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Confidence Intervals. 10.2 page 625 a) There is a 95% probability (chance) that the interval from 107.8 to 116.2 contains µ. Incorrect. The probability is 1 or 0. We don’t know which!. 10.2 page 625 b) There is a 95% chance that the interval (107.8 ,116.2) contains x bar.
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Confidence Intervals 10.2 page 625 a) There is a 95% probability (chance) that the interval from 107.8 to 116.2 contains µ Incorrect. The probability is 1 or 0. We don’t know which!
10.2 page 625b) There is a 95% chance that the interval (107.8 ,116.2) contains x bar. • Incorrect. The general form of these confidence intervals is xbar + or – m (margin of error), so xbar is always in the center of the interval!
10.2 page 625c) This interval was constructed using a method that results in intervals which capture the true mean in 95% of all possible samples. • Incorrect. The different samples will yield different sample means, and the distribution of those sample means is used to provide an interval that captures the population mean.
10.2 page 625d) 95% of all possible samples will contain the interval (107.8, 116.2) • Incorrect. There is nothing magical about the interval from this one sample! Our method of computing confidence intervals is based on capturing the mean of the population, not a particular interval from one sample.
e)The probability of the interval (107.8, 116.2) captures µ is either 0 or 1, but we don’t know which! • YEAH! CORRECT INTERPRETATION!
