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xi | |
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xii | |
| Preface |
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xvi | |
| Overview of the Book |
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xvii | |
| What is New in this Edition? |
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xvii | |
| Formulae and Calculations |
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xvii | |
| Approaches to Power |
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xviii | |
| The pwrlppl Companion Package |
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xviii | |
| Acknowledgments |
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xx | |
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1 What is Power? Why is Power Important? |
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1 | (17) |
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Review of Null Hypothesis Significance Testing |
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1 | (1) |
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Effect Sizes and Their Interpretation |
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2 | (1) |
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3 | (3) |
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Central and Noncentral Distributions |
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6 | (2) |
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Misconceptions about Power |
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8 | (1) |
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Empirical Reviews of Power |
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9 | (1) |
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Consequences of Underpowered Studies |
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10 | (1) |
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Overview of Approaches to Determining Effect Size for Power Analysis |
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11 | (3) |
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Post Hoc Power (a.k.a. Observed or Achieved Power) |
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14 | (2) |
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16 | (1) |
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17 | (1) |
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2 Chi Square and Tests for Proportions |
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18 | (16) |
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18 | (1) |
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19 | (1) |
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19 | (1) |
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Example 2.1 2 × 2 Test of Independence |
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20 | (6) |
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Example 2.2 2 × 2 Chi Square Test for Independence Using R |
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26 | (1) |
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27 | (1) |
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Example 2.4 General Effect Size-Based Approaches Using R |
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27 | (1) |
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Tests for Single Samples and Independent Proportions |
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28 | (1) |
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Example 2.5 Single Sample Comparison |
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29 | (2) |
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Example 2.6 Independent Proportions Comparison |
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31 | (1) |
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32 | (1) |
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33 | (1) |
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3 Independent Samples and Paired f-tests |
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34 | (20) |
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34 | (1) |
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35 | (1) |
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36 | (2) |
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A Note about Effect Size for Two-Group Comparisons |
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38 | (1) |
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Example 3.1 Comparing Two Independent Groups |
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39 | (3) |
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Example 3.2 Power for Independent Samples t using R |
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42 | (1) |
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Example 3.3 Paired t-test |
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43 | (1) |
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Example 3.4 Power for Paired t using R |
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44 | (1) |
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Example 3.5 Power from Effect Size Estimate |
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44 | (1) |
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Dealing with Unequal Variances, Unequal Sample Sizes, and Violation of Assumptions |
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45 | (4) |
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Example 3.6 Unequal Variances and Unequal Sample Sizes |
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49 | (3) |
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52 | (1) |
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53 | (1) |
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4 Correlations and Differences between Correlations |
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54 | (15) |
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54 | (1) |
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54 | (1) |
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55 | (1) |
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Example 4.1 Zero-order Correlations |
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55 | (2) |
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Comparing Two Independent Correlations |
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57 | (1) |
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Example 4.2 Comparing Independent Correlations |
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58 | (2) |
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Comparing Two Dependent Correlations (One Variable in Common) |
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60 | (1) |
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Example 4.3 Comparing Dependent Correlations, One Variable in Common |
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61 | (2) |
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Comparing Two Dependent Correlations (No Variables in Common) |
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63 | (1) |
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Example 4.4 Comparing Dependent Correlations, No Variables in Common |
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64 | (3) |
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Note on Effect Sizes for Comparing Correlations |
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67 | (1) |
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67 | (1) |
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68 | (1) |
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5 Between Subjects ANOVA (One and Two Factors) |
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69 | (19) |
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69 | (1) |
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69 | (1) |
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Omnibus Versus Contrast Power |
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70 | (1) |
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70 | (2) |
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Example 5.1 One Factor ANOVA |
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72 | (2) |
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Example 5.2 One Factor ANOVA with Orthogonal Contrasts |
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74 | (4) |
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78 | (1) |
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Example 5.3 Two Factor ANOVA with Interactions |
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79 | (4) |
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Power for Multiple Effects |
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83 | (3) |
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86 | (1) |
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87 | (1) |
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6 Within Subjects Designs with ANOVA and Linear Mixed Models |
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88 | (12) |
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88 | (1) |
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88 | (2) |
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90 | (1) |
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Example 6.1 One Factor Within Subjects Design |
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91 | (2) |
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Example 6.2 Sphericity Adjustments |
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93 | (1) |
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Example 6.3 Linear Mixed Model Approach to Repeated Measures |
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93 | (1) |
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Example 6.4 A Serious Sphericity Problem |
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94 | (1) |
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94 | (1) |
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Example 6.5 Trend Analysis |
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95 | (1) |
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Example 6.6 Two Within Subject Factors Using ANOVA |
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96 | (1) |
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Example 6.7 Simple Effects Using ANOVA |
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97 | (1) |
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Example 6.8 Two Factor Within and Simple Effects Using LMM |
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98 | (1) |
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99 | (1) |
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99 | (1) |
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7 Mixed Model ANOVA and Multivariate ANOVA |
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100 | (12) |
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100 | (1) |
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100 | (1) |
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101 | (1) |
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ANOVA with Between and Within Subject Factors |
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101 | (1) |
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Example 7.1 ANOVA with One Within Subjects Factor and One Between Subjects Factor |
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101 | (2) |
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Example 7.2 Linear Mixed Model with One Within Subjects Factor and One Between Subjects Factor |
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103 | (1) |
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104 | (3) |
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Example 7.3 Multivariate ANOVA |
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107 | (2) |
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109 | (2) |
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111 | (1) |
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112 | (23) |
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112 | (1) |
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112 | (2) |
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114 | (3) |
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Example 8.1 Power for a Two Predictor Model (R.2 Model and Coefficients) |
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117 | (4) |
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Example 8.2 Power for Three Predictor Models |
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121 | (1) |
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Example 8.3 Power for Detecting Differences between Two Dependent Coefficients |
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122 | (3) |
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Example 8.4 Power for Detecting Differences between Two Independent Coefficients |
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125 | (2) |
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Example 8.5 Comparing Two Independent R.2 Values |
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127 | (1) |
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Multiplicity and Direction of Predictor Correlations |
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128 | (4) |
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Example 8.6 Power (All) with Three Predictors |
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132 | (1) |
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133 | (1) |
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134 | (1) |
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9 Analysis of Covariance, Moderated Regression, Logistic Regression, and Mediation |
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135 | (22) |
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135 | (1) |
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136 | (3) |
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Moderated Regression Analysis (Regression with Interactions) |
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139 | (4) |
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Example 9.2 Regression Analogy (Coefficients) |
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143 | (1) |
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Example 9.3 Regression Analogy (R2 Change,) |
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144 | (1) |
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Example 9.4 Comparison on Correlations/Simple Slopes |
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145 | (2) |
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147 | (1) |
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Example 9.5 Logistic Regression with a Single Categorical Predictor |
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148 | (1) |
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Example 9.6 Logistic Regression with a Single Continuous Predictor |
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149 | (2) |
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Example 9.7 Power for One Predictor in a Design with Multiple Predictors |
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151 | (1) |
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Mediation (Indirect Effects) |
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152 | (1) |
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Example 9.8 One Mediating Variable |
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153 | (1) |
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Example 9.9 Multiple Mediating Variables |
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154 | (1) |
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155 | (1) |
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156 | (1) |
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10 Precision Analysis for Confidence Intervals |
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157 | (16) |
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158 | (1) |
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158 | (1) |
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Types of Confidence Intervals |
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159 | (1) |
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Example 10.1 Confidence Limits around Differences between Means |
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159 | (2) |
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Determining Levels of Precision |
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161 | (2) |
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Confidence Intervals around Effect Sizes |
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163 | (1) |
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Example 10.2 Confidence Limits around d |
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163 | (2) |
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Precision for a Correlation |
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165 | (1) |
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Example 10.3 Confidence Limits around r |
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165 | (2) |
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Example 10.4 Precision forR.2 |
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167 | (2) |
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Supporting Null Hypotheses |
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169 | (1) |
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Example 10.5 "Supporting" Null Hypotheses |
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169 | (1) |
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170 | (1) |
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171 | (2) |
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11 Additional Issues and Resources |
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173 | (15) |
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Accessing the Analysis Code |
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173 | (1) |
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Using Loops to Get Power for a Range of Values |
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173 | (1) |
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How to Report Power Analyses |
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174 | (1) |
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Example 11.1 Reporting a Power Analysis for a Chi-Square Analysis |
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175 | (1) |
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Example 11.2 Reporting a Power Analysis for Repeated Measures ANOVA |
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175 | (1) |
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Reporting Power if Not Addressed A Priori |
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175 | (1) |
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Statistical Test Assumptions |
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176 | (1) |
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Effect Size Conversion Formulae |
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176 | (1) |
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General (Free) Resources for Power and Related Topics |
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177 | (1) |
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Resources for Additional Analyses |
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178 | (1) |
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Improving Power without Increasing Sample Size or Cost |
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179 | (2) |
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181 | (7) |
| Index |
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188 | |
Rohkem infot Taylor & Francis e-raamatute kohta