12X1 T09 05 combinations

1. Combinations

2. Combinations A combination is a set of objects where the order that they are arranged is not important.

3. Combinations A combination is a set of objects where the order that they are arranged is not important. If we arrange objects in a line, and the order is not important then;

4. Combinations A combination is a set of objects where the order that they are arranged is not important. If we arrange objects in a line, and the order is not important then; A B is the same arrangement as B A

5. Combinations A combination is a set of objects where the order that they are arranged is not important. If we arrange objects in a line, and the order is not important then; A B is the same arrangement as B A e.g. 5 objects, arrange 2 of them

6. Combinations A combination is a set of objects where the order that they are arranged is not important. If we arrange objects in a line, and the order is not important then; A B is the same arrangement as B A e.g. 5 objects, arrange 2 of them A B B A C A D A E A A C B C C B D B E B A D B D C D D C E C A E B E C E D E E D

7. Combinations A combination is a set of objects where the order that they are arranged is not important. If we arrange objects in a line, and the order is not important then; A B is the same arrangement as B A e.g. 5 objects, arrange 2 of them A B B A C A D A E A A C B C C B D B E B A D B D C D D C E C A E B E C E D E E D Permutations  5P2  20

8. Combinations A combination is a set of objects where the order that they are arranged is not important. If we arrange objects in a line, and the order is not important then; A B is the same arrangement as B A e.g. 5 objects, arrange 2 of them A B B A C A D A E A A C B C C B D B E B A D B D C D D C E C A E B E C E D E E D Permutations  5P2  20

9. Combinations A combination is a set of objects where the order that they are arranged is not important. If we arrange objects in a line, and the order is not important then; A B is the same arrangement as B A e.g. 5 objects, arrange 2 of them A B B A C A D A E A A C B C C B D B E B A D B D C D D C E C A E B E C E D E E D 20 Permutations  5P2 Combinations  2!  20  10

10. 5 objects, arrange 3 of them

11. 5 objects, arrange 3 of them A B C B A C C A B D A B E A B A B D B A D C A D D A C E A C A B E B A E C A E D A E E A D A C B B C A C B A D B A E B A A C D B C D C B D D B C E B C A C E B C E C B E D B E E B D A D B B D A C D A D C A E C A A D C B D C C D B D C B E C B A D E B D E C D E D C E E C D A E B B E A C E A D E A E D A A E C B E C C E B D E B E D B A E D B E D C E D D E C E D C

12. 5 objects, arrange 3 of them A B C B A C C A B D A B E A B A B D B A D C A D D A C E A C A B E B A E C A E D A E E A D A C B B C A C B A D B A E B A A C D B C D C B D D B C E B C A C E B C E C B E D B E E B D A D B B D A C D A D C A E C A A D C B D C C D B D C B E C B A D E B D E C D E D C E E C D A E B B E A C E A D E A E D A A E C B E C C E B D E B E D B A E D B E D C E D D E C E D C Permutations  5P3  60

13. 5 objects, arrange 3 of them A B C B A C C A B D A B E A B A B D B A D C A D D A C E A C A B E B A E C A E D A E E A D A C B B C A C B A D B A E B A A C D B C D C B D D B C E B C A C E B C E C B E D B E E B D A D B B D A C D A D C A E C A A D C B D C C D B D C B E C B A D E B D E C D E D C E E C D A E B B E A C E A D E A E D A A E C B E C C E B D E B E D B A E D B E D C E D D E C E D C Permutations  5P3  60

14. 5 objects, arrange 3 of them A B C B A C C A B D A B E A B A B D B A D C A D D A C E A C A B E B A E C A E D A E E A D A C B B C A C B A D B A E B A A C D B C D C B D D B C E B C A C E B C E C B E D B E E B D A D B B D A C D A D C A E C A A D C B D C C D B D C B E C B A D E B D E C D E D C E E C D A E B B E A C E A D E A E D A A E C B E C C E B D E B E D B A E D B E D C E D D E C E D C 60 Permutations  5P3 Combinations  3!  60  10

15. If we have n different objects, and we arrange k of them and are not concerned about the order;

16. If we have n different objects, and we arrange k of them and are not concerned about the order; n Pk Number of Arrangements  k!

17. If we have n different objects, and we arrange k of them and are not concerned about the order; n Pk Number of Arrangements  k! n!  n  k !k!

18. If we have n different objects, and we arrange k of them and are not concerned about the order; n Pk Number of Arrangements  k! n!  n  k !k!  nCk

19. If we have n different objects, and we arrange k of them and are not concerned about the order; n Pk Number of Arrangements  k! n!  n  k !k!  nCk e.g. (i) How many ways can 6 numbers be chosen from 45 numbers?

20. If we have n different objects, and we arrange k of them and are not concerned about the order; n Pk Number of Arrangements  k! n!  n  k !k!  nCk e.g. (i) How many ways can 6 numbers be chosen from 45 numbers? Ways  45C6

21. If we have n different objects, and we arrange k of them and are not concerned about the order; n Pk Number of Arrangements  k! n!  n  k !k!  nCk e.g. (i) How many ways can 6 numbers be chosen from 45 numbers? Ways  45C6  8145060

22. If we have n different objects, and we arrange k of them and are not concerned about the order; n Pk Number of Arrangements  k! n!  n  k !k!  nCk e.g. (i) How many ways can 6 numbers be chosen from 45 numbers? Ways  45C6  8145060 Note: at 40 cents per game, $3 258 024 = amount of money you have to spend to guarantee a win in Lotto.

23. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions?

24. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5

25. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people from 11, gender does not matter

26. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter

27. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males?

28. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males? Committees  7C5

29. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males? Committees  7C5 By restricting it to only males, there is only 7 people to choose from

30. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males? Committees  7C5 By restricting it to only males, there is  21 only 7 people to choose from

31. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males? Committees  7C5 By restricting it to only males, there is  21 only 7 people to choose from c) the committee contains at least one woman?

32. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males? Committees  7C5 By restricting it to only males, there is  21 only 7 people to choose from c) the committee contains at least one woman? Committees  462  21

33. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males? Committees  7C5 By restricting it to only males, there is  21 only 7 people to choose from c) the committee contains at least one woman? Committees  462  21 easier to work out male only and subtract from total number of committees

34. (ii) Committees of five people are to be obtained from a group of seven men and four women. How many committees are possible if; a) there are no restrictions? Committees 11C5 With no restrictions, choose 5 people  462 from 11, gender does not matter b) the committee contains only males? Committees  7C5 By restricting it to only males, there is  21 only 7 people to choose from c) the committee contains at least one woman? Committees  462  21 easier to work out male only and subtract  441 from total number of committees

35. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands?

36. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5

37. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960

38. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”?

39. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”? choose which number has " three of a kind" Hands 13C1

40. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”? choose which number has choose three of " three of a kind" those cards Hands 13C14 C3

41. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”? choose which number has choose three of " three of a kind" those cards choose remaining Hands 13C14 C3 48 C2 two cards from the rest

42. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”? choose which number has choose three of " three of a kind" those cards choose remaining Hands 13C14 C3 48 C2 two cards from the rest  58656

43. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”? choose which number has choose three of " three of a kind" those cards choose remaining Hands 13C14 C3 48 C2 two cards from the rest  58656 58656 Pthree of a kind   2598960

44. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”? choose which number has choose three of " three of a kind" those cards choose remaining Hands 13C14 C3 48 C2 two cards from the rest  58656 58656 Pthree of a kind   2598960 94  2915

45. (iii) A hand of five cards is dealt from a regular pack of fifty two cards. a) What is the number of possible hands? Hands  52C5  2598960 b) What is the probability of getting “three of a kind”? choose which number has choose three of " three of a kind" those cards choose remaining Hands 13C14 C3 48 C2 two cards from the rest  58656 58656 Pthree of a kind   2598960 94  (=3.2%) 2915

46. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen?

47. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4

48. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people from 16, gender does not matter

49. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter

50. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter (ii) What is the probability that the team will consist of four women?

51. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter (ii) What is the probability that the team will consist of four women? Teams  9C4

52. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter (ii) What is the probability that the team will consist of four women? Teams  9C4 By restricting it to only women, there is only 9 people to choose from

53. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter (ii) What is the probability that the team will consist of four women? Teams  9C4 By restricting it to only women, there is  126 only 9 people to choose from

54. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter (ii) What is the probability that the team will consist of four women? Teams  9C4 By restricting it to only women, there is  126 only 9 people to choose from 126 P4 women team   1820

55. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter (ii) What is the probability that the team will consist of four women? Teams  9C4 By restricting it to only women, there is  126 only 9 people to choose from 126 P4 women team   1820 9  130

56. 2004 Extension 1 HSC Q2e) A four person team is to be chosen at random from nine women and seven men. (i) In how many ways can this team be chosen? Teams 16C4 With no restrictions, choose 4 people  1820 from 16, gender does not matter (ii) What is the probability that the team will consist of four women? Teams  9C4 By restricting it to only women, there is  126 only 9 people to choose from 126 P4 women team   1820 Exercise 10G; odd 9 (not 19, 27)  130

12X1 T09 05 combinations

Nigel Simmons

12X1 T09 05 combinations