# For a sample size of n = 16 (the third graph), how does the SHAPE of distributio

For a sample size of n = 16 (the third graph), how does the SHAPE of distribution of 500 sample means compare to the shape of the population? The second set of questions is concerned with the CENTER of the distribution of sample means. For a sample of size n = 2 (the first graph), how does the MEAN of the sample means (Mean of x ) compare to the MEAN of the population (the value of From the Sampling Distribution Scrapbook)? Joe Normal Dist. For a sample of size n = 9 (the second graph), how does the MEAN of the sample means (Mean of x ) compare to the MEAN of the population (the value of From the Sampling Distribution Scrapbook)? For a sample of size n = 16 (the third graph), how does the MEAN of the sample means (Mean of x ) compare to the MEAN of the population (the value of From the Sampling Distribution Scrapbook)? Sampling Distributions Activity Part 1 The third set of questions is concerned with the VARIABILITY or spread of the distribution of sample means. For a sampl