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Expected Value Expected Value Simple Example ■ A biased die has the probability of landing on a 6 of 0.5. All other numbers have an equal probability of appearing. ■ The die rolled 150 times. How many 6’s would you expect to see? 0.5 x 150 = 75 ■ How many 2’s would you expect? P(2) = 0.1 Expected value = 0.1 x 150 = 15 Expected Value Example ■ Machines break down 0, 1, 2, 3, or 4 times per month. ■ Relative frequency of breakdowns , or a probability distribution: Random Variable x (Number of Breakdowns) 0 1 2 3 4 P(x) .10 .20 .30 .25 .15 1.00 ■ What is the expected number of breakdowns per month? Expected Value Example ■ The expected value of a random variable is calculated by finding the expected value of each individual event and adding them. Random Variable x (Number of Breakdowns) 0 1 2 3 4 P(x) .10 .20 .30 .25 .15 1.00 ■ Expected value of number of breakdowns per month: E(x) = (0)x(.10) + (1)x(.20) + (2)x(.30) + (3)x(.25) + (4)x(.15) = 0 + 0.20 + 0.60 + 0.75 + 0.60 = 2.15 breakdowns
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