Exploring Reflections - Unit 7 AAC

Is the distance of the original point and the new point from the mirror line the same? Or different?

When you reflect over the x-axis, what do you notice about the original point(s) and the reflected point(s)?

When you reflect over the y-axis, what do you notice about the original point(s) and the reflected point(s)?

Create a diagonal mirror line that shows a positive slope through the origin. Move the points so that when y = 1, x = 1, and when y = -2, x = -2. This is the mirror line y = x. What do you notice about the original point(s) and the reflected point(s)?

Create a diagonal mirror line that shows a positive slope through the origin. Move the points so that when y = 1, x = -1, and when y = 2, x = -2. This is the mirror line y = -x. What do you notice about the original point(s) and the reflected point(s)?

What is your mirror line isn't an x- or y-axis, or y = x? Create 3 reflections using the following lines: y = x - 3 y = -2x + 1 How do the points change? Now move your reflection line so that it is a horizontal line that isn't the x-axis (y = -1) Then do it again so that your reflection line is a vertical line that isn't the y-axis (x = -1). How do the points change? Is there a mathematical relationship between the original points and the reflected points? Can you create a rule that explains what happens if your line of reflection isn't on an axis?

Why is a reflection considered a rigid transformation? What is the relationship between each original point, its reflection, and the mirror line?