Multiple-Choice Items:
1. Which of the following terms describes the geometric figure shown below?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMwAAAAdCAIAAABpIhQvAAACI0lEQVR4nO3awevxcADHcZSSsguxi6TIxVE5ODs6OK7clFIkl5U/wG2POMpRPT+uyj/AabtQ5ICLUgrlxBLb8xxW2rPHb0a/b8/zs8/rNLTvvuXdd7Ox/AIgzPKvJwDvD5EBcYgMiENkQBwiA+IQGRCHyIA4RAbEITIgDpEBcYgMjLpcLq/teCcyWZZlWb69XK/Xy+VSFMUXpwbfmbqE+Xxer9eHw+Gzg9yPTNnYbreVSiWRSMRiMYZhBEF4ea7wBgRB8Pl8fr+/VCqNRiPjO356uhRFsVgsWlTi8fhisfiK2cK3NB6Pw+GwEkMwGMzn89Pp1MiOn0Y2mUwCgYDlTwzD1Gq1H2AOHMdxHKdsNxqNcrns8XjUPdA0ncvleJ4/n8/PRaacLgeDgdfr1URms9lcLhdFUS4wGYqinE6nzWbTJOFwODKZzGazeWUlW61W0WhUPZzVamVZ9uPj4yeYT6fTqVarNE3ferDb7alUqt1un04nncL0VjJJklqtltvtvg2azWaPx6P+cPDGZrNZKBRSlpt0Ot3tdh/mpdBGpv7JKklSv99nWbZQKDSbzd1u95VThv/eLQZlQxCESCSSTCZ7vd7hcDA+zv3TpTq16/V6u6xTvw9moLljyvP8fr+/+6kOvftkRg4MpmU8A72V7O9RNA8DwJyebcDos0v1uEjNPO5+0ZprtYceX5OhJ5PTBPBCD/gXBhCHyIA4RAbEITIg7jeNksXrJ82mNwAAAABJRU5ErkJggg==)
A
|
Angle
|
B
|
Line
|
C
|
Line segment
|
D
|
Ray
|
2. Which statement describes two parallel lines?
A
|
Two lines that cross.
|
B
|
Two lines that make a right angle.
|
C
|
Two lines that never cross.
|
D
|
Two lines that, if they continued forever, might cross.
|
3. Which of the following describes the angle shown below?
![](data:image/png;base64,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)
A
|
Acute angle
|
B
|
Obtuse angle
|
C
|
Right angle
|
D
|
Straight angle
|
4. Which of the following shapes does not have two sets of parallel lines?
A
|
Parallelogram
|
B
|
Rectangle
|
C
|
Square
|
D
|
Trapezoid
|
5. How many right angles are there in a right triangle?
6. Which of the following is not a property of a square?
A
|
Two sets of parallel lines.
|
B
|
Four right angles.
|
C
|
All the sides are the same length.
|
D
|
At least one obtuse angle.
|
7. Which shows a shape reflected across a line?
8. Which figure has more than one line of symmetry?
9. Which figure makes a letter of the English alphabet when it is reflected across the line of symmetry?
Multiple-Choice Answer Key:
1. D
|
2. C
|
3. B
|
4. D
|
5. B
|
6. D
|
7. C
|
8. C
|
9. D
|
|
Short-Answer Items:
- In the figure below, identify how many points, lines, and perpendicular lines there are. Also, classify each of the three angles inside the triangle as acute, right, or obtuse.
![](data:image/png;base64,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)
- For the shape shown below, explain how you know whether the shape is each of the following: square, rectangle, parallelogram, and trapezoid.
![](data:image/png;base64,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)
3. Draw all the lines of symmetry for the figure shown below.
![](data:image/png;base64,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)
Short-Answer Key and Scoring Rubrics:
1. In the figure below, identify how many points, lines, and perpendicular lines there are. Also, classify each of the three angles inside the triangle as acute, right, or obtuse.
![](data:image/png;base64,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)
Sample Answer: There are three points, three lines, and two perpendicular lines. There are two acute angles and one right angle.
Points
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Description
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2
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The student correctly identified and counted all of the required geometric constructs.
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1
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The student correctly identified at least half of the required geometric constructs.
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0
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The student correctly identified less than half of the required geometric constructs.
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2. For the shape shown below, explain how you know whether the shape is each of the following: square, rectangle, parallelogram, and trapezoid.
![](data:image/png;base64,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)
Sample Answer: The shape is not a square because it does not have four right angles. The shape is not a rectangle because it does not have four right angles. The shape is a parallelogram because it has two sets of parallel sides. The shape is not a trapezoid because it has two sets of parallel sides.
Points
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Description
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2
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The student provided 4 valid mathematical statements, one about each of the possible categorizations.
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1
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The student provided 2 or 3 valid mathematical statements about the possible categorizations.
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0
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The student provided fewer than 2 valid mathematical statements about the possible categorizations.
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3.Draw all the lines of symmetry for the figure shown below.
![](data:image/png;base64,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)
Points
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Description
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2
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The student correctly drew all 6 lines of symmetry with no additional incorrect lines.
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1
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The student correctly drew 3, 4, or 5 lines of symmetry with 1 or no additional incorrect lines.
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0
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The student correctly drew 0, 1, or 2 lines of symmetry.
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Performance Assessment:
Have students design a tile mosaic using the shapes covered in the unit. The mosaic doesn’t necessarily need to be repeating but should cover an entire page and contain at least 12 shapes (some of them may be repeated). Mosaics should include at least two different quadrilaterals and one type of triangle. Students should color their mosaics by classifying all the shapes and coloring each type the same color. (For example, all squares should be colored red, all rectangles should be colored blue, and so on.)
Students should trade mosaics with one another. For each mosaic, students should create a legend that can be used to determine which shape is which color. The legend should show each unique shape in the mosaic and should include all colors in the mosaic.
Performance Assessment Scoring Rubric:
Points
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Description
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4
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- The student created a mosaic that incorporates at least two different quadrilaterals.
- The student’s mosaic incorporated at least one type of triangle.
- The student colored the mosaic based on a coloring scheme associated with the types of shapes used.
- The student correctly created a legend to show the colors associated with each type of shape in a classmate’s mosaic.
- The student showed an advanced understanding of geometric shapes.
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3
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- The student correctly completed 3 of the 4 tasks detailed above.
- The student showed a good understanding of geometric shapes.
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2
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- The student correctly completed 2 of the 4 tasks detailed above.
- The student showed a limited understanding of geometric shapes.
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1
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- The student correctly completed 1 of the 4 tasks detailed above.
- The student showed a very limited understanding of geometric shapes.
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0
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- The student did not correctly complete any of the tasks detailed above.
- The student showed no understanding of geometric shapes.
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