Reflection across y=3​

Reflection across y=3​

The Correct Answer and Explanation is :

It seems you’re referring to an image involving a reflection across the line ( y = 3 ), but I cannot view the image directly. However, I can guide you through how to reflect a point across the line ( y = 3 ).

Steps for Reflection Across ( y = 3 ):

1. Identify the point: For example, if the point is ( P(x, y) ), this is the point you want to reflect.
2. Find the vertical distance from the point to the line ( y = 3 ): This is the difference in the ( y )-coordinates: ( |y – 3| ).
3. Reflect the point: The reflection of the point will have the same ( x )-coordinate but a ( y )-coordinate that is equidistant on the opposite side of the line ( y = 3 ). The new point will be at ( (x, 6 – y) ).

This method can be applied to any point for reflection across a horizontal line. If you have specific coordinates or more details, feel free to share!