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ANGLE PAIR
RELATIONSHIPS
Angles
An angle is a figure formed by two noncollinear rays that
have a common endpoint.
Symbols:
D
Definition
of Angle
DEF
FED
E
2
E
F
2
Angles
1) Name the angle in four ways.
C
ABC
A
CBA
1
B
1
B
2) Identify the vertex and sides of this angle.
vertex: Point B
sides:
BA
and BC
Angles
1) Name all angles having W as their vertex.
X
1
2
W
1
2
XWZ
Y
2) What are other names for
XWY
or
1 ?
YWX
3) Is there an angle that can be named
No!
Z
W?
Adjacent Angles
When you “split” an angle, you create two angles.
The two angles are called
_____________
adjacent angles
adjacent = next to, joining.
A
B
2
1
1 and 2 are examples of adjacent angles.
They share a common ray.
Name the ray that 1 and 2 have in common.
C
BD
____
Adjacent Angles
Determine whether 1 and 2 are adjacent angles.
No. They have a common vertex B, but
no
common side
_____________
2
1
B
1
Yes. They have the same vertex G and a
common side with no interior points in
common.
2
G
N
L
J
2
1
No. They do not have a common vertex or
a____________
common side
LN
The side of 1 is ____
JN
The side of 2 is ____
Linear Pairs of Angles
Two angles form a linear pair if and only if (iff):
A) they are adjacent and
B) their noncommon sides are opposite rays
A
Definition of
Linear Pairs
D
B
1
2
1 and 2 are a linear pair.
BA and BD form AD
1  2  180
Linear Pairs of Angles
In the figure, CM and CE are opposite rays.
1) Name the angle that forms a
linear pair with 1.
ACE
H
T
A
2
1
ACE and 1 have a common side CA
the same vertex C, and opposite rays
3 4
C
M
CM and CE
2) Do 3 and TCM form a linear pair? Justify your answer.
No. Their noncommon sides are not opposite rays.
E
Complementary and Supplementary Angles
Two angles are complementary if and only if (iff)
The sum of their degree measure is 90.
E
D
A
Definition of
Complementary
Angles
B
30°
60°
F
C
mABC + mDEF = 30 + 60 = 90
Notes: “m” stands for “measure”
Complementary and Supplementary Angles
If two angles are complementary, each angle is a
complement of the other.
ABC is the complement of DEF and DEF is the
complement of ABC.
E
A
B
D
30°
C
60°
F
Complementary angles DO NOT need to have a common side
or even the same vertex.
Complementary and Supplementary Angles
Some examples of complementary angles are shown below.
75°
15°
H
P
mH + mI = 90
Q
40°
mPHQ + mQHS = 90
50°
H
S
U
T
I
60°
V
mTZU + mVZW = 90
30°
Z
W
Complementary and Supplementary Angles
If the sum of the measure of two angles is 180, they form a
special pair of angles called supplementary angles.
Two angles are supplementary if and only if (iff) the
sum of their degree measure is 180.
D
C
Definition of
Supplementary
Angles
50°
A
130°
B
E
mABC + mDEF = 50 + 130 = 180
F
Complementary and Supplementary Angles
Some examples of supplementary angles are shown below.
H
75°
105°
I
mH + mI = 180
Q
130°
50°
H
P
S
U
V
60°
120°
60°
Z
T
mPHQ + mQHS = 180
mTZU + mUZV = 180
and
W
mTZU + mVZW = 180
Congruent Angles
measure
Recall that congruent segments have the same ________.
Congruent
angles
_______________
also have the same measure.
Congruent Angles
Two angles are congruent iff, they have the same
degree measure
______________.
Definition of
Congruent
Angles
B  V iff
50°
50°
B
V
mB = mV
Congruent Angles
arcs
To show that 1 is congruent to 2, we use ____.
1
2
To show that there is a second set of congruent angles, X and Z,
we use double arcs.
This “arc” notation states that:
X  Z
X
mX = mZ
Z
Congruent Angles
G
D
1
1) If m1 = 2x + 3 and the
m3 = 3x + 2, then find the
m3
x = 17; 3 = 37°
A
4
3
2
B
C
E
H
2) If mABD = 4x + 5 and the mDBC = 2x +
1, then find the mEBC
x = 29; EBC = 121°
3) If m1 = 4x - 13 and the m3 = 2x + 19, then find the m4
x = 16; 4 = 39°
4) If mEBG = 7x + 11 and the mEBH = 2x + 7, then find the m1
x = 18; 1 = 43°
Vertical Angles
When two lines intersect, four
____ angles are formed.
There are two pair of nonadjacent angles.
vertical angles
These pairs are called _____________.
4
1
3
2
Vertical Angles
Two angles are vertical iff they are two
nonadjacent angles formed by a pair of
intersecting lines.
Vertical angles:
Definition of
Vertical
Angles
4
1
3
1 and 3
2
2 and 4
Vertical Angles
Vertical angles are congruent.
Theorem 3-1
Vertical
Angle
Theorem
n
2
m
1  3
3
1
4
2  4
Vertical Angles
Find the value of x in the figure:
130°
x°
The angles are vertical angles.
So, the value of x is 130°.
Vertical Angles
Find the value of x in the figure:
(x – 10)°
125°
The angles are vertical angles.
(x – 10) = 125.
x – 10 = 125.
x = 135.
ACUTE ANGLE
Less than 90 degrees
OBTUSE ANGLE
More than 90° and less than 180°
RIGHT ANGLE
A 90 degree angle