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1 C.M. Pascual S TATISTICS Chapter 5b Probability Addition Rule.

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Presentation on theme: "1 C.M. Pascual S TATISTICS Chapter 5b Probability Addition Rule."— Presentation transcript:

1 1 C.M. Pascual S TATISTICS Chapter 5b Probability Addition Rule

2 2 C.M. Pascual  Compound Event Any event combining 2 or more simple events Definition

3 3 C.M. Pascual  Compound Event Any event combining 2 or more simple events  Notation P(A or B) = P (event A occurs or event B occurs or they both occur) Definition

4 4 C.M. Pascual General Rule When finding the probability that event A occurs or event B occurs, find the total number of ways A can occur and the number of ways B can occur, but find the total in such a way that no outcome is counted more than once. Compound Event

5 5 C.M. Pascual Formal Addition Rule P(A or B) = P(A) + P(B) - P(A and B) where P(A and B) denotes the probability that A and B both occur at the same time. Compound Event

6 6 C.M. Pascual Formal Addition Rule P(A or B) = P(A) + P(B) - P(A and B) where P(A and B) denotes the probability that A and B both occur at the same time. Intuitive Addition Rule To find P(A or B), find the sum of the number of ways event A can occur and the number of ways event B can occur, adding in such a way that every outcome is counted only once. P(A or B) is equal to that sum, divided by the total number of outcomes. Compound Event

7 7 C.M. Pascual Definition Events A and B are mutually exclusive if they cannot occur simultaneously.

8 8 C.M. Pascual Definition Events A and B are mutually exclusive if they cannot occur simultaneously. Figures 3-5 Total Area = 1 P(A) P(B) P(A and B) Overlapping Events

9 9 C.M. Pascual Definition Events A and B are mutually exclusive if they cannot occur simultaneously. Figures 3-5 and 3-6 Total Area = 1 P(A) P(B) P(A and B) Non-overlapping Events Overlapping Events

10 10 C.M. Pascual Figure 5-7 Applying the Addition Rule P(A or B) Addition Rule Are A and B mutually exclusive ? P(A or B) = P(A)+ P(B) - P(A and B) P(A or B) = P(A) + P(B) Yes No

11 11 C.M. Pascual Find the probability of randomly selecting a man or a boy. Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table

12 12 C.M. Pascual Find the probability of randomly selecting a man or a boy. Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table

13 13 C.M. Pascual Find the probability of randomly selecting a man or a boy. P(man or boy) = 1692 + 64 = 1756 = 0.790 2223 2223 2223 Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table

14 14 C.M. Pascual Find the probability of randomly selecting a man or a boy. P(man or boy) = 1692 + 64 = 1756 = 0.790 2223 2223 2223 Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table * Mutually Exclusive *

15 15 C.M. Pascual Find the probability of randomly selecting a man or someone who survived. Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table

16 16 C.M. Pascual Find the probability of randomly selecting a man or someone who survived. Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table

17 17 C.M. Pascual Find the probability of randomly selecting a man or someone who survived. P(man or survivor) = 1692 + 706 - 332 = 1756 2223 2223 2223 2223 Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table = 0.929

18 18 C.M. Pascual Find the probability of randomly selecting a man or someone who survived. P(man or survivor) = 1692 + 706 - 332 = 1756 2223 2223 2223 2223 Men Women Boys Girls Totals Survived 332 31829 27 706 Died 1360 10435 18 1517 Total 1692 422 64 56 2223 Contingency Table * NOT Mutually Exclusive * = 0.929

19 19 C.M. Pascual Complementary Events

20 20 C.M. Pascual Complementary Events P(A) and P(A) are mutually exclusive

21 21 C.M. Pascual Complementary Events P(A) and P(A) are mutually exclusive All simple events are either in A or A.

22 22 C.M. Pascual Complementary Events P(A) and P(A) are mutually exclusive All simple events are either in A or A. P(A) + P(A) = 1

23 23 C.M. Pascual Rules of Complementary Events P(A) + P(A) = 1

24 24 C.M. Pascual P(A) Rules of Complementary Events P(A) + P(A) = 1 = 1 - P(A)

25 25 C.M. Pascual P(A) + P(A) = 1 = 1 - P(A) P(A) = 1 - P(A) P(A) Rules of Complementary Events

26 26 C.M. Pascual Figure 5-8 Venn Diagram for the Complement of Event A Total Area = 1 P (A) P (A) = 1 - P (A)

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