Normal Curves and Sampling Distributions. The Central Limit Theorem. Focus Points 10/11/2011. Section 6.5
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1 Normal Curves and Sampling Distributions 6 Copyright Cengage Learning. All rights reserved. Section 6.5 The Central Limit Theorem Copyright Cengage Learning. All rights reserved. Focus Points For a normal distribution, use µ and σ to construct the theoretical sampling distribution for the statistic For large samples use sample estimates to construct a good approximate sampling distribution for the statistic Learn the statement and underlying meaning of the central limit theorem well enough to explain it to a friend who is intelligent, but (unfortunately) doesn t know much about statistics. 3 1
2 The Distribution, Given x is normal 4 The x Distribution, Given x is normal. In Section 6.4, we began a study of the distribution of x values, where x was the (sample) mean length of five trout caught by children at the Pinedale children s fishing pond. Let s consider this example again in the light of a very important theorem of mathematical statistics. 5 Example 12(a) Probability regarding x and x Suppose a team of biologists has been studying the Pinedale children s fishing pond. Let x represent the length of a single trout taken at random from the pond. This group of biologists has determined that x has a normal distribution with mean µ = 10.2 inches and standard deviation σ = 1.4 inches. What is the probability that a single trout taken at random from the pond is between 8 and 12 inches long? 6 2
3 Example 12(a) Solution We use the methods of Section 6.3, with µ = 10.2 and σ = 1.4,to get 7 Example 12(a) Solution Therefore, Therefore, the probability is about that a single trout taken at random is between 8 and 12 inches long. 8 Example 12(b) Probability regarding x and x What is the probability that the mean x length of five trout taken at random is between 8 and 12 inches? Solution: If we let represent the mean of the distribution, then Theorem 6.1, part (b), tells us that If represents the standard deviation of the distribution, then Theorem 6.1, part (c), tells us that 9 3
4 Example 12 Solution To create a standard z variable from, we subtract and divide by : To standardize the interval 8 < < 12, we use 8 and then 12 in place of in the preceding formula for z. 8 < < < z < Example 12 Solution Theorem 6.1, part (a), tells us that distribution. Therefore, has a normal P(8 < < 12) = P( 3.49 < z < 2.86) = = The probability is about that the mean length based on a sample size of 5 is between 8 and 12 inches. 11 Example 12(c) Probability regarding x and x Looking at the results of parts (a) and (b), we see that the probabilities ( and ) are quite different. Why is this the case? Solution: According to Theorem 6.1, both x and have a normal distribution, and both have the same mean of 10.2 inches. The difference is in the standard deviations for x and. The standard deviation of the x distribution is σ =
5 Example 12 Solution The standard deviation of the distribution is The standard deviation of the distribution is less than half the standard deviation of the x distribution. 13 Example 12 Solution Figure 6-33 shows the distributions of x and. (a) The x distribution with µ = 10.2 and σ = 1.4 (b) The x distribution with = 10.2 and = 0.63 for samples of size n = 5 14 The x Distribution, Given x is normal. Looking at Figure 6-33(a) and (b), we see that both curves use the same scale on the horizontal axis. The means are the same, and the shaded area is above the interval from 8 to 12 on each graph. It becomes clear that the smaller standard deviation of the distribution has the effect of gathering together much more of the total probability into the region over its mean. Therefore, the region from 8 to 12 has a much higher probability for the distribution. 15 5
6 The x Distribution, Given x Follows any Distribution 16 The x Distribution, Given x Follows any Distribution 17 Example 13 Central Limit Theorem A certain strain of bacteria occurs in all raw milk. Let x be milliliter of milk. The health department has found that if the milk is not contaminated, then x has a distribution that is more or less mound-shaped and symmetrical. The mean of the x distribution is µ = 2500, and the standard deviation is σ = 300.In a large commercial dairy, the health inspector takes 42 random samples of the milk produced each day. At the end of the day, the bacteria count in each of the 42 samples is averaged to obtain the sample mean bacteria count. 18 6
7 Example 13(a) Central Limit Theorem Assuming the milk is not contaminated, what is the distribution of? Solution: The sample size is n = 42.Since this value exceeds 30, the central limit theorem applies, and we know that will be approximately normal, with mean and standard deviation 19 Example 13(b) Central Limit Theorem Assuming the milk is not contaminated, what is the probability that the average bacteria count for one day is between 2350 and 2650 bacteria per milliliter? Solution: We convert the interval to a corresponding interval on the standard z axis. 20 Example 13(b) Solution Therefore, P( ) = P( 3.24 z 3.24) = = The probability is that is between 2350 and
8 Example 13(c) Central Limit Theorem Interpretation At the end of each day, the inspector must decide to accept or reject the accumulated milk that has been held in cold storage awaiting shipment. Suppose the 42 samples taken by the inspector have a mean bacteria count that is not between 2350 and If you were the inspector, what would be your comment on this situation? 22 Example 13(c) Solution The probability that is between 2350 and 2650 for milk that is not contaminated is very high. If the inspector finds that the average bacteria count for the 42 samples is not between 2350 and 2650, then it is reasonable to conclude that there is something wrong with the milk. If is less than 2350, you might suspect someone added chemicals to the milk to artificially reduce the bacteria count. If is above 2650, you might suspect some other kind of biologic contamination. 23 The x Distribution, Given x Follows any Distribution Procedure: 24 8
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