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Political Science 30: Political Inquiry

Political Science 30: Political Inquiry . The Magic of the Normal Curve. Normal Curves ( Essentials , pp. 127-130) The family of normal curves The rule of 68-95-99.7 The Central Limit Theorem ( Essentials , p. 127) Confidence Intervals ( Essentials , pp. 130-134) Around a Mean

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Political Science 30: Political Inquiry

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  1. Political Science 30:Political Inquiry

  2. The Magic of the Normal Curve • Normal Curves (Essentials, pp. 127-130) • The family of normal curves • The rule of 68-95-99.7 • The Central Limit Theorem (Essentials, p. 127) • Confidence Intervals (Essentials, pp. 130-134) • Around a Mean • Around a Proportion (Essentials, pp. 138-140)

  3. Normal Curves (or distributions) • Normal curves are a special family of density curves, which are graphs that answer the question: “what proportion of my cases take on values that fall within a certain range?” • Many things in nature, such as sizes of animals and errors in astronomic calculations, happen to be normally distributed.

  4. Normal Curves

  5. What do all normal curves have in common? Symmetric Mean = Median Bell-shaped, with most of their density in center and little in the tails How can we tell one normal curve from another? Mean tells you where it is centered Standard deviation tells you how thick or narrow the curve will be Normal Curves

  6. Normal Curves • The 68-95-99.7 Rule. • 68% of cases will take on a value that is plus or minus one standard deviation of the mean • 95% of cases will take on a value that is plus or minus two standard deviations • 99.7% of cases will take on a value that is plus or minus three standard deviations

  7. The Central Limit Theorem • If we take repeated samples from a population, the sample means will be (approximately) normally distributed. • The mean of the “sampling distribution” will equal the true population mean. • The “standard error” (the standard deviation of the sampling distribution) equals

  8. The Central Limit Theorem • A “sampling distribution” of a statistic tells us what values the statistic takes in repeated samples from the same population and how often it takes them.

  9. Confidence Intervals • We use the statistical properties of a distribution of many samples to see how confident we are that a sample statistic is close to the population parameter • We can compute a confidence interval around a sample mean or a proportion • We can pick how confident we want to be • Usually choose 95%, or two standard errors

  10. Confidence Intervals • The 95% confidence interval around a sample mean is:

  11. Confidence Intervals • If my sample of 100 donors finds a mean contribution level of $15,600 and I compute a confidence interval that is: $15,600 + or - $600 • I can make the statement: I can say at the 95% confidence level that the mean contribution for all donors is between $15,000 and $16,200.

  12. Confidence Intervals • The 95% confidence interval around a sample proportion is: And the 99.7% confidence interval would be:

  13. What Determines the “Margin of Error” of a Poll? • The margin of error is calculated by:

  14. What Determines the “Margin of Error” of a Poll? • In a poll of 505 likely voters, the Field Poll found 55% support for a constitutional convention.

  15. What Determines the “Margin of Error” of a Poll? • The margin of error for this poll was plus or minus 4.4 percentage points. • This means that if we took many samples using the Field Poll’s methods, 95% of the samples would yield a statistic within plus or minus 4.4 percentage points of the true population parameter.

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