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Slide 8-1 Chapter 8 Confidence Intervals for One Population Mean.

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Presentation on theme: "Slide 8-1 Chapter 8 Confidence Intervals for One Population Mean."— Presentation transcript:

1 Slide 8-1 Chapter 8 Confidence Intervals for One Population Mean

2 Slide 8-2 Section 8.1 Estimating a Population Mean

3 Slide 8-3 Definition 8.1 Point Estimate A point estimate of a parameter is the value of a statistic used to estimate the parameter.

4 Slide 8-4 Definition 8.2 Confidence-Interval Estimate Confidence interval (CI): An interval of numbers obtained from a point estimate of a parameter. Confidence level: The confidence we have that the parameter lies in the confidence interval (i.e., that the confidence interval contains the parameter). Confidence-interval estimate: The confidence level and confidence interval.

5 Slide 8-5 Twenty confidence intervals for the mean price of all new mobile homes, each based on a sample of 36 new mobile homes Figure 8.2

6 Slide 8-6 Section 8.2 Confidence Intervals for One Population Mean when Sigma Is Known

7 Slide 8-7 Figure 8.3 (a) 95.44% of all samples have means within 2 standard deviations of μ; (b) 100(1 − α)% of all samples have means within z α/2 standard deviations of μ

8 Slide 8-8 Procedure 8.1

9 Slide 8-9 Table 8.3 Ages, in years, of 50 randomly selected people in the civilian labor force

10 Slide 8-10 Figure 8.5 90% and 95% confidence intervals for μ, using the data in Table 8.3

11 Slide 8-11 Section 8.3 Margin of Error

12 Slide 8-12 Definition 8.3 & Figure 8.7 Figure 8.7 illustrates the margin of error.

13 Slide 8-13 Formula 8.1

14 Slide 8-14 Section 8.4 Confidence Intervals for One Population Mean When Sigma Is Unknown

15 Slide 8-15 Figure 8.8 Standard normal curve and two t-curves

16 Slide 8-16 Key Fact 8.6 Basic Properties of t-Curves Property 1: The total area under a t-curve equals 1. Property 2: A t-curve extends indefinitely in both directions, approaching, but never touching, the horizontal axis as it does so. Property 3: A t-curve is symmetric about 0. Property 4: As the number of degrees of freedom becomes larger, t-curves look increasingly like the standard normal curve.

17 Slide 8-17 Table 8.4 Values of

18 Slide 8-18 Procedure 8.2

19 Slide 8-19 Table 8.5 & Figure 8.10 Normal probability plot of the loss data in Table 8.5 Losses ($) for a sample of 25 pickpocket offenses

20 Slide 8-20 Figure 8.11 Normal probability plots for chicken consumption: (a) original data and (b) data with outlier removed

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