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Understanding sample survey data Underlying Concept A sample statistic is our best estimate of a population parameter If we took 100 different samples from the same population to measure, for example, the mean height of men, we would get a 100 different estimates of mean height. The mean of these means would be very close to the real population mean. Population of men (Population Size = N) Sample of men from population (Sample size = n) We take a sample from the population and measure the heights of all our sample members. The mean height from this sample is 174.4 cm. Sample of men from population (Sample size = n) We take a another sample from the same population and measure the heights of all sample members. The mean height from this sample is 165.9 cm. Sample of sample means We take a another 100 samples from the same population and measure the heights of all sample members. Sample 1 mean was 174.4 cm Sample 2 mean was 165.9 cm Sample 3 mean was 171.0 cm Sample 4 mean was 175.2 cm Sample 5 mean was 162.8 cm Etc Etc Etc Sample of sample means We don’t ever take hundreds of samples. We just take 1. The concept of the mean of sample means is central to all survey statistics. The central limit theorem says that if we took a sufficiently large number of samples, the mean of the sample means would be normally distributed. This is true even if the thing we are measuring is not normally distributed. The central limit theorem can be proved mathematically. It is the basis of how we calculate our required sample size and how we calculate confidence intervals around our estimates………………. Variance, standard deviation and standard error Variance = the sum of squared differences from the mean divided by n-1 Sample values (n=5) Difference from mean Squared difference from the mean 172 171 - 172 = -1 -1 x -1 = 1 169 2 4 168 3 9 175 -4 16 171 0 0 Mean = 171 Sum = 0 Sum of squares = 30 Variance = 30 / 4 = 7.5 Standard deviation = the square root of the variance SD = √ variance = √7.5 = 2.74 Standard error = the square root of the variance divided by the sample size SE = √ (variance / n) = √ (7.5 / 5) = 1.22 Standard Error The standard error is our best estimate of the standard deviation of the sample means. In other words if we took 100 samples from the same population and got 100 estimates of men’s mean height, the standard deviation of that mean is the standard error. Confidence Intervals Because the means of sample means are normally distributed, we can use the characteristics of the normal distribution to look at our mean and standard error. We know that in a normal distribution 68.3% of values fall within one standard deviation of the mean and 95% fall within 1.96 standard deviations of the mean. So 1.96 times the standard error gives us the 95% confidence limits. Our standard error is 1.22. 1.96 x 1.22 = 2.4 Our sample mean is 171.0 171.0 – 2.4 = 168.6 171.0 + 2.4 = 173.4 So.. If we took 100 samples, 95 of them would have a mean somewhere between 168.6 and 173.4. Or… we can be 95% confident that the true mean (the population mean) lies between 168.6 and 173.4. It works the same for proportions The 95% confidence interval around a proportion is 1.96 times the standard error of the estimate. The standard error of a proportion is √ ( (p (100-p)) / n ) Where p is the percentage and n is the sample size. So if we estimate that 75% of people prefer dogs from a sample of 45, p=75 and n= 45. = √ (( 75 x (100-75)) / 45 ) = √ ( (75 x 25) / 45 ) = √ ( 1875 / 45 ) =√ 42.7 = 6.5 75 – 6.5 = 68.5 and 75 + 6.5 = 81.5 So.. if we took 100 samples, 95 of them would have a percentage somewhere between 68.5 and 81.5. Or… we can be 95% confident that the true percentage of people who prefer dogs (the population percentage) lies between 68.5 and 81.5. Sample Size • We can use our understanding of confidence intervals to decide how big we need our sample to be • First we think through – what inferences about the population we are going to be making – what level of uncertainty we can live with For example • We decide to conduct a survey to find out how many people in Scotland believe in the Loch Ness monster • We define the population and source an appropriate sampling frame from which we will take a simple random sample • We decide we want to be 95% confident that our estimate will be accurate to 3 percentage points • The confidence intervals for proportions are widest for a 50% estimate • We have no good reason to expect the proportion of people believing in the Loch Ness monster will be much more or less than 50% so we will use that as our basis • Excel spreadsheet example Design effects • If the sample is not a simple random sample then an adjustment will need to be made to the standard error • Proportionate stratification will decrease the standard error • Disproportionate stratification will increase the standard error • Clustering will increase the standard error • See PEAS website for information about design effects http://www2.napier.ac.uk/depts/fhls/peas/index.htm Finite Population Correction If the sample size is a large proportion of the population size (>5%) then applying the finite population correction will reduce the standard error Weighting and Grossing Factors • How many people in the population the sample respondent represents • Weights are used to alter proportions (e.g. to adjust for unequal selection probabilities or non-response) • Grossing factors gross up to the total population number • Often combined For example Achieved sample Known population Weighting factor Men 150 (36%) 4,500 (45%) 45 / 36 = 1.25 4,500 / 150 = 30 Women 270 (64%) 5,400 (55%) 55 / 64 = 0.86 5,400 / 270 = 20 420 9,900 Total Grossing factor 9,900 / 420 = 23.6 Weighting & grossing factor