Chapter Some Continuous Probability Distributions Copyright © 2010 Pearson Addison-Wesley All rights reserved Section 6.1 Continuous Uniform Distribution Copyright © 2010 Pearson Addison-Wesley All rights reserved Figure 6.1 The density function for a random variable on the interval [ 1,3] Copyright © 2010 Pearson Addison- 6-3 Theorem 6.1 Copyright © 2010 Pearson Addison- 6-4 Section 6.2 Normal Distribution Copyright © 2010 Pearson Addison-Wesley All rights reserved Figure 6.2 The normal curve Copyright © 2010 Pearson Addison- 6-6 Figure 6.3 Normal curves with µ1 < µ2 and = à2 Copyright â 2010 Pearson Addison- 6-7 Figure 6.4 Normal curves with µ1 = µ2 and σ1 < σ2 Copyright © 2010 Pearson Addison- 6-8 Figure 6.5 Normal curves with µ1 < µ2 and σ1 < µ2 Copyright © 2010 Pearson Addison- 6-9 Theorem 6.2 Copyright © 2010 Pearson Addison- - 10 Figure 6.28 Gamma distributions Copyright © 2010 Pearson Addison- - 41 Theorem 6.4 Copyright © 2010 Pearson Addison- - 42 Corollary 6.1 Copyright © 2010 Pearson Addison- - 43 Section 6.7 Chi-Squared Distributions Copyright © 2010 Pearson Addison-Wesley All rights reserved Theorem 6.5 Copyright © 2010 Pearson Addison- - 45 Section 6.8 Beta Distribution Copyright © 2010 Pearson Addison-Wesley All rights reserved Definition 6.3 Copyright © 2010 Pearson Addison- - 47 Theorem 6.6 Copyright © 2010 Pearson Addison- - 48 Section 6.9 Lognormal Distribution Copyright © 2010 Pearson Addison-Wesley All rights reserved Figure 6.29 Lognormal distributions Copyright © 2010 Pearson Addison- - 50 Theorem 6.7 Copyright © 2010 Pearson Addison- - 51 Section 6.10 Weibull Distribution (Optional) Copyright © 2010 Pearson Addison-Wesley All rights reserved Theorem 6.8 Copyright © 2010 Pearson Addison- - 53 Figure 6.30 Weibull distributions (α = 1) Copyright © 2010 Pearson Addison- - 54 Section 6.11 Potential Misconceptions and Hazards; Relationship to Material in Other Chapters Copyright © 2010 Pearson Addison-Wesley All rights reserved ...Section 6.1 Continuous Uniform Distribution Copyright © 2010 Pearson Addison-Wesley All rights reserved Figure 6.1 The density function for a random variable on the interval [ 1,3]... with µ1 < à2 and = à2 Copyright â 2010 Pearson Addison- 6-7 Figure 6.4 Normal curves with µ1 = µ2 and σ1 < σ2 Copyright © 2010 Pearson Addison- 6-8 Figure 6.5 Normal curves with µ1 < µ2 and σ1