than 360 degrees that takes both lines to themselves. Explain why your rotation works.

<p>Lines AD and EC intersect at point B.</p>

Problem 9

ForLesson 18: Practicing Point-by-Point Transformations

Draw the image of triangle after this sequence of rigid transformations.

Reflect across line segment .
Translate by directed line segment , which starts at .

<p>Triangle ABC with directed line segment <em>u</em> formed by ray BA.</p>

Problem 10

ForLesson 18: Practicing Point-by-Point Transformations

Draw the image of figure after a clockwise rotation around point using angle and then a translation by directed line segment .
Describe another sequence of transformations that will result in the same image.

<p>A figure CAST as a rectangle with missing side CT on the bottom.</p>

Angle is obtuse.

Angle is congruent to angle .

Angle is congruent to angle .

Angle is 45 degrees.