Asked by Fur33
Transformations and congruence test answers 2025.
1. (4,-6)
2. (3,2)
3. False
4. (-2,-4) , (0,-1) , (2,-4)
5. False
6. (4,1)
7. (4,-5)
8. B
9. (6,2) , (6,5) , (2,5) , (2,2)
10. No
11. 270 clockwise rotation
12. (6,-3)
13. (-7,-5)
14. A rotation then a translation.
15. Essay question. do yourself its easy though
100% not including last question
1. (4,-6)
2. (3,2)
3. False
4. (-2,-4) , (0,-1) , (2,-4)
5. False
6. (4,1)
7. (4,-5)
8. B
9. (6,2) , (6,5) , (2,5) , (2,2)
10. No
11. 270 clockwise rotation
12. (6,-3)
13. (-7,-5)
14. A rotation then a translation.
15. Essay question. do yourself its easy though
100% not including last question
Answers
Answered by
GPT-4o mini
It looks like you have a set of answers related to transformations and congruence tests, possibly for a geometry class. If you need help with understanding the concepts or reviewing the problems, I can certainly assist with that!
Here’s a brief overview of some relevant topics that may help you:
1. **Transformations**: These include translations (sliding), rotations (turning), reflections (flipping), and dilations (resizing). Each type has specific rules regarding how coordinates change.
2. **Congruence**: Figures are congruent if they can be transformed into each other via transformations (like the ones above) without changing their size or shape.
3. **Rotation**: Rotating points around a center involves using a specific degree of rotation. For example, a 90-degree clockwise rotation results in the transformation of (x, y) to (y, -x).
4. **Translation**: Moving a point (x, y) by adding or subtracting values to its coordinates. For example, translating (x, y) by (2, -3) moves it to (x + 2, y - 3).
5. **Reflections**: Flipping a point across a line, such as the x-axis or y-axis. For example, reflecting (x, y) over the x-axis transforms it into (x, -y).
If you're working on these concepts and need assistance or clarity on any specific question, feel free to ask!
Here’s a brief overview of some relevant topics that may help you:
1. **Transformations**: These include translations (sliding), rotations (turning), reflections (flipping), and dilations (resizing). Each type has specific rules regarding how coordinates change.
2. **Congruence**: Figures are congruent if they can be transformed into each other via transformations (like the ones above) without changing their size or shape.
3. **Rotation**: Rotating points around a center involves using a specific degree of rotation. For example, a 90-degree clockwise rotation results in the transformation of (x, y) to (y, -x).
4. **Translation**: Moving a point (x, y) by adding or subtracting values to its coordinates. For example, translating (x, y) by (2, -3) moves it to (x + 2, y - 3).
5. **Reflections**: Flipping a point across a line, such as the x-axis or y-axis. For example, reflecting (x, y) over the x-axis transforms it into (x, -y).
If you're working on these concepts and need assistance or clarity on any specific question, feel free to ask!
There are no human answers yet. A form for humans to post answers is coming very soon!