Trigonometry Review Worksheet, Summaries of Trigonometry

A review worksheet for Trigonometry, covering topics such as angle conversion, coterminal angles, trigonometric functions, and graphing. The worksheet includes various exercises and problems for students to solve, with answers provided. suitable for students studying Trigonometry in their first semester.

Typology: Summaries

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Trigonometry Trigonometry, Foerster 3rd Edition
TrigSem1Review 1 11/10/2018
Do Not Write
on this
Worksheet
Chapter 1 Review:
Convert the angle measure to degrees, rounded to two decimal places.
1)
5454
2)
21245
3)
038185
Convert each angle to Degrees Minutes Seconds (
SMD
).
4)
355.72
5)
715.35
Determine the coterminal angle of the given angle, and find its reference angle. Draw the angle,
marking the coterminal and reference angles.
6)
487
7)
795
8)
9)
6
41
Evaluate (find the exact value).
10)
4
5
sin
11)
tan
12)
6
5
sec
13)
240cos
14)
315cot
15)
120csc
Find the exact values of the six trigonometric functions of angle
θ
whose terminal side passes
through the given point.
16)
5
4
,
5
3
17)
17
15
,
17
8
18)
13
12
,
13
5
19) Find the exact values of the six trigonometric functions of angle
given
terminates in Quadrant III and
.
3
1
cos
20) Evaluate (find the exact value)
.60sin60cot135tan60sec
21) Sketch a right triangle with an acute angle of
.28
If the hypotenuse is 46 inches long, how long is the side
opposite the
28
angle? Round your answer to two decimal places.
22) A right triangle has legs 31 inches and 42 inches. What is the measure of the larger acute angle, correct to the
nearest minute?
23) Suppose there is a 457-meter tall tower in Redlands that casts a shadow 1050 meters long on the ground at a
certain time of day. What is the angle of elevation of the sun at that time of day?
Use your calculator to determine the following angles to two decimal places. Watch the mode.
24)
)5937.0(sin 1
25)
)3281.1(tanx 1
Chapter 2 Review:
Convert each angle to radian measure. Convert each angle to degrees.
Show your work. Show your work.
26)
140
27)
425
28)
3
4
29)
8
11
Find the exact values of the given expressions.
30)
6
5
cos
4
3
tan
31)
6
11
csc
32)
4
cos
6
7
sin 22
Find the amplitude, period, phase displacement, and vertical displacement. Then use this
information to find critical points and draw the graph of the given function.
33)
)x2(sin3y
34)
3
2
cos
2
1
y
35)
)10(5sin42y
36)
)1x(
12
cos53y
Trig Semester 1 Review
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Trigonometry – Trigonometry, Foerster 3rd^ Edition

TrigSem1Review 1 11/10/

Do Not Write

on this

Chapter 1 Review: Worksheet

Convert the angle measure to degrees, rounded to two decimal places.

  1. 245 12 

  1. 85 18  30  

Convert each angle to Degrees Minutes Seconds ( D MS

  1. 355 5) 
  2. 715

Determine the coterminal angle of the given angle, and find its reference angle. Draw the angle,

marking the coterminal and reference angles.

 487 7)

  795 8) 3

Evaluate (find the exact value).

sin

  1. tan 12) 6

sec

 cos 240 14)  cot 315 15)  csc 120

Find the exact values of the six trigonometric functions of angle θwhose terminal side passes

through the given point.

19) Find the exact values of the six trigonometric functions of angle given terminates in Quadrant III and

cos

  1. Evaluate (find the exact value)sec 60 tan 135 cot 60 sin 60.

    

  1. Sketch a right triangle with an acute angle of 28.  If the hypotenuse is 46 inches long, how long is the side

opposite the  28 angle? Round your answer to two decimal places.

  1. A right triangle has legs 31 inches and 42 inches. What is the measure of the larger acute angle, correct to the

nearest minute?

  1. Suppose there is a 457-meter tall tower in Redlands that casts a shadow 1050 meters long on the ground at a

certain time of day. What is the angle of elevation of the sun at that time of day?

Use your calculator to determine the following angles to two decimal places. Watch the mode.

  1. sin ( 0. 5937 )  1   25) x tan ( 1. 3281 ) 1   

Chapter 2 Review:

Convert each angle to radian measure. Convert each angle to degrees.

Show your work. Show your work.

 140 27)   425 28) 3

Find the exact values of the given expressions.

cos 4

tan

csc

cos 6

sin

Find the amplitude, period, phase displacement, and vertical displacement. Then use this

information to find critical points and draw the graph of the given function.

  1. y  3 sin( 2 x) 34)  

cos 2

y 35)y 2 4 sin 5 ( 10 )

 (^)     36)  

   (x 1 ) 12

y 3 5 cos

Trig Semester 1 Review

Trigonometry – Trigonometry, Foerster 3rd^ Edition

TrigSem1Review 2 11/10/

1

2

3

y

–10 –5 5 10 15 20 25 x

1

2

3

y

For the given graph, determine the amplitude, period, phase displacement, and vertical

displacement. Write an equation of the sinusoid.

Graph at least two cycles of the given function.

  1. y tan 40) y secx 41) y  2 cotx 42)y csc( 3 )

Find the exact principal value of θor x.

 2

Sin

1

2

x Cos

1

  1. x Sin ( 1 )

1  

  1.  

 2

Cos

1

Find θ to two decimal places and x to 4 decimal places, getting

a) the general solution,

b) the first three positive values of θ or x.

  1. cos ( 0. 42 )

1   

  1. x sin ( 0. 7136 )

 1 

Chapter 3 Review:

Use trigonometric properties to simplify.

  1. (^) tancsc 50) x secx 2

cos (^)  

51)sin xsec x sin x 2 2 2  52)cos ( 1 tan ) 2   

tan x 1

2 

54)tan x 2 tan x 1 4 2   55) secx 1

secx 1

56)sin A cos A 4 4  57) 

sec

csc

Prove each identity.

58)( 1  tan) sec  2 tan 2 2

  1. sinxcosx tanx

1 cos x 2 

60)sin x(cscx sinx) cos x 2  

Find the exact value using sum and difference formulas.

61)cos( 45 60 )

   62)  

sin 63)sin ( 210 60 )

   64)  

cos

Find the exact value given that ,

sin u  ,

- 3

cos v  and u and v are in quadrant II. Determine

cosu and sinvfirst.

  1. sin (uv) 66) cos (uv) 67)cos (vu)

Given the following function and location of angle A, find the exact value of sin(2A), cos(2A),and

tan(2A). Determine the missing sinAor cosA first in each problem.

sin A Quadrant II 69) ,

cos A

 Quadrant III 70) ,

sin A

 Quadrant IV

 300

 100

 200

 400