Twa kɔ nsɛm atitiriw so
Log in
Sign up for FREE
arrow_back
Laabri

Illustrative Mathematics - Geometry - Unit 6 - Lesson 3

star
star
star
star
star
Last updated over 3 years ago
11 Nsɛmmisa
1
G.CO.2
G.CO.5
+2
1
G.CO.2
G.CO.5
+2
1
G.CO.2
G.CO.5
+2
1
G.CO.2
G.CO.5
+2
1
G.CO.2
G.CO.5
+2
Asemmisa {{asɛmmisaAhyɛnsode}}
1.

Complete the table and determine the rule for this transformation.

Asemmisa {{asɛmmisaAhyɛnsode}}
2.

Write a rule that describes this transformation.

Asemmisa {{asɛmmisaAhyɛnsode}}
3.

Select all the transformations that produce congruent images.

1
Asemmisa {{asɛmmisaAhyɛnsode}}
4.
1
Asemmisa {{asɛmmisaAhyɛnsode}}
5.
1
Asemmisa {{asɛmmisaAhyɛnsode}}
6.
1
Asemmisa {{asɛmmisaAhyɛnsode}}
7.
1
Asemmisa {{asɛmmisaAhyɛnsode}}
8.
1
Asemmisa {{asɛmmisaAhyɛnsode}}
9.
Asemmisa {{asɛmmisaAhyɛnsode}}
10.

Reflect triangle ABC over the line x=-2. Call this new triangle A'B'C'. Then reflect triangle A'B'C' over the line x=0. Call the resulting triangle A"B"C".

Describe a single transformation that takes ABC to A"B"C".

Asemmisa {{asɛmmisaAhyɛnsode}}
11.

In the construction, A is the center of one circle, and B is the center of the other.

Explain why segments AC, BC, AD, BD, and AB have the same length.

This lesson is from Illustrative Mathematics. Geometry, Unit 6, Lesson 3. Internet. Available from https://curriculum.illustrativemathematics.org/HS/teachers/2/6/3/index.html ; accessed 29/July/2021.

IM Algebra 1, Geometry, Algebra 2 is © 2019 Illustrative Mathematics. Licensed under the Creative Commons Attribution 4.0 International License (CC BY 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 consent of Illustrative Mathematics.

These materials include 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.