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Sta220 - Statistics Mr. Smith Room 310 Class #15 Section 4.9 We are interested in making an inference about the mean 𝜇 of some population. Why? - Estimate the mean useful life of automobiles - Mean number of crimes per month in a large city - Mean yield per acre of new soybean hybrid Definition Copyright © 2013 Pearson Education, Inc.. All rights reserved. What about the shape of the sampling distribution? Two theorems provide this information. Theorem Copyright © 2013 Pearson Education, Inc.. All rights reserved. Theorem Copyright © 2013 Pearson Education, Inc.. All rights reserved. The Central Limit Theorem is so powerful because now we no longer need to know the distribution of the population. The Central Limit Theorem applies to all types of population distributions. Figure 4.39 Sampling distributions of x for different populations and different sample sizes Copyright © 2013 Pearson Education, Inc.. All rights reserved. Problem 4.29 Suppose we have selected a random sample of n = 36 observation from a population with mean equal to 80 and standard deviation equal to 6. It is known that the population is not extremely skewed. a) Sketch the relative frequency distributions for the population and for the sampling distribution of the sample mean 𝑥. b) Find the probability that 𝑥 will be larger than 82 Figure 4.40A population relative frequency distribution and the sampling distribution for x Copyright © 2013 Pearson Education, Inc.. All rights reserved. b. Figure 4.41 The sampling distribution for Copyright © 2013 Pearson Education, Inc.. All rights reserved. x Problem 4.30 A manufacturer of automobile batteries claims that the distribution of the lengths of life and its best battery has a mean of 54 months and a standard deviation of 6 months. Suppose a consumer group decides to check the claim by purchasing a sample of 50 of the batteries and subjecting them to tests that estimate the battery’s life. a) Assuming that the manufacturer’s claim is true, describe the sampling distribution of the mean lifetime of a sample of 50 batteries. b) Assuming that the manufacturer’s claim is true, what is the probability that the consumer group’s sample has a mean life of fewer 52 months? Figure 4.42 The sampling distribution of Example 6.8 for n = 50 Copyright © 2013 Pearson Education, Inc.. All rights reserved. x in Homework 4.8 and 4.9 due by Wednesday Quiz Chapter 4 and CH. 4 Homework Review due by Wednesday Test on Chapter 4 Thursday, Review will be passed out tomorrow. Chapter 5 will start Friday
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