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1. Probability of an Outcome 2. Experimental Probability 3. Fundamental Properties of Probabilities 4. Addition Principle 5. Inclusion-Exclusion Principle 6. Odds 1

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2 Let a sample space S consist of a finite number of outcomes s 1, s 2, …, sN. To each outcome we associate a number, called the probability of the outcome, which represents the relative likelihood that the outcome will occur. A chart showing the outcomes and the assigned probability is called the probability distribution for the experiment.

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Toss an unbiased coin and observe the side that faces upward. Determine the probability distribution for this experiment. Since the coin is unbiased, each outcome is equally likely to occur. OutcomeProbability Heads½ Tails½ 3

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4 Let a sample space S consist of a finite number of outcomes s 1, s 2, …, sN. The relative frequency, or experimental probability, of each outcome is calculated after many trials. The experimental probability could be different for a different set of trials and different from the probability of the events.

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5 Traffic engineers measure the volume of traffic on a major highway during the rush hour. Generate a probability distribution using the data generated over 300 consecutive weekdays.

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6 We will use the experimental probability for the distribution.

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7 Let an experiment have outcomes s 1, s 2, …, sN with probabilities p 1, p 2, …, pN. Then the numbers p 1, p 2, …, pN must satisfy: Fundamental Property 1 Each of the numbers p 1, p 2, …, pN is between 0 and 1; Fundamental Property 2 p 1 + p 2 + … + pN = 1.

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8 Verify the fundamental properties for the following distribution. All probabilities are between 0 and 1 Total: 1.00

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9 Addition PrincipleSuppose that an event E consists of the finite number of outcomes s, t, u, …,z. That is E = { s, t, u, …,z }. Then Pr( E ) = Pr( s ) + Pr( t ) + Pr( u ) + … + Pr( z ), where Pr( E ) is the probability of event E.

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10 Suppose that we toss a red die and a green die and observe the numbers on the sides that face upward. a) Calculate the probabilities of the elementary events. b) Calculate the probability that the two dice show the same number.

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11 a)As shown previously, the sample space consists of 36 pairs of numbers S = {(1,1), (1,2), …, (6,5), (6,6)}. Each of these pairs is equally likely to occur. The probability of each pair is b) E = {(1,1), (2,2), (3,3), (4,4), (5,5), (6,6)}

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12 Let E and F be any events. Then If E and F are mutually exclusive, then

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13 A factory needs two raw materials. The probability of not having an adequate supply of material A is.05 and the probability of not having an adequate supply of material B is.03. A study determines that the probability of a shortage of both materials is.01. What proportion of the time will the factory not be able to operate from lack of materials?

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14 The factory will not operate 7% of the time.

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15 If the odds in favor of an event E are a to b, then On average, for every a + b trials, E will occur a times and E will not occur b times.

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16 In the two dice problem, what are the odds of rolling a pair with the same number on the faces? The probability of obtaining a pair with the same number on the faces is 1/6. The probability of not obtaining a pair with the same number on the faces is 5/6. The odds are

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A probability distribution for a finite sample space associates a probability with each outcome of the sample space. Each probability is a number between 0 and 1, and the sum of the probabilities is 1. The probability of an event is the sum of the probabilities of outcomes in the event. 17

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The inclusion-exclusion principle states that the probability of the union of two events is the sum of the probabilities of the events minus the probability of their intersection. If the two events are mutually exclusive, the probability of the union is just the sum of the probabilities of the events. 18

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We say that the odds in favor of an event are a to b if the probability of the event is a/ ( a + b ). Intuitively, the event is expected to occur a times for every b times it does not occur. 19

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