Trigonometry (MindTap Course List)
8th Edition
ISBN:9781305652224
Author:Charles P. McKeague, Mark D. Turner
Publisher:Charles P. McKeague, Mark D. Turner
Chapter3: Radian Measure
Section: Chapter Questions
Problem 4GP
Related questions
Question
Question 31-
Transcribed Image Text:You can use a reciprocal trigonometric function to solve a real-world probu
6 EXAMPLE
Real-World Connection
Indirect Measurement A handler of a parade balloon holds a line of length
length is modeled by the function y d see 0, where d is the distance from
handler of the balloon to the point on the ground just below the balloon, anda
the angle formed by the line and the ground. Graph the function for d6
the length of line needed to form an angle of 60.
y 6 sec e- 6() -
Use the definition of secant. Simplify
Graph the function, Use the value feature.
Real-World Connection
Xmin 0
Xmax=90
Xscl-30
Some large parade balloons
need more than 50 physically
fit, trained handlers.
Ymin 0
Ymax=30
X-60
Y=12
Yscl=3
• To form an angle of 60°, the line must be 12 ft long.
Check Understanding O How long must the line be to form an angle of 60°? Of 45°? Of 5?
EXERCISES
For more practice, see Extra Practice
Practice and Problem Solving
A Practice by Example
Evaluate each expression. Give your answer as a decimal rounded to the
nearest hundredth.
Example 1
(page 749)
1. csc 100°
2. csc 80°
3. cot (-55°)
4. sec 200
Evaluate each expression. Write your answer in exact form.
5. Suppose tan 0 =
. Find cot 0.
6. Suppose sin 0=
. Find csc 0.
7. Suppose cos 0 =
-. Find sec 0.
8. Suppose tan 0 =
. Find cot 6.
Example 2
(page 750)
Find the exact value of each expression. If the expression is undefined,
write undefined.
9. sec 45°
10. cot 60°
11. cot 90°
12. sec 180°
13. csc 0°
14. csc 60°
15. cot 0"
16, cot 30
17. sec 90°
18. csc 30°
19. sec 60°
20. csc 45
Evaluate each expression to the nearest hundredth. Each angle is given in radians.
Example 3
(page 750)
21. cot 3
22. sec n
23. csc5
24. sec (-)
25. sec 2.5
26. csc (-3.2)
27. cot
28. csc (-4.5)
Graph each function in the interval from 0 to 2r.
Example 4
(page 751)
29. y sec 20
30. y cot 0
31. y= csc 26
32. y esc 20
752
Chapter 13 Periodic Functions and Trigonometry
wni, L, 35453
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