More Symmetry: IM Geo.1.16
[url=https://im.kendallhunt.com/HS/teachers/2/1/16/preparation.html]“More Symmetry”[/url] from IM Geometry © 2019 [url=https://www.illustrativemathematics.org/]Illustrative Mathematics[/url]. Licensed under the [url=https://creativecommons.org/licenses/by/4.0/]Creative Commons Attribution 4.0[/url] license.
Table of Contents
- Geo.1.16 Lesson
- IM Geo.1.16 Lesson: More Symmetry
- Geo.1.16 Practice
- IM Geo.1.16 Practice: More Symmetry
IM Geo.1.16 Lesson: More Symmetry
Which one doesn’t belong?
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[/img][br][/td][/tr][tr][td]C:[br][img]data:image/png;base64,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[/img][br][/td][td]D:[br][img]data:image/png;base64,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[/img][/td][/tr][/table]
Determine all the angles of rotation that create symmetry for the shape your teacher assigns you. Create a visual display about your shape. Include these parts in your display:
[list][*]the name of your shape[/*][*]the definition of your shape[/*][*]drawings of each rotation that creates symmetry[/*][*]a description in words of each rotation that creates symmetry, including the center, angle, and direction of rotation[/*][*]one non-example (a description and drawing of a rotation that does [i]not[/i] result in symmetry)[/*][/list]
Finite figures, like the shapes we have looked at in class, cannot have translation symmetry.
[size=150]But with a pattern that continues on forever, it is possible. Patterns like this one that have translation symmetry in only one direction are called [i]frieze patterns.[/i][br][/size][br]What are the lines of symmetry for this pattern?[br]
What angles of rotation produce symmetry for this pattern?[br]
What translations produce symmetry for this pattern if we imagine it extending horizontally forever?[br]
[size=150][br]Clare says, "Last class I thought the parallelogram would have reflection symmetry. I tried using a diagonal as the line of symmetry but it didn’t work. So now I’m doubting that it has rotation symmetry."[br][br]Lin says, "I thought that too at first, but now I think that a parallelogram does have rotation symmetry. Here, look at this."[/size]
How could Lin describe to Clare the symmetry she sees?
IM Geo.1.16 Practice: More Symmetry
For each figure, identify any angles of rotation that create symmetry.
A triangle has rotation symmetry that can take any of its vertices to any of its other vertices.
Select [b]all [/b]conclusions that we can reach from this.
Here is a beautiful flower.
Select [b]all [/b]the angles of rotation that produce symmetry for this flower.[br][img]data:image/png;base64,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[/img]
Identify any lines of symmetry the figure has.
A triangle has a line of symmetry. Select [b]all [/b]conclusions that [i]must [/i]be true.
Here are 4 triangles that have each been transformed by a different transformation.
Which transformation is [i]not[/i] a rigid transformation?