UsingCongruentTriangles
LearningObjectives
- Applyvarioustrianglescongruencepostulatesand theorems.
- Knowthe waysin whichyou can provepartsof a trianglecongruent.
- Find distancesusingcongruenttriangles.
- Use constructiontechniquesto createcongruenttriangles.
Introduction
As you can see, thereare manydifferentwaysto provethat two trianglesare congruent.It is importantto
knowall of the differentway that can provecongruence,and it is importantto knowwhichcombinationsof
sidesand anglesdonotprovecongruence.Whenyou provepropertiesof polygonsin later chaptersyou
will frequentlyuse
CongruenceTheoremReview
As you havestudiedin the previouslessons,thereare five theoremsand postulatesthat providedifferent
waysin whichyou can provetwo trianglescongruentwithoutcheckingall of the anglesand all of the sides.
It is importantto knowthesefive ruleswell so that you can use themin practicalapplications.
Name Correspondingcongruentparts Doesit provecongruence?
SSS Threesides Yes
SAS Two sidesand the anglebetweenthem Yes
ASA Two anglesand the side betweenthem Yes
AAS Two anglesand a side not betweenthem Yes
HL A hypotenuseand a leg in a right triangle Yes
No—itwill createa similartriangle,but not of the same
sizeAAA ThreeanglesSSA Two sidesand an anglenot betweenthemNo—thiscan createmorethan one distincttriangleWhenin doubt,thinkaboutthe modelswe created.If you can constructonly one possibletrianglegiventhe
constraints,then you can provecongruence.If you can createmorethan one trianglewithinthe giveninfor-
mation,you cannotprovecongruence.
Example 1
Whatrule can provethat the trianglesbeloware congruent?