Reflections
LearningObjectives
- Find the reflectionof a pointin a line on a coordinateplane.
- Multiplymatrices.
- Applymatrixmultiplicationto reflections.
- Verify that a reflectionis an isometry.
Introduction
You studiedtranslationsearlier, and saw that matrixadditioncan be usedto representa translationin a
coordinateplane.You also learnedthat a translationis an isometry.
In this lesson,we will analyzereflectionsin the sameway. This time we will use a new operation,matrix
multiplication,to representa reflectionin a coordinateplane.We will see that reflections,like translations,
are isometries.
You will havean opportunityto discoverone surprising—orevenshocking!—factof matrixarithmetic.
Reflectionin a Line
Areflectionin a line is as if the line werea mirror.
An objectreflectsin the mirror, and we see the imageof the object.
- The imageis the samedistancebehindthe mirroras the objectis in front of the mirror.
- The “line of sight”from the objectto the mirroris perpendicularto the mirroritself.
- The “line of sight”from the imageto the mirroris also perpendicularto the mirror.
TechnologyNote- GeometrySoftwareUse your geometrysoftwareto experimentwith reflections.