Download Math 1312 Section 3.1 Congruent Triangles To have a

Math 1312 Section 3.1
Congruent Triangles
To have a correspondence between two triangles, you must “match up” the angles and sides of one triangle
with the angles and sides of the other triangle. Each corresponding angle and side must have the same
measure.
B
L
23
90
J
A
23
K
90 C
The correspondence between the above two triangles can be stated as ABC  JKL.
The order in which the letters are written matters since it shows which angles and sides of one triangle match
up with the angles and sides of the other triangle:
If ABC  JKL, the corresponding angles are:
ABC  JKL
AND the corresponding segments are:
ABC  JKL
 ABC   J K L
ABC  JKL
AB  JK
BC  KL
AC  JL
The correspondence may be written in more than one way: CAB  LJK is the same as ABC  JKL.
CONGRUENT TRIANGLES
Each triangle has six parts: three sides and three angles. If the six parts of one triangle are congruent to the
corresponding six parts of another triangle, then the triangles are congruent triangles.
Two triangles are congruent if:
1.
All pairs of corresponding angles are congruent.
2.
All pairs of corresponding sides are congruent.
Below, ABC and DEF are congruent, this means that the corresponding parts of each triangle are the same
measures. The congruence is written ABC  DEF.
B
E
A  D
B  E
C  F
A
AB  DE
BC  EF
CA  FD
F
D
C
Definition of Congruent Triangles (CPCTC) - two triangles are congruent if and only if their corresponding
parts are congruent. (CPCTC - corresponding parts of congruent triangles are congruent)
Example 1:
If ABC  DEF, name the corresponding congruent angles and sides:
E
B
C
A
F
D
Congruent Angles Congruent Sides -
SSS Postulate - (side-side-side) if the three sides of one triangle are congruent to the three sides of a second
triangle, then the triangles are congruent.
E
B
Since all three sides in ABC are
congruent to all three sides in DEF,
then ABD  DEF
A
C
D
F
Example 2:
Here is an example of SSS. If the lines AC = DC and AB = BD. Show that
ABC  DBC using SSS.
C
A
B
D
SAS Postulate - if two sides and the “included” angle of one triangle are congruent to two sides and the
“included” angle of another triangle, then the triangles are congruent.
In the above definition, the “included” angle is the angle that is formed by the intersection of two sides of a
triangle. For example, below B and E are the “included” angles.
E
B
Since
AB  DE , and
B  E, and
BC  EF , then
ABC  DEF
C
A
Example 3: Show that
D
F
ABE  DBC using SAS.
C
A
B
D
E
B is the midpoint of both AD and EC
ASA Postulate - if two angles and the “included” side of one triangle are congruent to two angles and the
“included” side of another triangle, the triangles are congruent.
In the above definition, the “included” side is the segment that connects two angles. For example, AB and DE
are the “included” sides .
E
B
Since
A  D, and
AB  DE , and
B  E, then
ABC  DEF
A
C
D
F
Example 4: Given the following information:
P
PN  MQ : MPN  NPQ
PNM  PNQ by ASA
1 2
M
Q
N
AAS Theorem - if two angles and a “non-included” side of one triangle are congruent to the corresponding two
angles and side of a second triangle, the two triangles are congruent.
B
E
Since
AB  DE , and
B  E, and
C  F, then
ABC  DEF
A
C
D
F
Example 5: Given the following information:
A
A  D
BC bisects both ACD and ABD
B
How can we show congruence using AAS?
C
D
Note: You can not use AAA and SSA because they are not valid for proving triangles are
congruent. A triangle can have equal angles can have the same shape but the triangles are not
necessarily congruent.
SUMMARY OF METHODS:
METHOD
QUALIFICATIONS
Def. of  
All six parts of one triangle must be congruent with all
six parts of the other triangle.
SSS
The three sides of one triangle must be congruent to
the three sides of the other triangle.
SAS
Two sides and the included angle of one triangle must
be congruent to two sides and the included
angle of the other triangle.
ASA
Two angles and the included side of one triangle must
be congruent to two angles and the included side of
the other triangle.
AAS
Two angles and a non-included side of one triangle
must be congruent to the corresponding two angles
and non-included side of the other triangle.
PICTURE
Use for Popper 5 questions 1 and 2:
a||b
a
b
2y  2
56°
7x
Popper 5 question 1: Find the value for y.
A. 56
B. 8
C. 29
D 58
E None of these
Popper 5 question 2: Find the value for x.
A. 56
B. 8
C. 29
D 58
E None of these
Use for Popper 5 questions 3 and 4.
∠1
3
∠2
12
1
29
2
16
Popper 5 questions 3: Find the value of x.
A. 3
B. 5
C. 45
D. 9
E. None of these
Popper 5 question 4: Find the value of angle 1.
A. 135°
B. 65°
C. 45°
D. 15°
E. None of these
Popper 5 question 5: If angle 1 = angle 2, angle 2 = angle 3, then angle 1 = angle 3. What
property is being used?
A. Distributive
B. Reflexive
C. Substitution
D. Transitive
Solution to Popper 3: Popper 3 question 1: ∆
is a right triangle with angle C is the right angle. If angle
B = 2x +40 and angle A = x +20. Fine the measure of angle B.
A. 30°
B. 60°
Popper 3 question 2:
C. 40°
D. 10°
E. None of these
Fine the mA = __________ for the following:
2x
x
(x-20)
A
A. 50°
B. 100°
C. 80°
D. 30°
E. None of These
Popper 3 question 3: Given: m
Find: ∠3
A. 45°
B. 135°
 1= x and m  3 = 3x
C. 60°
D None of these
Popper 3 question 4 and question 5:
B
80
Use the figure to the right.
A
Popper 3 question 4: Find measure for ∠ .
A. 100°
B. 131°
C. 51°
D None of these
Popper 3 question 5: Find measure for ∠
A. 100°
B. 131°
C. 51°
.
D None of these x
(3x – 22) C
D
Solutions for Popper 4: Popper 4 question 1: Given Nonagon, find the number of diagonals.
A. 54
B. 9
C. 27 D. Need more information E. None of these
Popper 4 questions 2: Find the sum of the interior angles of the eleven sided regular polygon.
A. 1980°
B. 1620°
C. 1440° D. Need more information E. None of these
Popper 4 questions 3: Find the measure of each interior angles of the given twelve sided regular polygon.
A. 30°
B. 150°
C. 120° D. Need more information E. None of these
Popper 4 question 4: Find the measure of each exterior angle of a regular octagon.
A. 45°
B. 135°
C. 30°
D. Need more information E. None of these.
Popper 4 question 5: Each interior angle of a regular polygon is120 . Find the number of sides.
A. 10
B. 5
C. 6
D. 7
E. None of these