Reflection
In mathematics, reflection refers to a transformation that flips a shape over a line, creating a mirror image
In mathematics, reflection refers to a transformation that flips a shape over a line, creating a mirror image. This line of reflection is often called the axis of symmetry. When a shape is reflected, all points on the shape are moved to a new position on the other side of the line of reflection, at the same distance from the line.
To understand reflection, let’s take an example. Consider a triangle ABC. To reflect this triangle over a line, we need to follow these steps:
1. Draw the line of reflection: Choose any line that you want to use as the axis of reflection. This can be a vertical line, horizontal line, or even a diagonal line. Let’s say we choose the line x = 0 as our line of reflection.
2. Mark the original shape: On a graph paper or coordinate plane, plot the vertices of the original triangle ABC. Assign coordinates to each vertex. For example, A(2, 3), B(4, 5), C(6, 1).
3. Measure the distance: Measure the distance between each vertex and the line of reflection, and make sure the same distance is maintained on the other side after reflection. In our example, the distance between the vertices and x = 0 line is measured vertically.
4. Reflect the points: To reflect a point over the line of reflection, draw a line segment connecting the original point to the line of reflection. The reflected point is located on the other side of the line and is the same distance from the line as the original point. In this case, draw line segments from A(2, 3) to the line x = 0; from B(4, 5) to the line x = 0; and from C(6, 1) to the line x = 0.
5. Determine the coordinates of the reflected shape: The reflected triangle will have the same shape as the original triangle, but its vertices will be located on the other side of the line of reflection. So, the reflected triangle will have vertices A'(-2, 3), B'(-4, 5), and C'(-6, 1).
6. Plot the reflected shape: Plot the new coordinates of the reflected triangle on the graph paper or coordinate plane. Connect the points to form the reflected triangle A’B’C’.
Remember, in a reflection, the shape remains the same size and the angles remain congruent, but the orientation changes due to the flip. The line of reflection acts as a mirror.
Practicing reflections helps in understanding symmetry, properties of shapes, and transformations in mathematics.
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