NOTtrue.Thereare manyexamplesof congruentanglesthat are not verticalangles—forexamplethe
cornersof a square.
Sometimesthe converseof an if-thenstatementwill also be true. Can you think of an exampleof a statement
in whichthe converseis true?This lessonexploresconversesto the postulatesand theoremsaboutparallel
lines and transversals.
CorrespondingAnglesConverse
Let’s applythe conceptof a converseto the CorrespondingAnglesPostulate.Previouslyyou learnedthat
"if two parallellines are cut by a transversal,the correspondingangleswill be congruent."The converseof
this statementis "if correspondinganglesare congruentwhentwo linesare cut by a transversal,then the
two lines crossedby the transversalare parallel."This converseistrue, and it is a postulate.
Converseof CorrespondingAnglesPostulateIf correspondinganglesare congruent
whentwo lines are crossedby a transversal,then the two lines crossedby the transversal
are parallel.Example 1
Supposewe knowthat and. Whatcan we concludeaboutlines and
?
Noticethat and are correspondingangles.Since , we can applythe Converseof theCorrespondingAnglesPostulateand concludethat.
You can also use conversestatementsin combinationwith morecomplexlogicalreasoningto provewhether
lines are parallelin real life contexts.The followingexampleshowsa use of the contrapositiveof the Corre-
spondingAnglesPostulate.
Example 2
The threelines in the figurebelowrepresentmetalbars and a cablesupportinga watertower.