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Name: ______________________ Chapter 6: Probability and Simulation: The Study of Randomness Section 6.1 & 6.2 6.2 6.3 Topics Page # Assignment Simulation Trials Independent Intro Probability Random Probability model Sample space Event Tree diagram Multiplication principle Sampling with or without replacement 397-398 1, 3, 5 402-404 7, 9, 11, 13 416-417 29, 32, 33, 36 Probability rules Union Intersection Empty Venn diagram Probability of a finite sample space Multiplication rule for independent events Disjoint vs. independent 423-425 37, 38, 40, 44 430-435 45-47, 49, 50, 61, 62, 64 440-441 65-70 446-447 74, 78 453-455 86, 87, 93, 94 Rules of Probability Joint Joint event Addition Rule: joint Complement Multiplication rule: joint Conditional probability Intersection Tree diagram Independence test Ch 6 Review 411 WS 23, 24 Probability Worksheet Practice Exam Chapter 6: Probability Key Vocabulary: trial random probability independence random phenomenon sample space S = {H, T} tree diagram 6.1 replacement event P(A) Complement AC disjoint Venn Diagram union (or) intersection (and) Simulation 1. In statistics, what is meant by the term simulation? 2. What are the steps to perform a simulation? 3. How do you use RandInt on the calculator? 4. In statistics, what is meant by an independent trial? joint event joint probability conditional probability 6.2 Probability Models 1. In statistics, what is a sample space? 2. In statistics, what is an event? 3. Explain why the probability of any event is a number between 0 and 1. 4. What is the sum of the probabilities of all possible outcomes? 5. What is meant by the complement of an event? 6. When are two events considered disjoint? 7. Explain the difference between disjoint and independent. 8. What is the Multiplication Rule for independent events? 9. Draw a Venn diagram that shows the union of two events. Then draw one that shows the intersection. 6.3 General Probability Rules 1. State the addition rule for joint events. 2. What is meant by joint probability? 3. What is meant by conditional probability? 4. State the general multiplication rule. 5. How is the general multiplication rule different than the multiplication rule for independent events? 6. State the formula for finding conditional probability. 7. State the formula used to determine if two events are independent. 8. Explain how to use a tree diagram to find the probability of something.