1
, CHAPTER 1 ma
Section 1.1 Solutions --------------------------------------------------------------------------------
ma ma ma
1 x 1 x
m a m a m a m
a m a m a m a
1. Solve for x:
m a ma ma m a ma 2. Solve for x:
m a ma ma m a ma
2 360∘ 4 360∘
360∘ 2x, so that x 180∘ .
ma ma m a ma m a ma ma ma 360∘ 4x, so that x 90∘ .
ma ma m a ma m a ma ma ma
1 x 2 x
3. Solve for x: 4. Solve for x:
m a m a m a m a m a m a
m a ma ma m a ma ma m a ma ma m a m a ma
3 360∘ 3 360∘
360∘ 3x, so that x 120∘ . (No
ma ma ma ma m a ma ma ma ma 720∘ 2(360∘ ) 3x, so that x 240∘
ma ma ma ma ma ma ma m a ma ma
te: The angle has a negative measure
ma ma ma ma ma ma . (Note: The angle has a negative me
ma ma m a ma ma ma ma m a
since it is a clockwise rotation.)
ma ma ma ma ma ma asure since it is a clockwise rotation.)
ma ma ma ma ma ma
5 x 7 x
m a m a m a ma mam a m a m a
5. Solve for x:
m a ma ma m a ma 6. Solve for x:
m a ma ma m a ma
6 360∘ 12 360∘
1800∘ 5(360∘ ) 6x, so that x 300∘ . 2520∘ 7(360∘ ) 12x, so that x 210∘
ma ma ma ma ma m a ma m a ma ma ma ma ma ma ma m
a ma ma m a ma ma ma
.
4 x 5 x
7. Solve for x: 8. Solve for x:
m
a m a m a m a m a m a m a
m a ma ma m a ma ma m a ma ma m a ma ma
5 360∘ 9 360∘
1440∘ 4(360∘ ) 5x, so that
ma ma 1800∘ 5(360∘ ) 9x, so that
ma ma ma ma ma ma ma ma ma ma ma ma
x 288∘ .
ma ma ma x 200∘ .
ma ma ma
(Note: The angle has a negative mea
m a ma ma ma ma ma (Note: The angle has a negative measu
m a ma ma ma ma ma
sure since it is a clockwise rotation.)
ma ma ma ma ma ma re since it is a clockwise rotation.)
ma ma ma ma ma ma
9. 10.
a) complement: 90∘ 18∘ 72∘ m a ma m a m a a) complement: 90∘ 39∘ 51∘ m a ma ma m a m a
b) supplement: m a 180∘ 18∘ 162∘ ma m a m a b) supplement: 180∘ 39∘ 141∘ m a ma ma m a m a
11. 12.
a) complement: 90∘ 42∘ 48∘ m a ma ma m a m a a) complement: 90∘ 57∘ 33∘ m a ma ma m a m a
b) supplement: 180∘ 42∘ 138∘ m a ma ma m a m a b) supplement: 180∘ 57∘ 123∘ m a ma ma m a m a
2
, Section 1.1 ma
13. 14.
a) complement: 90∘ 89∘ 1∘ m a ma ma m a m a a) complement: 90∘ 75∘ 15∘ m a ma ma m a m a
b) supplement: 180∘ 89∘ 91∘ m a ma ma m a m a b) supplement: 180∘ 75∘ 105∘ m a ma ma m a m a
15. Since the angles with measures 4x∘ and
m a ma ma ma ma ma m a m a 6x∘ are assumed to be complemma ma ma ma ma
entary, we know that 4x∘ 6x∘ 90∘. Simplifying this yields
ma ma ma ma ma ma ma ma m a ma ma
10x∘ 90∘ , ma ma m
a m a so that x 9. So, the two angles have measures 36∘and 54∘ .
ma m a ma ma m a ma ma ma ma ma m a ma ma
16. Since the angles with measures 3x∘ and
m a ma ma ma ma ma m a m a 15x∘ are assumed to be supplem ma ma ma ma ma
entary, we know that 3x∘ 15x∘ 180∘. Simplifying this yields
ma ma ma ma ma ma ma m
a m a ma ma
18x∘ 180∘, ma m
a ma so that x 10. So, the two angles have measures 30∘ and 150∘ .
ma m a ma m
a m a ma ma ma ma ma m a ma ma ma
17. Since the angles with measures
m a ma ma ma ma m a 8x∘ and 4x∘ are assumed to be supplemen
ma m a ma ma ma ma ma
tary, we know that 8x∘ 4x∘ 180∘. Simplifying this yields
ma ma ma ma ma ma ma m
a m a ma ma
12x∘ 180∘, ma m
a m a so that x 15. So, the two angles have measures 60∘ and 120∘ .
ma m a ma m
a m a ma ma ma ma ma m a ma ma ma
18. Since the angles with measures
m a 3x 15∘ and 10x 10∘ are assumed to be c
ma ma ma ma m a ma m
a m a ma m
a ma ma ma ma
omplementary, we know that 3x 15∘ 10x 10∘ 90∘. Simplifying this yields
ma ma ma ma ma ma ma ma ma ma m a ma ma
13x 25∘ 90∘, so that 13x∘ 65∘ and thus, x 5. So, the two angles have
ma ma ma ma m a ma ma ma ma m a ma m a ma ma m a ma ma ma ma ma
measures 30∘and 60∘ . m a ma ma
19. Since 180∘, we know
m a ma ma ma ma ma m a m
a m a ma ma 20. Since 180∘, we know t
m a ma ma ma ma ma m a m
a m a ma ma
that hat
1 17∘ –33∘ 180∘ and so, 30∘ . 1 10∘ –45∘ 180∘ and so, 25∘ .
– –
ma ma ma ma m
a ma ma m a ma ma ma ma ma ma ma m
a ma ma ma ma ma ma
ma ma
ma150∘ ma155∘
21. Since 180∘, we know
m a ma ma ma ma ma m a m
a m a ma ma 22. Since 180∘, we know t
m a ma ma ma ma ma m a m
a m a ma ma
that hat
4 180∘ and so, 30∘.
ma m
a ma ma ma ma ma m
a ma ma ma ma ma 3 180∘ and so, 36∘.
ma m
a ma ma ma ma ma m
a ma ma ma ma ma
–– –– –– ––
ma6ma ma5
Thus, 4 120∘ and 30∘
m a m a ma m a m
a m a ma m a ma m a ma ma Thus, 3 108∘ and 36∘ .
m a ma ma m a ma m a ma m a ma m a ma ma
.
3
,
, CHAPTER 1 ma
Section 1.1 Solutions --------------------------------------------------------------------------------
ma ma ma
1 x 1 x
m a m a m a m
a m a m a m a
1. Solve for x:
m a ma ma m a ma 2. Solve for x:
m a ma ma m a ma
2 360∘ 4 360∘
360∘ 2x, so that x 180∘ .
ma ma m a ma m a ma ma ma 360∘ 4x, so that x 90∘ .
ma ma m a ma m a ma ma ma
1 x 2 x
3. Solve for x: 4. Solve for x:
m a m a m a m a m a m a
m a ma ma m a ma ma m a ma ma m a m a ma
3 360∘ 3 360∘
360∘ 3x, so that x 120∘ . (No
ma ma ma ma m a ma ma ma ma 720∘ 2(360∘ ) 3x, so that x 240∘
ma ma ma ma ma ma ma m a ma ma
te: The angle has a negative measure
ma ma ma ma ma ma . (Note: The angle has a negative me
ma ma m a ma ma ma ma m a
since it is a clockwise rotation.)
ma ma ma ma ma ma asure since it is a clockwise rotation.)
ma ma ma ma ma ma
5 x 7 x
m a m a m a ma mam a m a m a
5. Solve for x:
m a ma ma m a ma 6. Solve for x:
m a ma ma m a ma
6 360∘ 12 360∘
1800∘ 5(360∘ ) 6x, so that x 300∘ . 2520∘ 7(360∘ ) 12x, so that x 210∘
ma ma ma ma ma m a ma m a ma ma ma ma ma ma ma m
a ma ma m a ma ma ma
.
4 x 5 x
7. Solve for x: 8. Solve for x:
m
a m a m a m a m a m a m a
m a ma ma m a ma ma m a ma ma m a ma ma
5 360∘ 9 360∘
1440∘ 4(360∘ ) 5x, so that
ma ma 1800∘ 5(360∘ ) 9x, so that
ma ma ma ma ma ma ma ma ma ma ma ma
x 288∘ .
ma ma ma x 200∘ .
ma ma ma
(Note: The angle has a negative mea
m a ma ma ma ma ma (Note: The angle has a negative measu
m a ma ma ma ma ma
sure since it is a clockwise rotation.)
ma ma ma ma ma ma re since it is a clockwise rotation.)
ma ma ma ma ma ma
9. 10.
a) complement: 90∘ 18∘ 72∘ m a ma m a m a a) complement: 90∘ 39∘ 51∘ m a ma ma m a m a
b) supplement: m a 180∘ 18∘ 162∘ ma m a m a b) supplement: 180∘ 39∘ 141∘ m a ma ma m a m a
11. 12.
a) complement: 90∘ 42∘ 48∘ m a ma ma m a m a a) complement: 90∘ 57∘ 33∘ m a ma ma m a m a
b) supplement: 180∘ 42∘ 138∘ m a ma ma m a m a b) supplement: 180∘ 57∘ 123∘ m a ma ma m a m a
2
, Section 1.1 ma
13. 14.
a) complement: 90∘ 89∘ 1∘ m a ma ma m a m a a) complement: 90∘ 75∘ 15∘ m a ma ma m a m a
b) supplement: 180∘ 89∘ 91∘ m a ma ma m a m a b) supplement: 180∘ 75∘ 105∘ m a ma ma m a m a
15. Since the angles with measures 4x∘ and
m a ma ma ma ma ma m a m a 6x∘ are assumed to be complemma ma ma ma ma
entary, we know that 4x∘ 6x∘ 90∘. Simplifying this yields
ma ma ma ma ma ma ma ma m a ma ma
10x∘ 90∘ , ma ma m
a m a so that x 9. So, the two angles have measures 36∘and 54∘ .
ma m a ma ma m a ma ma ma ma ma m a ma ma
16. Since the angles with measures 3x∘ and
m a ma ma ma ma ma m a m a 15x∘ are assumed to be supplem ma ma ma ma ma
entary, we know that 3x∘ 15x∘ 180∘. Simplifying this yields
ma ma ma ma ma ma ma m
a m a ma ma
18x∘ 180∘, ma m
a ma so that x 10. So, the two angles have measures 30∘ and 150∘ .
ma m a ma m
a m a ma ma ma ma ma m a ma ma ma
17. Since the angles with measures
m a ma ma ma ma m a 8x∘ and 4x∘ are assumed to be supplemen
ma m a ma ma ma ma ma
tary, we know that 8x∘ 4x∘ 180∘. Simplifying this yields
ma ma ma ma ma ma ma m
a m a ma ma
12x∘ 180∘, ma m
a m a so that x 15. So, the two angles have measures 60∘ and 120∘ .
ma m a ma m
a m a ma ma ma ma ma m a ma ma ma
18. Since the angles with measures
m a 3x 15∘ and 10x 10∘ are assumed to be c
ma ma ma ma m a ma m
a m a ma m
a ma ma ma ma
omplementary, we know that 3x 15∘ 10x 10∘ 90∘. Simplifying this yields
ma ma ma ma ma ma ma ma ma ma m a ma ma
13x 25∘ 90∘, so that 13x∘ 65∘ and thus, x 5. So, the two angles have
ma ma ma ma m a ma ma ma ma m a ma m a ma ma m a ma ma ma ma ma
measures 30∘and 60∘ . m a ma ma
19. Since 180∘, we know
m a ma ma ma ma ma m a m
a m a ma ma 20. Since 180∘, we know t
m a ma ma ma ma ma m a m
a m a ma ma
that hat
1 17∘ –33∘ 180∘ and so, 30∘ . 1 10∘ –45∘ 180∘ and so, 25∘ .
– –
ma ma ma ma m
a ma ma m a ma ma ma ma ma ma ma m
a ma ma ma ma ma ma
ma ma
ma150∘ ma155∘
21. Since 180∘, we know
m a ma ma ma ma ma m a m
a m a ma ma 22. Since 180∘, we know t
m a ma ma ma ma ma m a m
a m a ma ma
that hat
4 180∘ and so, 30∘.
ma m
a ma ma ma ma ma m
a ma ma ma ma ma 3 180∘ and so, 36∘.
ma m
a ma ma ma ma ma m
a ma ma ma ma ma
–– –– –– ––
ma6ma ma5
Thus, 4 120∘ and 30∘
m a m a ma m a m
a m a ma m a ma m a ma ma Thus, 3 108∘ and 36∘ .
m a ma ma m a ma m a ma m a ma m a ma ma
.
3
,