Angle Pairs : Angle Pairs
Complementary Angles : Complementary Angles Complementary angles are two angles whose measures have a sum of 90°.
Complementary Angles : Complementary Angles These two angles (40° and 50°) are complementary because they add up to 90°.
But the angles don't have to be together. These two are complementary because
27° + 63° = 90°.
Given that the two angles below are complementary, solve for the value of x and the angle measurements. : Given that the two angles below are complementary, solve for the value of x and the angle measurements. mA 30
mB 2x + 10 mA + mB
30 + 2x + 10
2x
2x
x 90
90
90 – 30 – 10
50
25 =
=
=
=
= 30°
60°
Given that the two angles below are complementary, solve for the value of x and the angle measurements. : Given that the two angles below are complementary, solve for the value of x and the angle measurements. mC 2x + 20
mD 3x – 5 mC + mD
2x + 20 + 3x – 5
2x + 3x
5x
x 90
90
90 – 20 + 5
75
15 =
=
=
=
= 50°
40°
Given that the two angles below are complementary, solve for the value of x and the angle measurements. : Given that the two angles below are complementary, solve for the value of x and the angle measurements. mFEG 35 – x
mGEH 45 + 2x mFEG + mGEH
35 – x + 45 + 2x
– x + 2x
x 90
90
90 – 35 – 45
10 =
=
=
= 25°
65°
Solve for the value of x and the measurements of the angles, given that each pair of angles are complementary. : Solve for the value of x and the measurements of the angles, given that each pair of angles are complementary. J = (5x – 18)° & K = (4x)°
L = (45 – 2x)° & M = (40 + 3x)°
NOP = (5x – 20) & POQ = (x – 10)°
1 = (45 – x)° & 2 = (2x + 15)°
R = x° & S = (2x + 6) °
Solve for the value of x and the measurements of the angles, given that each pair of angles are complementary. : Solve for the value of x and the measurements of the angles, given that each pair of angles are complementary. J = (5x – 18)° & K = (4x)° 12 42 48
L = (45 – 2x)° & M = (40 + 3x)° 5 35 55
NOP = (5x – 20) & POQ = (x – 10)° 20 80 10
1 = (45 – x)° & 2 = (2x + 15)° 30 15 75
R = x° & S = (2x + 6) ° 28 28 62
Supplementary Angles : Supplementary Angles Supplementary angles are two angles whose measures have a sum of 180°.
Supplementary Angles : Supplementary Angles These two angles (140° and 40°) are supplementary because they add up to 180°.
But the angles don't have to be together. These two are supplementary because
27° + 63° = 180°.
Given that the two angles below are supplementary, solve for the value of x and the angle measurements. : Given that the two angles below are supplementary, solve for the value of x and the angle measurements. mT 50
mV 3x + 40 mT + mV
50 + 3x + 40
3x
3x
X 180
180
180 – 50 – 40
90
30 =
=
=
=
= 50°
130°
Given that the two angles below are supplementary, solve for the value of x and the angle measurements. : Given that the two angles below are supplementary, solve for the value of x and the angle measurements. mW 3x – 55
mX 155 – x mW + mX
3x – 55 + 155 – x
3x – x
2x
x 180
180
180 + 55 – 155
80
40 =
=
=
=
= 65°
115°
Given that the two angles below are supplementary, solve for the value of x and the angle measurements. : Given that the two angles below are supplementary, solve for the value of x and the angle measurements. mBYA 3x + 5
mAYZ 2x mBYA + mAYZ
3x + 5 + 2x
3x + 2x
5x
x 180
180
180 – 5
175
35 =
=
=
=
= 110°
70°
Solve for the value of x and the measurements of the angles, given that each pair of angles are supplementary. : Solve for the value of x and the measurements of the angles, given that each pair of angles are supplementary. C = (2x – 2)° & D = (x – 34)°
3 = (3x + 5)° & 4 = (5x + 5)°
EFG = (x – 20)° & GFH = (x + 60)°
J = (150 – x)° & K = (2x – 70)°
LMN = (2x + 1)° & PQR = (3x – 1)°
Solve for the value of x and the measurements of the angles, given that each pair of angles are supplementary. : Solve for the value of x and the measurements of the angles, given that each pair of angles are supplementary. C = (2x – 2)° & D = (x – 34)° 72 142 38
3 = (3x + 5)° & 4 = (5x + 5)° 15 100 80
EFG = (x – 20)° & GFH = (x + 60)° 80 60 120
J = (150 – x)° & K = (2x – 70)° 100 50 130
LMN = (2x + 1)° & PQR = (3x – 1)° 36 73 107
The Complement Theorem: Complements of congruent angles are congruent. : The Complement Theorem: Complements of congruent angles are congruent. Given:
C and O are complementary
P and M are complementary
O M
Prove:
C P
The Complement Theorem: Complements of congruent angles are congruent. : The Complement Theorem: Complements of congruent angles are congruent. STATEMENT
C and O are complementary
P and M are complementary
O M
mC + mO = 90
mP + mM = 90
mC + mO = mP + mM
mO = mM
mC = mP
C P REASON
Given
Definition of complementary angles
Transitive Property of Equality
Definition of congruent angles
Subtraction Property of Equality
Definition of congruent angles
Theorem: If two angles are complementary and adjacent, then they form a right angle. : Theorem: If two angles are complementary and adjacent, then they form a right angle.
The Supplement Theorem: Supplements of congruent angles are congruent. : The Supplement Theorem: Supplements of congruent angles are congruent.
Linear Pair : Linear Pair A linear pair consists of two adjacent angles whose noncommon sides are opposite rays.
Linear Pair Postulate: If two angles form a linear pair, then they are supplementary.
Vertical Angles : Vertical Angles Vertical angles are two nonadjacent angles formed by two intersecting lines.
Vertical Angle Theorem: Vertical angles are congruent. : Vertical Angle Theorem: Vertical angles are congruent.