Chapter 35

1. Chapter 35 Inverse Circular Functions Prepared by : Tan Chor How (B.Sc) By Chtan FYHS-Kulai

2. Some fundamental concepts By Chtan FYHS-Kulai

3. Let y = sinx then we have or i.e. By Chtan FYHS-Kulai

4. is the inverse function of Iff y is the 1-1 function! By Chtan FYHS-Kulai

5. doesn’t mean Also doesn’t mean By Chtan FYHS-Kulai

6. 1 0 -1 In this region, , y is 1-1 function. By Chtan FYHS-Kulai

7. Now, if you flip the previous graph, Principal values -1 The principal values of y is defined as that value lying between . 0 1 By Chtan FYHS-Kulai

8. Similarly, check the cosine graph 1 0 -1 In this region, , y is 1-1 function. By Chtan FYHS-Kulai

9. Now, if you flip the previous graph, Principal values -1 The principal values of y is defined as that value lying between 0 and ∏ . 0 1 By Chtan FYHS-Kulai

10. 0 By Chtan FYHS-Kulai

11. Graph of Principal values The principal values of y is defined as that value lying between . 0 By Chtan FYHS-Kulai

12. Some books write as . Domain of y is Range of y is By Chtan FYHS-Kulai

13. By Chtan FYHS-Kulai

14. In general, we have By Chtan FYHS-Kulai

15. We also have : By Chtan FYHS-Kulai

16. e.g. 1 Evaluate . Soln : By Chtan FYHS-Kulai

17. e.g. 2 Evaluate . Soln : By Chtan FYHS-Kulai

18. e.g. 3 Evaluate . Soln : By Chtan FYHS-Kulai

19. e.g. 4 Evaluate . Soln : Let By Chtan FYHS-Kulai

20. Now, let see Same as . Domain of y is Range of y is By Chtan FYHS-Kulai

21. In general, we have By Chtan FYHS-Kulai

22. We also have : By Chtan FYHS-Kulai

23. e.g. 5 Evaluate . Soln : Between gives . By Chtan FYHS-Kulai

24. Now, let see Same as . Domain of y is Range of y is By Chtan FYHS-Kulai

25. Now, let see Same as . Domain of y is Range of y is By Chtan FYHS-Kulai

26. By Chtan FYHS-Kulai

27. e.g. 6 Evaluate . Soln : By Chtan FYHS-Kulai

28. e.g. 7 Evaluate . Soln : Let 5 4 3 By Chtan FYHS-Kulai

29. e.g. 8 Find the value of the following Expression : By Chtan FYHS-Kulai

30. Soln : Let and 2 5 3 1 4 By Chtan FYHS-Kulai

31. By Chtan FYHS-Kulai

32. e.g. 9 Find the value of the following Expression : By Chtan FYHS-Kulai

33. Soln : Let By Chtan FYHS-Kulai

34. There are 2 possible answers. [because a and b are both positive values, a+b must be positive value.] By Chtan FYHS-Kulai

35. Inverse trigonometric identities By Chtan FYHS-Kulai

36. Identity (1) By Chtan FYHS-Kulai

37. Identity (2) By Chtan FYHS-Kulai

38. Let prove the identity #1 To prove : Same as to prove : A By Chtan FYHS-Kulai

39. Check slide #14 LHS of A : RHS of A : We have, and B [ x(-1) ] By Chtan FYHS-Kulai

40. C B and C state that both and are . By Chtan FYHS-Kulai

41. i.e. By Chtan FYHS-Kulai

42. Let prove the identity #2 To prove : Same as to prove : A By Chtan FYHS-Kulai

43. But and [ x(-1) ] By Chtan FYHS-Kulai

44. Both and By Chtan FYHS-Kulai

45. e.g. 10 Prove that By Chtan FYHS-Kulai

46. Soln : Let then By Chtan FYHS-Kulai

47. i.e. By Chtan FYHS-Kulai

48. e.g. 11 Prove that Soln : Let LHS: By Chtan FYHS-Kulai

49. RHS: 2 B 3 By Chtan FYHS-Kulai

50. Inverse trigonometric equations By Chtan FYHS-Kulai