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Sullivan Algebra and Trigonometry: Section 14.3 Objectives of this Section Construct Probability Models Compute Probabilities of Equally Likely Outcomes.

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Presentation on theme: "Sullivan Algebra and Trigonometry: Section 14.3 Objectives of this Section Construct Probability Models Compute Probabilities of Equally Likely Outcomes."— Presentation transcript:

1 Sullivan Algebra and Trigonometry: Section 14.3 Objectives of this Section Construct Probability Models Compute Probabilities of Equally Likely Outcomes Utilize the Addition Rule to Find Probabilities Compute Probabilities Using Permutations and Combinations

2 An event is an outcome from an experiment. The probability of an event is a measure of the likelihood of its occurrence. A probability model lists the different outcomes from an experiment and their corresponding probabilities.

3 Determine the sample space resulting from the experiment of rolling a die. To construct probability models, we need to know the sample space of the experiment. This is the set S that lists all the possible outcomes of the experiment. S = {1, 2, 3, 4, 5, 6}

4 The probability of each outcome in the sample space S = {e 1, e 2, …, e n } has two properties: The probability assigned to each outcome is non-negative and at most 1. The sum of all probabilities equals 1.

5 Probability for Equally Likely Outcomes If an experiment has n equally likely outcomes, and if the number of ways an event E can occur is m, then the probability of E is

6 A classroom contains 20 students: 7 Freshman, 5 Sophomores, 6 Juniors, and 2 Seniors. A student is selected at random. Construct a probability model for this experiment.

7 Theorem Additive Rule

8 What is the probability of selecting an Ace or King from a standard deck of cards?

9 Probabilities of Complementary Events If E represents any event and represents the complement of E, then Suppose the probability that a hurricane hits a county in a given year is 0.02. Find the probability that a hurricane doesn’t hit the county. Since there are only two possible events in the sample space, hurricane or no hurricane, these events are complementary. Prob(No H) = 1 - Prob(H) = 1 - 0.02 = 0.98

10 Suppose you managed a little league team. You have 8 pitchers, 10 fielders, and 5 other players on the bench. If you choose three players at random, what is the probability that they are all pitchers? Prob(3 Pitchers) = # of ways to choose 3 pitchers # of ways to choose 3 players

11 Prob(3 Pitchers) = # of ways to choose 3 pitchers # of ways to choose 3 players

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