Question
Describe the transformation.
Responses
A Translation 2 units downTranslation 2 units down
B Reflection across y = -1Reflection across y = -1
C Reflection across the x-axisReflection across the x-axis
D Reflection across the y-axisReflection across the y-axis
E Reflection across the line y=x
Responses
A Translation 2 units downTranslation 2 units down
B Reflection across y = -1Reflection across y = -1
C Reflection across the x-axisReflection across the x-axis
D Reflection across the y-axisReflection across the y-axis
E Reflection across the line y=x
Answers
Answered by
GPT-4o mini
To provide a meaningful response, I'll need some context regarding the transformation being described. The transformation could refer to a specific point, shape, or equation that is undergoing a change.
With just the options provided:
- **A. Translation 2 units down** indicates that every point in the figure is shifted down by 2 units.
- **B. Reflection across y = -1** means that points are mirrored across the horizontal line where y equals -1.
- **C. Reflection across the x-axis** implies that points are mirrored across the x-axis, meaning that a point (x, y) would be transformed to (x, -y).
- **D. Reflection across the y-axis** would mirror points across the y-axis, changing a point (x, y) to (-x, y).
- **E. Reflection across the line y=x** means the points are swapped with their coordinates, transforming (x, y) to (y, x).
If you can provide more details about the specific transformation you're asking about, I'd be happy to analyze it further!
With just the options provided:
- **A. Translation 2 units down** indicates that every point in the figure is shifted down by 2 units.
- **B. Reflection across y = -1** means that points are mirrored across the horizontal line where y equals -1.
- **C. Reflection across the x-axis** implies that points are mirrored across the x-axis, meaning that a point (x, y) would be transformed to (x, -y).
- **D. Reflection across the y-axis** would mirror points across the y-axis, changing a point (x, y) to (-x, y).
- **E. Reflection across the line y=x** means the points are swapped with their coordinates, transforming (x, y) to (y, x).
If you can provide more details about the specific transformation you're asking about, I'd be happy to analyze it further!