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Math Problems
Precalculus
Inverses of trigonometric functions
Dingane has been observing a certain stock for the last few years and he sees that it can be modeled as a function
S
(
t
)
S(t)
S
(
t
)
of time
t
t
t
(in days) using a sinusoidal expression of the form
a
⋅
sin
(
b
⋅
t
)
+
d
a \cdot \sin (b \cdot t)+d
a
⋅
sin
(
b
⋅
t
)
+
d
.
\newline
On day
t
=
0
t=0
t
=
0
, the stock is at its average value of
$
3.47
\$ 3.47
$3.47
per share, but
91
91
91
.
25
25
25
days later, its value is down to its minimum of
$
1.97
\$ 1.97
$1.97
.
\newline
Find
S
(
t
)
S(t)
S
(
t
)
.
\newline
t
t
t
should be in radians.
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A toy boat is bobbing on the water.
\newline
Its distance
D
(
t
)
D(t)
D
(
t
)
(in
m
\mathrm{m}
m
) from the floor of the lake as a function of time
t
t
t
(in seconds) can be modeled by a sinusoidal expression of the form
a
⋅
sin
(
b
⋅
t
)
+
d
a \cdot \sin (b \cdot t)+d
a
⋅
sin
(
b
⋅
t
)
+
d
.
\newline
At
t
=
0
t=0
t
=
0
, when the boat is exactly in the middle of its oscillation, it is
1
m
1 \mathrm{~m}
1
m
above the water's floor. The boat reaches its maximum height of
1.2
m
1.2 \mathrm{~m}
1.2
m
after
π
4
\frac{\pi}{4}
4
π
seconds.
\newline
Find
D
(
t
)
D(t)
D
(
t
)
.
\newline
t
t
t
should be in radians.
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If
a
π
a\pi
aπ
radians is equal to
1
,
440
1,440
1
,
440
degrees, what is the value of
a
a
a
?
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10
10
10
. (
8
8
8
pts) CHOOSE TWO. Use a trigonometric ratio to determine the value of
x
x
x
or the missing angle. Round your answer to the nearest tenth if necessary.
\newline
a.
\newline
Answer:
\qquad
\newline
b.
\newline
c.
\newline
S
O
H
\mathrm{SOH}
SOH
\newline
Answer:
\qquad
\newline
d.
\newline
Answer:
\newline
Answer:
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Convert the angle
−
4.5
-4.5
−
4.5
radians to degrees, rounding to the nearest
10
10
10
th.
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Convert the angle
θ
\theta
θ
to radians. Express your answer exactly.
θ
\theta
θ
radians
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The daily low temperature in Guangzhou, China, varies over time in a periodic way that can be modeled by a trigonometric function. The period of change is exactly
1
1
1
year. The temperature peaks around July
15
15
15
at
T
e
x
t
m
a
x
T_{ ext{max}}
T
e
x
t
ma
x
, and has its minimum half a year later at
T
e
x
t
m
i
n
T_{ ext{min}}
T
e
x
t
min
. Assuming a year is exactly
365
365
365
days, July
15
15
15
is rac{195}{365} of a year after January
1
1
1
. Find the formula of the trigonometric function that models the daily low temperature
T
T
T
in Guangzhou
t
t
t
years after January
1
1
1
,
15
15
15
1
1
1
. Define the function using radians.
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In
∠
U
V
W
\angle UVW
∠
U
VW
,
u
=
63
u=63
u
=
63
inches,
v
=
91
v=91
v
=
91
inches and
w
=
60
w=60
w
=
60
inches. Find the measure of
∠
W
\angle W
∠
W
to the nearest degree.
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Find the area in the left tail more extremetsan
z
=
−
2.56
z=-2.56
z
=
−
2.56
in a standard normal distribution. Round your answer to four decimal places. Area -
□
\square
□
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Find the area in the left tail more extreme than
z
=
−
2.56
z=-2.56
z
=
−
2.56
in a standard normal distribution.
\newline
Round your answer to four decimal places.
\newline
Area -
□
\square
□
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A circle has a radius of
13
m
13 \mathrm{~m}
13
m
. Find the radian measure of the central angle
θ
\theta
θ
that intercepts an arc of length
6
m
6 \mathrm{~m}
6
m
.
\newline
Do not round any intermedlate computations, and round your answer to the nearest tenth.
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△
M
N
P
≅
△
Q
R
S
\triangle M N P \cong \triangle Q R S
△
MNP
≅
△
QRS
\newline
Determine the following measures. Enter deg after any value that is in degrees.
\newline
The length of
M
N
M N
MN
.
\newline
M
N
=
M N=
MN
=
\newline
c
m
\mathrm{cm}
cm
\newline
The measure of
m
∠
Q
m \angle Q
m
∠
Q
.
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Hiro is riding a carousel that is next to a wall.
\newline
His horizontal distance
C
(
t
)
C(t)
C
(
t
)
(in
m
\mathrm{m}
m
) away from the wall as a function of time
t
t
t
(in seconds) can be modeled by a sinusoidal expression of the form
a
⋅
cos
(
b
⋅
t
)
+
d
a \cdot \cos (b \cdot t)+d
a
⋅
cos
(
b
⋅
t
)
+
d
.
\newline
At
t
=
0
t=0
t
=
0
, when he starts, he is closest to the wall, a distance of
2
m
2 \mathrm{~m}
2
m
away. After
7
π
7 \pi
7
π
seconds he reaches his mid-way point from the wall, which is
7
m
7 \mathrm{~m}
7
m
away.
\newline
Find
C
(
t
)
C(t)
C
(
t
)
.
\newline
t
t
t
should be in radians.
\newline
C
(
t
)
=
C(t)=
C
(
t
)
=
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What is the amplitude of
y
=
−
3
cos
(
π
x
+
2
)
−
6
?
y=-3 \cos (\pi x+2)-6 ?
y
=
−
3
cos
(
π
x
+
2
)
−
6
?
\newline
□
\square
□
units
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Convert the angle
θ
=
17
π
18
\theta=\frac{17\pi}{18}
θ
=
18
17
π
radians to degrees.
\newline
Express your answer exactly.
\newline
θ
=
□
∘
\theta=\square^{\circ}
θ
=
□
∘
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The area of the tropencid ts
135
135
135
square centimeters.
\newline
What is the trapezoid's helght,
h
h
h
?
\newline
h
=
□
\mathbf{h}=\square
h
=
□
centimeters
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Convert the angle
θ
=
9
π
5
\theta=\frac{9 \pi}{5}
θ
=
5
9
π
radians to degrees.
\newline
Express your answer exactly.
\newline
θ
=
\theta=
θ
=
\newline
□
\square
□
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u
⃗
=
(
6
,
7
)
\vec{u}=(6,7)
u
=
(
6
,
7
)
\newline
Find the direction angle of
u
⃗
\vec{u}
u
.
\newline
Enter your answer as an angle in degrees between
0
∘
0^{\circ}
0
∘
and
36
0
∘
360^{\circ}
36
0
∘
rounded to the nearest hundredth.
\newline
θ
=
\theta=
θ
=
\newline
□
\square
□
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square of side
50
c
m
50 \mathrm{~cm}
50
cm
Nn in it. Find the difference in area of the re
π
=
3.14
)
\pi=3.14)
π
=
3.14
)
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Convert the angle
θ
=
8
π
9
\theta=\frac{8 \pi}{9}
θ
=
9
8
π
radians to degrees.
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The questions below are posed in order to help you think about how to find the number of degrees in
7
π
9
\frac{7 \pi}{9}
9
7
π
radians.
\newline
What fraction of a semicircle is an angle that measures
7
π
9
\frac{7 \pi}{9}
9
7
π
radians? Express your answer as a fraction in simplest terms.
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The questions below are posed in order to help you think about how to find the number of degrees in
5
π
12
\frac{5 \pi}{12}
12
5
π
radians.
\newline
What fraction of a semicircle is an angle that measures
5
π
12
\frac{5 \pi}{12}
12
5
π
radians? Express your answer as a fraction in simplest terms.
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The questions below are posed in order to help you think about how to find the number of degrees in
5
π
6
\frac{5 \pi}{6}
6
5
π
radians.
\newline
What fraction of a semicircle is an angle that measures
5
π
6
\frac{5 \pi}{6}
6
5
π
radians? Express your answer as a fraction in simplest terms.
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The area of a parallelogram is
10
10
10
, and the lengths of its sides are
6
6
6
.
9
9
9
and
6
6
6
.
7
7
7
. Determine, to the nearest tenth of a degree, the measure of the acute angle of the parallelogram.
\newline
Answer:
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The area of a parallelogram is
456
456
456
, and the lengths of its sides are
25
25
25
and
62
62
62
. Determine, to the nearest tenth of a degree, the measure of the acute angle of the parallelogram.
\newline
Answer:
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The area of a triangle is
10
10
10
. Two of the side lengths are
5
5
5
.
3
3
3
and
5
5
5
and the included angle is obtuse. Find the measure of the included angle, to the nearest tenth of a degree.
\newline
Answer:
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The area of a triangle is
5
5
5
. Two of the side lengths are
1
1
1
.
4
4
4
and
9
9
9
.
6
6
6
and the included angle is obtuse. Find the measure of the included angle, to the nearest tenth of a degree.
\newline
Answer:
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The area of a triangle is
6
6
6
. Two of the side lengths are
9
9
9
.
6
6
6
and
1
1
1
.
5
5
5
and the included angle is obtuse. Find the measure of the included angle, to the nearest tenth of a degree.
\newline
Answer:
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3
π
2
\frac{3\pi}{2}
2
3
π
in degrees
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Convert the angle
θ
=
26
0
∘
\theta=260^{\circ}
θ
=
26
0
∘
to radians.
\newline
Express your answer exactly.
\newline
θ
=
□
radians
\theta=\square \text { radians }
θ
=
□
radians
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Find the direction angle of
u
=
(
−
10
,
7
)
\mathbf{u} = (-10,7)
u
=
(
−
10
,
7
)
. Enter your answer as an angle in degrees between
0
∘
0^\circ
0
∘
and
36
0
∘
360^\circ
36
0
∘
rounded to the nearest hundredth.
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Find the direction angle of
u
=
(
−
7
,
−
10
)
\mathbf{u}=(-7,-10)
u
=
(
−
7
,
−
10
)
. Enter your answer as an angle in degrees between
0
∘
0^\circ
0
∘
and
36
0
∘
360^\circ
36
0
∘
rounded to the nearest hundredth.
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Convert the angle
θ
=
34
5
∘
\theta = 345^\circ
θ
=
34
5
∘
to radians. Express your answer exactly.
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Convert the angle
−
4.5
-4.5
−
4.5
radians to degrees, rounding to the nearest
1
0
t
h
10^{th}
1
0
t
h
.
\newline
Answer:
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In the month of March, the temperature at the South Pole varies over the day in a periodic way that can be modeled approximately by a trigonometric function. The highest temperature is about
−
5
0
∘
C
-50^\circ\text{C}
−
5
0
∘
C
, and it is reached around
2
p.m.
2\text{p.m.}
2
p.m.
The lowest temperature is about
−
5
4
∘
C
-54^\circ\text{C}
−
5
4
∘
C
and it is reached half a day apart from the highest temperature, at
2
a.m.
2\text{a.m.}
2
a.m.
Find the formula of the trigonometric function that models the temperature
T
T
T
in the South Pole in March
t
t
t
hours after midnight. Define the function using radians.
\newline
T
(
t
)
=
□
T(t)=\square
T
(
t
)
=
□
\newline
What is the temperature at
5
p.m.
5\text{p.m.}
5
p.m.
? Round your answer, if necessary, to two decimal places.
\newline
∘
C
^\circ\text{C}
∘
C
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Convert the angle
−
2
-2
−
2
.
5
5
5
radians to degrees, rounding to the nearest
10
10
10
th.
\newline
Answer:
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Convert the angle
−
0
-0
−
0
.
5
5
5
radians to degrees, rounding to the nearest
10
10
10
th.
\newline
Answer:
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Convert the following angle from degrees to radians. Express your answer in simplest form.
\newline
57
0
∘
570^{\circ}
57
0
∘
\newline
Answer:
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Rotate the yellow dot to a location of
1
1
1
radian. After you rotate the angle, determine the value of
cos
1
\cos 1
cos
1
, to the nearest hundredth.
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Rotate the yellow dot to a location of
3
3
3
radians. After you rotate the angle, determine the value of
csc
3
\csc 3
csc
3
, to the nearest hundredth.
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Rotate the yellow dot to a location of
3
π
2
\frac{3 \pi}{2}
2
3
π
radians. After you rotate the angle, determine the value of
sin
3
π
2
\sin \frac{3 \pi}{2}
sin
2
3
π
, to the nearest hundredth.
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Rotate the yellow dot to a location of
π
2
\frac{\pi}{2}
2
π
radians. After you rotate the angle, determine the value of
tan
π
2
\tan \frac{\pi}{2}
tan
2
π
, to the nearest hundredth.
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Rotate the yellow dot to a location of
2
π
2 \pi
2
π
radians. After you rotate the angle, determine the value of
tan
2
π
\tan 2 \pi
tan
2
π
, to the nearest hundredth.
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Rotate the yellow dot to a location of
3
π
2
\frac{3 \pi}{2}
2
3
π
radians. After you rotate the angle, determine the value of
cos
3
π
2
\cos \frac{3 \pi}{2}
cos
2
3
π
, to the nearest hundredth.
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Rotate the yellow dot to a location of
π
2
\frac{\pi}{2}
2
π
radians. After you rotate the angle, determine the value of
sin
π
2
\sin \frac{\pi}{2}
sin
2
π
, to the nearest hundredth.
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Convert the angle
4
4
4
.
5
5
5
radians to degrees, rounding to the nearest
10
10
10
th.
\newline
Answer:
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Convert the angle
−
4
-4
−
4
.
5
5
5
radians to degrees, rounding to the nearest
10
10
10
th.
\newline
Answer:
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Convert the angle
−
5
-5
−
5
radians to degrees, rounding to the nearest
10
10
10
th.
\newline
Answer:
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Convert the angle
2
2
2
radians to degrees, rounding to the nearest
10
10
10
th.
\newline
Answer:
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Convert the angle
−
1
-1
−
1
radian to degrees, rounding to the nearest
10
10
10
th.
\newline
Answer:
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1
2
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