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Section 7.4. How Do We Choose the Sample Size for a Study?. How are the Sample Sizes Determined in Polls?. It depends on how much precision is needed as measured by the margin of error The smaller the margin of error, the larger the sample size must be.
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Section 7.4 How Do We Choose the Sample Size for a Study?
How are the Sample Sizes Determined in Polls? • It depends on how much precision is needed as measured by the margin of error • The smaller the margin of error, the larger the sample size must be
Choosing the Sample Size for Estimating a Population Proportion? • First, we must decide on the desired margin of error • Second, we must choose the confidence level for achieving that margin of error • In practice, 95% confidence intervals are most common
Example: What Sample Size Do You Need For An Exit Poll? • A television network plans to predict the outcome of an election between two candidates – Levin and Sanchez • They will do this with an exit poll that randomly samples votes on election day
Example: What Sample Size Do You Need For An Exit Poll? • The final poll a week before election day estimated Levin to be well ahead, 58% to 42% • So the outcome is not expected to be close • The researchers decide to use a sample size for which the margin of error is 0.04
Example: What Sample Size Do You Need For An Exit Poll? • What is the sample size for which a 95% confidence interval for the population proportion has margin of error equal to 0.04?
Example: What Sample Size Do You Need For An Exit Poll? • The 95% confidence interval for a population proportion p is: • If the sample size is such that 1.96(se) = 0.04, then the margin of error will be 0.04
Example: What Sample Size Do You Need For An Exit Poll? • Find the value of the sample size n for which 0.04 = 1.96(se):
Example: What Sample Size Do You Need For An Exit Poll? • A random sample of size n = 585 should give a margin of error of about 0.04 for a 95% confidence interval for the population proportion
How Can We Select a Sample Size Without Guessing a Value for the Sample Proportion • In the formula for determining n, setting = 0.50 gives the largest value for n out of all the possible values to substitute for • Doing this is the “safe” approach that guarantees we’ll have enough data
Sample Size for Estimating a Population Parameter • The random sample size n for which a confidence interval for a population proportion p has margin of error m (such as m = 0.04) is
Sample Size for Estimating a Population Parameter • The z-score is based on the confidence level, such as z = 1.96 for 95% confidence • You either guess the value you’d get for the sample proportion based on other information or take the safe approach of setting = 0.50
Sample Size for Estimating a Population Mean • The random sample size n for which a 95% confidence interval for a population mean has margin of error approximately equal to m is • To use this formula, you guess the value you’ll get for the sample standard deviation, s
Sample Size for Estimating a Population Mean • In practice, since you don’t yet have the data, you don’t know the value of the sample standard deviation, s • You must substitute an educated guess for s • You can use the sample standard deviation from a similar study
Example: Finding n to Estimate Mean Education in South Africa • A social scientist plans a study of adult South Africans to investigate educational attainment in the black community • How large a sample size is needed so that a 95% confidence interval for the mean number of years of education has margin of error equal to 1 year?
Example: Finding n to Estimate Mean Education in South Africa • No prior information about the standard deviation of educational attainment is available • We might guess that the sample education values fall within a range of about 18 years
Example: Finding n to Estimate Mean Education in South Africa • If the data distribution is bell-shaped, the range from – 3 to + 3 will contain nearly all the distribution • The distance – 3 to + 3 equals 6s • Solving 18 = 6s for s yields s = 3 • So ‘3’ is a crude estimate of s
Example: Finding n to Estimate Mean Education in South Africa • The desired margin of error is m = 1 year • The required sample size is:
What Factors Affect the Choice of the Sample Size? • The first is the desired precision, as measured by the margin of error, m • The second is the confidence level
What Other Factors Affect the Choice of the Sample Size? • A third factor is the variability in the data • If subjects have little variation (that is, s is small), we need fewer data than if they have substantial variation • A fourth factor is financial • Cost is often a major constraint
What if You Have to Use a Small n? • The t- methods for a mean are valid for any n • However, you need to be extra cautious to look for extreme outliers or great departures from the normal population assumption
What if You Have to Use a Small n? • In the case of the confidence interval for a population proportion, the method works poorly for small samples
Constructing a Small-Sample Confidence Interval for a Proportion • Suppose a random sample does not have at least 15 successes and 15 failures • The confidence interval formula: • Is still valid if we use it after adding ‘2’ to the original number of successes and ‘2’ to the original number of failures • This results in adding ‘4’ to the sample size n
