Applied Statistics and Probability for Engineers

Applied Statistics and Probability for Engineers

Montgomery, Douglas C.; Runger, George C.

John Wiley & Sons Inc

06/2020

720

Loose-leaf

Inglês

9781119746355

1142

Descrição não disponível.
1 The Role of Statistics in Engineering 1 1.1 The Engineering Method and Statistical Thinking 2 1.1.1 Variability 3 1.1.2 Populations and Samples 5 1.2 Collecting Engineering Data 5 1.2.1 Basic Principles 5 1.2.2 Retrospective Study 5 1.2.3 Observational Study 6 1.2.4 Designed Experiments 6 1.2.5 Observing Processes Over Time 9 1.3 Mechanistic and Empirical Models 12 1.4 Probability and Probability Models 15 2 Probability 17 2.1 Sample Spaces and Events 18 2.1.1 Random Experiments 18 2.1.2 Sample Spaces 19 2.1.3 Events 21 2.2 Counting Techniques 23 2.3 Interpretations and Axioms of Probability 26 2.4 Unions of Events and Addition Rules 29 2.5 Conditional Probability 31 2.6 Intersections of Events and Multiplication and Total Probability Rules 34 2.7 Independence 36 2.8 Bayes' Theorem 39 2.9 Random Variables 40 3 Discrete Random Variables and Probability Distributions 42 3.1 Probability Distributions and Probability Mass Functions 43 3.2 Cumulative Distribution Functions 45 3.3 Mean and Variance of a Discrete Random Variable 47 3.4 Discrete Uniform Distribution 49 3.5 Binomial Distribution 51 3.6 Geometric and Negative Binomial Distributions 55 3.7 Hypergeometric Distribution 59 3.8 Poisson Distribution 63 4 Continuous Random Variables and Probability Distributions 66 4.1 Probability Distributions and Probability Density Functions 67 4.2 Cumulative Distribution Functions 70 4.3 Mean and Variance of a Continuous Random Variable 71 4.4 Continuous Uniform Distribution 72 4.5 Normal Distribution 73 4.6 Normal Approximation to the Binomial and Poisson Distributions 79 4.7 Exponential Distribution 83 4.8 Erlang and Gamma Distributions 86 4.9 Weibull Distribution 89 4.10 Lognormal Distribution 90 4.11 Beta Distribution 92 5 Joint Probability Distributions 95 5.1 Joint Probability Distributions for Two Random Variables 96 5.2 Conditional Probability Distributions and Independence 102 5.3 Joint Probability Distributions for More Than Two Random Variables 107 5.4 Covariance and Correlation 110 5.5 Common Joint Distributions 113 5.5.1 Multinomial Probability Distribution 113 5.5.2 Bivariate Normal Distribution 115 5.6 Linear Functions of Random Variables 117 5.7 General Functions of Random Variables 120 5.8 Moment-Generating Functions 121 6 Descriptive Statistics 126 6.1 Numerical Summaries of Data 127 6.2 Stem-and-Leaf Diagrams 131 6.3 Frequency Distributions and Histograms 135 6.4 Box Plots 139 6.5 Time Sequence Plots 140 6.6 Scatter Diagrams 142 6.7 Probability Plots 144 7 Point Estimation of Parameters and Sampling Distributions 148 7.1 Point Estimation 149 7.2 Sampling Distributions and the Central Limit Theorem 150 7.3 General Concepts of Point Estimation 156 7.3.1 Unbiased Estimators 156 7.3.2 Variance of a Point Estimator 157 7.3.3 Standard Error: Reporting a Point Estimate 158 7.3.4 Bootstrap Standard Error 159 7.3.5 Mean Squared Error of an Estimator 160 7.4 Methods of Point Estimation 161 7.4.1 Method of Moments 162 7.4.2 Method of Maximum Likelihood 163 7.4.3 Bayesian Estimation of Parameters 167 8 Statistical Intervals for a Single Sample 170 8.1 Confidence Interval on the Mean of a Normal Distribution, Variance Known 172 8.1.1 Development of the Confidence Interval and Its Basic Properties 172 8.1.2 Choice of Sample Size 175 8.1.3 One-Sided Confidence Bounds 176 8.1.4 General Method to Derive a Confidence Interval 176 8.1.5 Large-Sample Confidence Interval for 177 8.2 Confidence Interval on the Mean of a Normal Distribution, Variance Unknown 179 8.2.1 t Distribution 180 8.2.2 t Confidence Interval on 181 8.3 Confidence Interval on the Variance and Standard Deviation of a Normal Distribution 182 8.4 Large-Sample Confidence Interval for a Population Proportion 185 8.5 Guidelines for Constructing Confidence Intervals 188 8.6 Bootstrap Confidence Interval 189 8.7 Tolerance and Prediction Intervals 189 8.7.1 Prediction Interval for a Future Observation 189 8.7.2 Tolerance Interval for a Normal Distribution 191 9 Tests of Hypotheses for a Single Sample 193 9.1 Hypothesis Testing 194 9.1.1 Statistical Hypotheses 194 9.1.2 Tests of Statistical Hypotheses 196 9.1.3 One-Sided and Two-Sided Hypotheses 202 9.1.4 P-Values in Hypothesis Tests 203 9.1.5 Connection between Hypothesis Tests and Confidence Intervals 206 9.1.6 General Procedure for Hypothesis Tests 206 9.2 Tests on the Mean of a Normal Distribution, Variance Known 208 9.2.1 Hypothesis Tests on the Mean 208 9.2.2 Type II Error and Choice of Sample Size 211 9.2.3 Large-Sample Test 215 9.3 Tests on the Mean of a Normal Distribution, Variance Unknown 215 9.3.1 Hypothesis Tests on the Mean 215 9.3.2 Type II Error and Choice of Sample Size 220 9.4 Tests on the Variance and Standard Deviation of a Normal Distribution 222 9.4.1 Hypothesis Tests on the Variance 222 9.4.2 Type II Error and Choice of Sample Size 224 9.5 Tests on a Population Proportion 225 9.5.1 Large-Sample Tests on a Proportion 225 9.5.2 Type II Error and Choice of Sample Size 227 9.6 Summary Table of Inference Procedures for a Single Sample 229 9.7 Testing for Goodness of Fit 229 9.8 Contingency Table Tests 232 9.9 Nonparametric Procedures 234 9.9.1 The Sign Test 235 9.9.2 The Wilcoxon Signed-Rank Test 239 9.9.3 Comparison to the t-Test 240 9.10 Equivalence Testing 240 9.11 Combining P-Values 242 10 Statistical Inference for Two Samples 244 10.1 Inference on the Difference in Means of Two Normal Distributions, Variances Known 245 10.1.1 Hypothesis Tests on the Difference in Means, Variances Known 247 10.1.2 Type II Error and Choice of Sample Size 249 10.1.3 Confidence Interval on the Difference in Means, Variances Known 251 10.2 Inference on the Difference in Means of Two Normal Distributions, Variances Unknown 253 10.2.1 Hypotheses Tests on the Difference in Means, Variances Unknown 253 10.2.2 Type II Error and Choice of Sample Size 259 10.2.3 Confidence Interval on the Difference in Means, Variances Unknown 260 10.3 A Nonparametric Test for the Difference in Two Means 261 10.3.1 Description of the Wilcoxon Rank-Sum Test 262 10.3.2 Large-Sample Approximation 263 10.3.3 Comparison to the t-Test 264 10.4 Paired t-Test 264 10.5 Inference on the Variances of Two Normal Distributions 268 10.5.1 F Distribution 268 10.5.2 Hypothesis Tests on the Equity of Two Variances 270 10.5.3 Type II Error and Choice of Sample Size 272 10.5.4 Confidence Interval on the Ratio of Two Variances 273 10.6 Inference on Two Population Proportions 273 10.6.1 Large-Sample Tests on the Difference in Population Proportions 274 10.6.2 Type II Error and Choice of Sample Size 276 10.6.3 Confidence Interval on the Difference in Population Proportions 277 10.7 Summary Table and Road Map for Inference Procedures for Two Samples 278 11 Simple Linear Regression and Correlation 280 11.1 Empirical Models 281 11.2 Simple Linear Regression 284 11.3 Properties of the Least Squares Estimators 288 11.4 Hypothesis Tests in Simple Linear Regression 288 11.4.1 Use of t-Tests 289 11.4.2 Analysis of Variance Approach to Test Significance of Regression 291 11.5 Confidence Intervals 292 11.5.1 Confidence Intervals on the Slope and Intercept 292 11.5.2 Confidence Interval on the Mean Response 293 11.6 Prediction of New Observations 295 11.7 Adequacy of the Regression Model 296 11.7.1 Residual Analysis 296 11.7.2 Coefficient of Determination (R2) 298 11.8 Correlation 299 11.9 Regression on Transformed Variables 303 11.10 Logistic Regression 305 12 Multiple Linear Regression 310 12.1 Multiple Linear Regression Model 311 12.1.1 Introduction 311 12.1.2 Least Squares Estimation of the Parameters 314 12.1.3 Matrix Approach to Multiple Linear Regression 316 12.1.4 Properties of the Least Squares Estimators 321 12.2 Hypothesis Tests in Multiple Linear Regression 322 12.2.1 Test for Significance of Regression 322 12.2.2 Tests on Individual Regression Coefficients and Subsets of Coefficients 325 12.3 Confidence Intervals in Multiple Linear Regression 329 12.3.1 Confidence Intervals on Individual Regression Coefficients 329 12.3.2 Confidence Interval on the Mean Response 330 12.4 Prediction of New Observations 331 12.5 Model Adequacy Checking 333 12.5.1 Residual Analysis 333 12.5.2 Influential Observations 335 12.6 Aspects of Multiple Regression Modeling 337 12.6.1 Polynomial Regression Models 337 12.6.2 Categorical Regressors and Indicator Variables 339 12.6.3 Selection of Variables and Model Building 341 12.6.4 Multicollinearity 349 13 Design and Analysis of Single-Factor Experiments: The Analysis of Variance 351 13.1 Designing Engineering Experiments 352 13.2 Completely Randomized Single-Factor Experiment 353 13.2.1 Example: Tensile Strength 353 13.2.2 Analysis of Variance 354 13.2.3 Multiple Comparisons Following the ANOVA 359 13.2.4 Residual Analysis and Model Checking 361 13.2.5 Determining Sample Size 363 13.3 The Random-Effects Model 365 13.3.1 Fixed Versus Random Factors 365 13.3.2 ANOVA and Variance Components 365 13.4 Randomized Complete Block Design 368 13.4.1 Design and Statistical Analysis 368 13.4.2 Multiple Comparisons 372 13.4.3 Residual Analysis and Model Checking 373 14 Design of Experiments with Several Factors 375 14.1 Introduction 376 14.2 Factorial Experiments 378 14.3 Two-Factor Factorial Experiments 382 14.3.1 Statistical Analysis 382 14.3.2 Model Adequacy Checking 386 14.3.3 One Observation per Cell 387 14.4 General Factorial Experiments 388 14.5 2k Factorial Designs 390 14.5.1 22 Design 390 14.5.2 2k Design for k 3 Factors 396 14.6 Single Replicate of the 2k Design 402 14.7 Addition of Center Points to a 2k Design 405 14.8 Blocking and Confounding in the 2k Design 408 14.9 One-Half Fraction of the 2k Design 413 14.10 Smaller Fractions: The 2k p Fractional Factorial 418 14.11 Response Surface Methods and Designs 425 15 Statistical Quality Control 434 15.1 Quality Improvement and Statistics 435 15.1.1 Statistical Quality Control 436 15.1.2 Statistical Process Control 436 15.2 Introduction to Control Charts 436 15.2.1 Basic Principles 436 15.2.2 Design of a Control Chart 440 15.2.3 Rational Subgroups 441 15.2.4 Analysis of Patterns on Control Charts 442 15.3 X and R or S Control Charts 444 15.4 Control Charts for Individual Measurements 450 15.5 Process Capability 452 15.6 Attribute Control Charts 456 15.6.1 P Chart (Control Chart for Proportions) 456 15.6.2 U Chart (Control Chart for Defects per Unit) 458 15.7 Control Chart Performance 460 15.8 Time-Weighted Charts 462 15.8.1 Exponentially Weighted Moving-Average Control Chart 462 15.8.2 Cumulative Sum Control Chart 465 15.9 Other SPC Problem-Solving Tools 471 15.10 Decision Theory 473 15.10.1 Decision Models 473 15.10.2 Decision Criteria 474 15.11 Implementing SPC 476 Appendix A Statistical Tables and Charts A-3 Table I Summary of Common Probability Distributions A-4 Table II Cumulative Binomial Probabilities P(X x) A-5 Table III Cumulative Standard Normal Distribution A-8 Table IV Percentage Points 2 ,v of the Chi-Squared Distribution A-10 Table V Percentage Points t ,v of the t Distribution A-11 Table VI Percentage Points f ,v1,v2 of the F Distribution A-12 Chart VII Operating Characteristic Curves A-17 Table VIII Critical Values for the Sign Test A-26 Table IX Critical Values for the Wilcoxon Signed-Rank Test A-26 Table X Critical Values for the Wilcoxon Rank-Sum Test A-27 Table XI Factors for Constructing Variables Control Charts A-28 Table XII Factors for Tolerance Intervals A-29 Appendix B Bibliography A-31 Appendix C Summary of Confidence Intervals and Hypothesis Testing Equations for One and Two Sample Applications A-33 Glossary G-1 Exercises P-1 Index I-1
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difference; choice; variance; variances; means; normal distribution; wilcoxon rank-sum test; wilcoxon signed-rank test; common probability distributions; hypothesis testing equations; individual regression coefficients; inference procedures