402 Transformation geometry (Chapter 20)Many trees, plants, flowers, animals and insects
aresymmetricalin some way. Such symmetry
results from a reflection, so we can describe
symmetry using transformations.Intransformation geometryfigures are changed
(or transformed) in size, shape, orientation or
position according to certain rules.The original figure is called theobjectand the new figure is called theimage.We will consider the followingtransformations:
² Translationswhere every point moves a fixed distance in a given direction
² Reflectionsor mirror images
² Rotationsabout a point throught a given angle
² Enlargementsandreductionsabout a point with a given factor
² Stretcheswith a given invariant line and a given factor.
Here are some examples:translation (slide) reflectionrotation aboutOthrough angleμ enlargementreduction (k=^12 ) stretchClick on the icon to obtain computer demonstrations of these transformations.Atranslationmoves an object from one place to another. Every point on the object moves the same distance
in the same direction.A TRANSLATIONS [5.4]
mirror lineimage objectobject imageO centre object imageobjectimage
qCOMPUTER
DEMOobject
image
centreobjectk=^12 k=2invariant
lineIGCSE01
cyan magenta yellow black(^05255075950525507595)
100 100
(^05255075950525507595)
100 100
Y:\HAESE\IGCSE01\IG01_20\402IGCSE01_20.CDR Wednesday, 22 October 2008 1:32:10 PM PETER