QuestionA regular pentagon is shown below.
Line passes through a vertex and bisects a side.
Line passes through two vertices.
Point is the center of the pentagon.
Which transformation(s) must map the pentagon exactly onto itself? Choose all that apply.
Reflection across line
Reflection across line
Counterclockwise rotation about by
Clockwise rotation about by
None of the above
Explanation
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Studdy Solution
STEP 1
1. The pentagon is regular, meaning all sides and angles are equal.
2. Line is a line of symmetry for the pentagon.
3. Line is not a line of symmetry for the pentagon.
4. Rotations about the center by multiples of the internal angle of rotation will map the pentagon onto itself.
STEP 2
1. Determine if reflection across line maps the pentagon onto itself.
2. Determine if reflection across line maps the pentagon onto itself.
3. Determine if counterclockwise rotation about by maps the pentagon onto itself.
4. Determine if clockwise rotation about by maps the pentagon onto itself.
5. Conclude which transformations map the pentagon onto itself.
STEP 3
Determine if reflection across line maps the pentagon onto itself.
- Since line passes through a vertex and bisects the opposite side, it is a line of symmetry for the regular pentagon.
- Therefore, reflection across line will map the pentagon onto itself.
STEP 4
Determine if reflection across line maps the pentagon onto itself.
- Line passes through two vertices but does not bisect the pentagon symmetrically.
- Therefore, reflection across line will not map the pentagon onto itself.
STEP 5
Determine if counterclockwise rotation about by maps the pentagon onto itself.
- The internal angle of rotation for a regular pentagon is .
- A counterclockwise rotation by is equivalent to rotating by .
- Therefore, this rotation will map the pentagon onto itself.
STEP 6
Determine if clockwise rotation about by maps the pentagon onto itself.
- The internal angle of rotation for a regular pentagon is .
- A clockwise rotation by does not correspond to a multiple of .
- Therefore, this rotation will not map the pentagon onto itself.
STEP 7
Conclude which transformations map the pentagon onto itself.
- Reflection across line and counterclockwise rotation about by will map the pentagon onto itself.
- Reflection across line and clockwise rotation by will not map the pentagon onto itself.
The transformations that map the pentagon onto itself are:
- Reflection across line
- Counterclockwise rotation about by
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