Mathematics

1. Mathematics

2. Session Properties of Triangle - 1

3. Session Objectives

4. Session Objective • Sine Rule • Cosine Rule • Projection Rule • Tangents Rule (Napier’s Analogy) • Half Angle Formulae • Area of Triangle • Circumcircle of a Triangle and Its Radius • Incircle of a Triangle and Its Radius • Excircle of a Triangle and Its Radius

5. A c A b B C C B a Introduction BC = a CA = b AB = c (b) a + b > c; b + c > a; c + a > b

6. A B C D Sine Rule In any triangle, sides are proportional to the sines of the opposite angles, i.e. IF A,B,C are in A.P. then B = 60o

7. A When is an acute angled triangle. B C D b c a Sine Rule Proof :- Draw AD perpendicular to BC

8. Sine Rule From (i) and (ii), we get c sinB = b sinC Similarly Proved.

9. Question

10. Illustrative Problem Solution :

11. Solution Proved

12. B C A D c a b Cosine Rule or The Law of Cosines Proof :-

13. B C A D c a b Cosine Rule or The Law of Cosines

14. Class Test

15. In a if Class Exercise - 1 Solution : Let us try to find a,b,c in terms of K.  a = ……….., b = ……...., c = ……….. • b + c = 11k; c + a = 12k; a + b = 13k Adding we get 2 (a + b + c) = 36k

16. Solution  a + b + c = 18k a = 7k, b = 6k, c = 5k

17. c = a cosB + b cosA C A B D Projection Rule Proof :- Now c = AB = AD + BD Proved.

18. Class Test

19. In any prove that Class Exercise - 2 Solution : LHS =

20. Solution [Applying projection rule] [Applying cosine rule]

21. Tangents Rule (Napier’s Analogy) Proof :- By sine rule, we have

22. Tangents Rule (Napier’s Analogy) Proved

23. Half Angle Formulae Proof :-

24. Half Angle Formulae Proved.

25. Half Angle Formulae

26. Class Test

27. Class Exercise - 5 Solution : Given that

28. Solution  a + b + c = 3b a + c = 2b ... (i) We have to prove

29. Solution

30. A B C D Area of a Triangle Proof :- Here BC = a, AB = c, AC = b

31. Area of a Triangle Proved

32. (b) Hero’s formula Area of a Triangle Proof :-

33. Class Test

34. Class Exercise - 6

35. Solution  4bc cosA + bc sinA = 4bc  4cosA + sinA = 4

36. Solution which is not possible, since it in an angle of .

37. A R E F R O R B C D Circumcircle of a Triangle and its Radius Circum radius = R

38. Circumcircle of a Triangle and its Radius

39. A E F r r i r B C D Incircle of a Triangle and its Radius In Radius = r

40. Incircle of a Triangle and its Radius

41. A B C I1 Radii of Ex-circle in Terms of Sides and Angles Ex. Radius is = r1

42. Radii of Ex-circle in Terms of Sides and Angles

43. Radii of Ex-circle in Terms of Sides and Angles [Proof of these results are same as INCIRCLE and try yourself]

44. Class Tests

45. In a if b + c = 3a, then the value of is (a) 1 (b) 2 (c) (d) 3 Class Exercise - 3 Solution :- b + c = 3a = k (sinB + sinC) = 3k sinA

46. Solution Ans : b

47. In a if and the side a = 2 units, then area of the is • 1 sq. units (b) 2 sq. units • (c) sq. units (d) sq. units Class Exercise - 4

48. Solution Given  A = B = C Ans : d

49. If in a sides a, b, c are in AP, then are in (where are the ex- radii of the ) • AP (b) GP • (c) HP (d) None of these Class Exercise - 7

50. Solution Since a.b.c are in AP Ans : c  r1, r2, r3 are in H.P