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Introduction to Basic Statistical Methodology CHAPTER 1 ~ Introduction ~ What is “random variation” in the distribution of a population? Examples: Toasting time, Temperature settings, etc.… POPULATION 1: Little to no variation (e.g., product manufacturing) In engineering situations such as this, we try to maintain “quality control”… i.e., “tight tolerance levels,” high precision, low variability. But what about a population of, say, people? 3 What is “random variation” in the distribution of a population? Examples: Body Temperature (F) POPULATION 1: Little to no variation (e.g., clones) Most individual values ≈ population mean value Density Very little variation about the mean! 98.6 F 4 What is “random variation” in the distribution of a population? Examples: Gender, Race, Age,(Height, Drug Response (e.g., cholesterol level),… Body Temperature F) POPULATION 2: Much variation (more realistic) Density Much more variation about the mean! 5 What are “statistics,” and how can they be applied to real issues? • Example: Suppose a certain company insists that it complies with “gender equality” regulations among its employee population, i.e., approx. 50% male and 50% female. To test this claim, let us select a random sample of n = 100 employees, and count X = the number of males. (If the claim is true, then we expect X 50.) etc. X = 64 males (+ 36 females) Questions: If the claim is true, how likely is this experimental result? (“p-value”) Could the difference (14 males) be due to random chance variation, or is it statistically significant? GLOBAL OPERATION DYNAMICS, INC. 6 The experiment in this problem can be modeled by a random sequence of n = 100 ...... independent coin tosses (Heads = Male, Tails = Female). It can be mathematically proved that, if the coin is “fair” (“unbiased”), then in 100 tosses: • • • • • • • • • • • • • • • probability of obtaining at…..from least 0 Heads away from 50 is = 1.0000 “certainty” 0 to 100 Heads….. probability of obtaining at least 1 Head away from 50 is = 0.9204 probability of obtaining at least 2 Heads away from 50 is = 0.7644 probability of obtaining at least 3 Heads away from 50 is = 0.6173 probability of obtaining at least 4 Heads away from 50 is = 0.4841 The = .05 probability of obtaining at least 5 Heads away from 50 is = 0.3682 cutoff is probability of obtaining at least 6 Heads away from 50 is = 0.2713 called the probability of obtaining at least 7 Heads away from 50 is = 0.1933 significance probability of obtaining at least 8 Heads away from 50 is = 0.1332 level. probability of obtaining at least 9 Heads away from 50 is = 0.0886 probability of obtaining at least 10 Heads away from 50 is = 0.0569 probability of obtaining at least 11 Heads away from 50 is = 0.0352 probability of obtaining at least 12 Heads away from 50 is = 0.0210 probability of obtaining at least 13 Heads away from 50 is = 0.0120 0.0066 is called probability of obtaining at least 14 Heads away from 50 is = 0.0066 the p-value of etc. 0 the sample. Because our p-value (.0066) is less than the significance level (.05), our data suggest that the coin is indeed biased, in favor of Heads. Likewise, our evidence suggests that employee gender in this company is biased, in favor of Males. 7 What are “statistics,” and how can they be applied to real issues? • Example: Suppose a certain company insists that it complies with “gender equality” regulations among its employee population, i.e., approx. 50% male and 50% female. HYPOTHESIS EXPERIMENT To test this claim, let us select a random sample of n = 100 employees, and count X = the number of males. (If the claim is true, then we expect X 50.) etc. OBSERVATIONS X = 64 males (+ 36 females) Questions: If the claim is true, how likely is this experimental result? (“p-value”) Could the difference (14 males) be due to random chance variation, or is it statistically significant? GLOBAL OPERATION DYNAMICS, INC. 8 The experiment in this problem can be modeled by a random sequence of n = 100 ...... independent coin tosses (Heads = Male, Tails = Female). It can be mathematically proved that, if the coin is “fair” (“unbiased”), then in 100 tosses: • • • • • • • • • • • • • • • probability of obtaining at least 0 Heads away from 50 is = 1.0000 “certainty” probability of obtaining at least 1 Head away from 50 is = 0.9204 probability of obtaining at least 2 Heads away from 50 is = 0.7644 probability of obtaining at least 3 Heads away from 50 is = 0.6173 probability of obtaining at least 4 Heads away from 50 is = 0.4841 The = .05 probability of obtaining at least 5 Heads away from 50 is = 0.3682 cutoff is probability of obtaining at least 6 Heads away from 50 is = 0.2713 called the probability of obtaining at least 7 Heads away from 50 is = 0.1933 significance probability of obtaining at least 8 Heads away from 50 is = 0.1332 level. probability of obtaining at least 9 Heads away from 50 is = 0.0886 probability of obtaining at least 10 Heads away from 50 is = 0.0569 probability of obtaining at least 11 Heads away from 50 is = 0.0352 ANALYSIS probability of obtaining at least 12 Heads away from 50 is = 0.0210 probability of obtaining at least 13 Heads away from 50 is = 0.0120 0.0066 is called probability of obtaining at least 14 Heads away from 50 is = 0.0066 the p-value of etc. 0 the sample. Because our p-value (.0066) is less than the significance level (.05), our data suggest that the coin is indeed biased, in favor of Heads. Likewise, our evidence suggests that employee gender in this company is biased, in favor of Males. CONCLUSION 9 “Classical Scientific Method” Hypothesis – Define the study population... What’s the question? Experiment – Designed to test hypothesis Observations – Collect sample measurements Analysis – Do the data formally tend to support or refute the hypothesis, and with what strength? (Lots of juicy formulas...) Conclusion – Reject or retain hypothesis; is the result statistically significant? Interpretation – Translate findings in context! Statistics is implemented in each step of the classical scientific method! 10