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CHAPTER 6 DAY 4. Warm – Up  The table below shows the distribution of races in a particular city in the United States.  Let A = person is Hispanic and.

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Presentation on theme: "CHAPTER 6 DAY 4. Warm – Up  The table below shows the distribution of races in a particular city in the United States.  Let A = person is Hispanic and."— Presentation transcript:

1 CHAPTER 6 DAY 4

2 Warm – Up  The table below shows the distribution of races in a particular city in the United States.  Let A = person is Hispanic and Let B = person is White  Does the table represent the entire population?  Find P(A)  Find P(B c )  Find the probability the person is non-hispanic white. RaceHispanicNot Hispanic Asian0.0000.036 Black0.0030.121 White0.0600.691 Other0.0620.027

3 Homework #14-22 14..5404 15..6676 16..02 17.A. yesB. no, sum ≠ 1C. yes 18.A..295B..348C..1211 19. A. yesB..43C..96 D..28E..72 20.A. 1/38B. 9/19C. 6/19 21.Row 1 22. First child = ¼Both = 1/16 Neither = 9/16

4  The union of any collection of events is the event that at least one of the collection occurs.  Notation for the union of A and B is A U B  The set A and B is also called the intersection of A and B, which is the set of all elements in both sets A and B. Notation for the intersection of sets A and B is A B  General Addition Rule for the Unions of Two Events  For any two events A and B, P(A or B) = P(A) + P(B) – P(A and B) P(A U B) = P(A) + P(B) – P(A B)

5 Venn Diagram to Show!

6 Example  Zack has applied to both Princeton and Stanford. He thinks that the probability that Princeton will admit him is 0.4, the probability that Stanford will admit him is 0.5, and the probability that both will admit him is 0.2.  Make a Venn Diagram marked with the given probabilities.  What is the probability that either Princeton or Stanford admits Zack? Use proper notation!  What is the probability that neither university admits Zack?  What is the probability that he gets into Stanford but not Princeton?

7 Independence is NOT Disjoint!  If two sets are independent their “picture” is intersecting.

8 Independence is NOT Disjoint!  If a picture of two sets is intersecting the two sets may or may not be independent!  If two sets are independent the following equation MUST be TRUE:

9 Recall the warm-up…  The table below shows the distribution of races in a particular city in the United States.  Let A = person is Hispanic and Let B = person is White  Are the events A and B independent? Why or why not? RaceHispanicNot Hispanic Asian0.0000.036 Black0.0030.121 White0.0600.691 Other0.0620.027

10 Cautions…  Be sure to apply the correct addition rule. Use the general addition rule.  The multiplication rule applies only to independent events; you cannot use it if events are not independent.  Disjoint events are NEVER Independent


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