Exercises for Chapter III Section 1

Do NOT use a calculator for any of these problems, give only exact answers. (See Preface)

1. Given that

     (a) Find r, a, b such that with the given angle

     (b) Find the other 5 trigonometric functions of

2. Given that find a complex number in both polar and rectangular forms having as its argument and then find the other five trigonometric functions of

3. Let be an angle with Find r, a, b such that with the given and then find and

4. Let acute. Find a complex number in both polar and rectangular forms having as its argument and then find and

5. Use the result of Problem 16 (b), Exercises for Chapter II Sections 3, 4, and 5 and definition (D) to find each of the following:

     (a) sin(15^o)         (b) cos(15^o)         (c) tan(15^o).

6. Use the result of Problem 16 (a), Exercises for Chapter II Sections 3, 4, and 5, the results of Example 3 in Section 5 of Chapter II and definition (D) to find each of the following:

     (a) sin(105^o);        (b) cos(105^o);        (c) tan(105^o);

     (d) sin(75^o);         (e) cos(75^o);          (f) tan(75^o).

7. Let be as in Problems 3 and 4 above. Use operations on complex numbers and the results of Problems 3 and 4 to find the following: [Do not use subtraction formulas, double angle formulas, etc.]

8. Given that use square roots of complex numbers [See Problem 29, Exercises for Chapter II Sections 3, 4, and 5.] to find all possibilities for:

9. Use operations on complex numbers (not sum and difference formulas) to verify each of the following:

     (a)         (b)

     (c)        (d)

10. It is clear from definitions (D) that there are values of for which some of the trigonometric functions are not defined because the denominator of the defining fraction will be zero.

      (a) Characterize all the values of for which the cosecant and cotangent are not defined.

      (b) Characterize all the values of for which the tangent and secant are not defined.

11. Prove the Pythagorean Identity; for all angles

12. Let Find all six trigonometric functions of in terms of c and s.

13. Let Find the six trigonometric functions of in terms of c for

         [HINT: Use the results of problems 11 and 12.]

14. Let Express in terms of c and s.

15. Use Problem 14 to express in terms of and for n = 1, 2, 3, 4, 5.

16. Express in terms of for n = 1, 2, 3, 4, 5.

17. Derive the addition, subtraction, and double angle formulas for the cosine, sine, tangent, and cotangent using complex numbers. (Some of these are in Examples 1, 2, and 3.)

18. (a) Derive the half angle formulas and using square roots of complex numbers. Explain choice of sign. [See Problem 31, Exercises for Chapter II Sections 3, 4, and 5.]

      (b) Use part (a) to show that

      (c) Use Problem 28, Exercises for Chapter II Sections 3, 4, and 5 to show that

19. (a) Complete the following table: [HINT: See Problem 3, Exercises for Chapter II Sections 3, 4, and 5. and use ]

x					0
sin(x)					0	1/2

      (b) Explain why

      (c) Use parts (a) and (b) to tabulate y = sin(x) for

      (d) Graph y = sin(x) for

20. (a) Graph y = cos(x) for

      (b) Graph y = tan(x) for

21. Use the formula csc(x) = 1/sin(x) and Problem 19 to graph y = csc(x) for and

22. Graph:

      (a) y = sec(x) for

      (b) y = cot(x) for and

23. Consider a right triangle with one of its acute angles. Let hyp be the length of the hypotenuse, adj the length of the side adjacent to and opp the length of the side opposite Verify each of the following:

24. Use the results of problems 5 and 23 above to find x in each of the following.

(a)	(b)	(c)
(d)	(e)	(f)

25. There is concern that a church steeple is too high for a new airport runway which is to be extended near by. An airport official stands at a point 24 feet from the point directly below the top of the steeple. From that location the angle of elevation to the top of the steeple is 75o. How tall is the steeple? [HINT: See problem 24 above.]