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NAME DATE PERIOD
4-3 Study Guide and Intervention
Congruent Triangles
Congruence and Corresponding Parts B S
Triangles that have the same size and same shape are R
congruent triangles. Two triangles are congruent if and T
only if all three pairs of corresponding angles are congruent C A
and all three pairs of corresponding sides are congruent. In
the figure, △ABC △RST.
Third Angles If two angles of one triangle are congruent to two angles
Theorem of a second triangle, then the third angles of the triangles are congruent.
Example
If △XYZ △RST, name the pairs of Y
congruent angles and congruent sides. S
∠X ∠R, ∠Y ∠S, ∠Z ∠T X R
−− −− −− −− −− −− Z T
XY RS , XZ RT , YZ ST
Exercises
Show that the polygons are congruent by identifying all congruent corresponding
parts. Then write a congruence statement.
K B K L
1. 2. D 3.
B
J L A
A C C J M
∠A ∠J; ∠B ∠K; ∠A ∠D; ∠ABC ∠DCB ∠J ∠L; ∠JKM ∠LMK;
−− −− −− −− −− −−
∠C ∠L; AB JK ; ∠ACB ∠DBC; AC BD ∠KMJ ∠MKL; KJ ML
−− −− −− −− −− −− −− −−
BC KL ; AC JL AB DC KL MJ
△ABC △JKL △ABC △DCB △JKM △LMK Lesson 4-3
B D R
4. 5. 6.
LK
FG
US
E J A C T
∠E ∠J; ∠F ∠K; ∠A ∠D; ∠R ∠T;
−− −−
∠G ∠L; EF JK ; ∠ABC ∠DCB; ∠RSU ∠TSU;
−− −− −− −−
EG JL ; FG KL ; ∠ACB ∠DBC; ∠RUS ∠TUS;
−− −− −− −− −− −− −− −−
△FGE △KLJ AB DC ; AC DB ; RU TU ; RS TS ;
−− −− −− −−
BC CB ; △ABC △DCB SU SU ; △RSU △TSU
Copyright © Glencoe/McGraw-Hill, a division of The McGraw-Hill Companies, Inc. &
Suppose △ABC △DEF #
% (2y-5)° 2x +y
°
27.8 75
7. Find the value of x. 64.3 90.6
° °
8. Find the value of y. 35 65 40
" 96.6 $ '
Chapter 4 19 Glencoe Geometry
NAME DATE PERIOD
4-3 Study Guide and Intervention (continued)
Congruent Triangles
Prove Triangles Congruent Two triangles are congruent if and only if their
corresponding parts are congruent. Corresponding parts include corresponding angles and
corresponding sides. The phrase “if and only if” means that both the conditional and its
converse are true. For triangles, we say, “Corresponding parts of congruent triangles are
congruent,” or CPCTC.
Example Write a two-column proof. $
−− −−− −−− −−−
AB CB , AD CD , ∠BAD ∠BCD
Given:
−−− # %
BD bisects ∠ABC.
Prove: △ABD △CBD
Proof: "
Statement Reason
−− −−− −−− −−− 1. Given
1. AB CB , AD CD
−−− −−− 2. Reflexive Property of congruence
2.
BD BD
3. ∠BAD ∠BCD 3. Given
4. ∠ABD ∠CBD 4. Definition of angle bisector
5. ∠BDA ∠BDC 5. Third Angles Theorem
6. △ABD △CBD 6. CPCTC
Exercises
Write a two-column proof.
−−− −−− −− −−− Copyright © Glencoe/McGraw-Hill, a division of The McGraw-Hill Companies, Inc.
1. Given: ∠ A ∠C, ∠D ∠B,
−− −−− AD CB , AE CE , "
AC bisects BD . #
Prove: △AED △CEB &
Proof: % $
Statements Reasons
1. ∠A ∠C, ∠D ∠B 1. Given
2. ∠AED ∠CEB 2. Vertical angles are .
−− −− −− −− 3. Given
AD CB , AE CE
3.
−− −− 4. Definition of segment bisector
DE BE
4.
5. △AED △CEB 5. CPCTC
Write a paragraph proof. #
−−−
2. Given:
BD bisects ∠ABC and ∠ADC,
−− −−− −− −−− −−− −−−
AB CB , AB AD , CB DC
Prove: △ABD △CBD
−−
We are given BD bisects ∠ABC and ∠ADC. Therefore
∠ABD ∠CBD and ∠ADB ∠CDB by the definition " $
of angle bisectors. By the Third Angle Theorem, we
−− −− −− −− %
AB CB , AB AD ,
find that ∠A ∠C. We are given that
−− −−
CB DC . Using the substitution property, we can determine that
and −−
−− −− −−
AD CD . Finally, BD BD using the Reflexive Property of congruence.
Therefore △ABD △CBD by CPCTC.
Chapter 4 20 Glencoe Geometry
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