Title: Proving Triangles Congruent
1Proving Triangles Congruent
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2The Idea of a Congruence
Two geometric figures with exactly the same
size and shape.
3How much do you need to know. . .
. . . about two triangles to
prove that they are congruent?
4Corresponding Parts
In Lesson 4.2, you learned that if all six pairs
of corresponding parts (sides and angles) are
congruent, then the triangles are congruent.
?ABC ? ? DEF
5Do you need all six ?
NO !
6Side-Side-Side (SSS)
7Side-Angle-Side (SAS)
B
E
F
A
C
D
- AB ? DE
- ?A ? ? D
- AC ? DF
?ABC ? ? DEF
included angle
8Included Angle
The angle between two sides
? H
? G
? I
9Included Angle
Name the included angle YE and ES ES and
YS YS and YE
? E
? S
? Y
10Angle-Side-Angle (ASA)
B
E
F
A
C
D
- ?A ? ? D
- AB ? DE
- ? B ? ? E
?ABC ? ? DEF
included side
11Included Side
The side between two angles
GI
GH
HI
12Included Side
Name the included side ?Y and ?E ?E and ?S
?S and ?Y
YE
ES
SY
13Angle-Angle-Side (AAS)
B
E
F
A
C
D
- ?A ? ? D
- ? B ? ? E
- BC ? EF
?ABC ? ? DEF
Non-included side
14Warning No SSA Postulate
There is no such thing as an SSA postulate!
E
B
F
A
C
D
NOT CONGRUENT
15Warning No AAA Postulate
There is no such thing as an AAA postulate!
E
B
A
C
F
D
NOT CONGRUENT
16The Congruence Postulates
17Name That Postulate
(when possible)
SAS
ASA
SSA
SSS
18Name That Postulate
(when possible)
AAA
ASA
SSA
SAS
19Name That Postulate
(when possible)
Vertical Angles
Reflexive Property
SAS
SAS
Reflexive Property
Vertical Angles
SSA
SAS
20HW Name That Postulate
(when possible)
21HW Name That Postulate
(when possible)
22Lets Practice
Indicate the additional information needed to
enable us to apply the specified congruence
postulate.
For ASA
?B ? ?D
For SAS
?A ? ?F
For AAS
23HW
Indicate the additional information needed to
enable us to apply the specified congruence
postulate.
For ASA
For SAS
For AAS