Finally, we can showthat is the perpendicularbisectorof.- Midpointof is.
- Midpointof is on ( - and -coordinatesof are the same).
- is the perpendicularbisectorof.
Conclusion: and are reflectionsin the line.Example 2
Point is reflectedin the line. The imageis. is then reflectedin the -axis.Theimageis. Whatare the coordinatesof?
We find one reflectionat a time.- Reflect in is.
Reflect in the -axis. is.
ReflectionsAre Isometries
Areflectionin a lineis anisometry.Distancebetweenpointsis “preserved”(staysthe same).
We will verifythe isometryfor reflectionin the -axis.The storyis very similarfor reflectionin the -axis.
You can writea proofthat reflectionin is an isometryin the LessonExercises.
The diagrambelowshows and its reflectionin the -axis,.