Sampling Distribution of the Mean
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Sampling Distribution of the Mean
It is not necessary to use the finite population correction factor even when the population is finite if the sample size is less than or equal to 5% of the population (n/N < .05)
Properties of the Standard Error
• The greater the dispersion in the variable the larger the standard error• The larger the sample size the smaller the standard error• The size of the standard error decreases at a decreasing rate as observations are addedAssume = 100:
n Standard error D500 4.51,000 3.2 -1.31,500 2.6 -0.62,000 2.2 -0.4
Shape of the Sampling Distribution of the Mean
If the variable has a normal distribution the sampling distribution will have a normal distribution
Shape of the Sampling Distribution of the Mean
If the variable does not have a normal distribution the Central Limit Theorem applies.
Central Limit TheoremIn selecting simple random samples of size n from a population, the sampling distribution of the sample mean can be approximated by a normal distribution as the sample size becomes large (typically n > 30).
Central Limit Theorem
http://onlinestatbook.com/stat_sim/sampling_dist/index.htmlSee page 273
Sampling Distribution of the Mean, Example
A beverage bottler must be confident that a 12-ounce bottle actually contains at least 12 ounces.
If a machine is set to fill the bottles with 12.1 ounces and the standard deviation is 0.6 ounces, what is the probability that a sample of 36 bottles would have a mean less than 12?
Sampling Distribution of the Mean, Example
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Sampling Distribution of the Mean, Example
Assume a firm has 500 employees. On average, the employees drink 3 cups of coffee per day. The standard deviation for coffee consumption is 2. If a sample of 100 workers is drawn, what is the probability that the average consumption for the sample will be above 3.4 cups?
Sampling Distribution of the Mean, Example
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Sampling Distribution of a Proportion
The sampling distribution of a proportion is really a binomial experiment.
For example, if we draw a sample of 500 people and ask what is the probability that more than 50% will support health care reform, that is equivalent to asking what is the probability of getting 250 or more “successes” from 500 trials.
Sampling Distribution of a Proportion
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Sampling Distribution of a Proportion
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Sampling Distribution of a Proportion
Again, we can use the normal distribution to approximate the binomial distribution if:
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Sample Proportion Example
The probability a machine will produce a bad part is 5%. Assume a sample of 100 parts is drawn. What is the probability the sample value will differ from the population value by more than 1%?
Sample Proportion ExampleStep 1: Find the standard error
Step 2: Find z scoresz1 = (.04 – .05)/0.022 = -0.45z2 = (.06 – .05)/0.022 = 0.45
Step 3: Find the corresponding value in the standard normal tableP(z < -.45 or z > .45) = .3264 + .3264 = .6528
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Sample Proportion Example
Again, the probability a machine will produce a bad part is 5% and a sample of 100 parts is drawn. What is the probability the share of bad parts in the sample will exceed 7%?
Sample Proportion ExampleStep 1: Find the standard error
Step 2: Find the z scorez = (.07 – .05)/0.022 = 0.91
Step 3: Find corresponding value in standard normal tableP(z > .91) = .1814
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Properties of Point Estimators
• Unbiasedness• Efficiency• Consistency
Unbiased
When the expected value of the point estimator is equal to the value of the parameter.
For example: )(xE
Efficiency
An estimator is more efficient than another estimator if it has a smaller standard error.
The sample mean is more efficient than the sample median.http://onlinestatbook.com/stat_sim/sampling_dist/index.html
Consistency
As the sample size is increased the values of the point estimator become more tightly bunched around the parameter.
Other Random Sampling Methods
• Stratified random sampling• Cluster sampling• Systematic sampling
Stratified Random Sampling
The population is divided into groups (strata) and observations are randomly selected from each strata.
Cluster Sampling
The population is divided into groups (clusters), and then clusters are randomly selected. Observations are then randomly selected from the selected clusters.
Other Sampling Methods
• Convenience sampling – select the most convenient observations to sample• Judgment sampling – observations are chosen based on the researcher’s judgment of who is representative of the population
Graded Homework
P. 246, #31P. 279, #29P. 284, #39
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