Probability and Statistics for Engineering and the Sciences

Name: Probability and Statistics for Engineering and the Sciences
Price: 6.93 USD
Availability: InStock
ISBN: 9780495557449

ISBN-10: 0495557447

ISBN-13: 9780495557449

Edition: 7th 2009

Authors: Jay L. DeVore

List price: $361.95

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Description:

This comprehensive introduction to probability and statistics will give you the solid grounding you need no matter what your engineering specialty. Through the use of lively and realistic examples, the author helps you go beyond simply learning about statistics to actually putting the statistical methods to use. Rather than focus on rigorous mathematical development and potentially overwhelming derivations, the book emphasizes concepts, models, methodology, and applications that facilitate your understanding.

Book details

List price: $361.95
Edition: 7th
Copyright year: 2009
Publisher: Brooks/Cole
Publication date: 1/29/2008
Binding: Hardcover
Pages: 768
Size: 8.25" wide x 10.25" long x 1.25" tall
Weight: 3.388
Language: English

Jay Devore is Professor Emeritus of Statistics at California Polytechnic State University. He earned his undergraduate degree in Engineering Science from the University of California at Berkeley, spent a year at the University of Sheffield in England, and finished his Ph.D. in statistics at Stanford University. Jay previously taught at the University of Florida and at Oberlin College and has had visiting appointments at Stanford, Harvard, the University of Washington, New York University, and Columbia University. From 1998 to 2006, he served as Chair of the Statistics Department. In addition to this book, Jay has written several widely used engineering statistics texts and a book in applied…




Overview and Descriptive Statistics


Populations, Samples, and Processes


Pictorial and Tabular Methods in Descriptive Statistics


Measures of Location


Measures of Variability



Probability


Sample Spaces and Events


Axioms, Interpretations, and Properties of Probability


Counting Techniques


Conditional Probability


Independence



Discrete Random Variables and Probability Distributions


Random Variables


Probability Distributions for Discrete Random Variables


Expected Values of Discrete Random Variables


The Binomial Probability Distribution


Hypergeometric and Negative Binomial Distributions


The Poisson Probability Distribution



Continuous Random Variables and Probability Distributions


Continuous Random Variables and Probability Density Functions


Cumulative Distribution Functions and Expected Values


The Normal Distribution


The Exponential and Gamma Distribution


Other Continuous Distributions


Probability Plots



Joint Probability Distributions and Random Samples


Jointly Distributed Random Variables


Expected Values, Covariance, and Correlation


Statistics and Their Distributions


The Distribution of the Sample Mean


The Distribution of a Linear Combination



Point Estimation


Some General Concepts of Point Estimation


Methods of Point Estimation



Statistical Intervals Based on a Single Sample


Basic Properties of Confidence Intervals


Large-Sample Confidence Intervals for a Population Mean and Proportion


Intervals Based on a Normal Population Distribution


Confidence Intervals for the Variance and Standard Deviation of a Normal Population



Tests of Hypotheses Based on a Single Sample


Hypothesis and Test Procedures


Tests About a Population Mean


Tests Concerning a Population Proportion


P-Values


Some Comments on Selecting a Test



Inferences Based on two Samples


z Tests and Confidence Intervals for a Difference Between Two Population Means


The Two-Sample t Test and Confidence Interval


Analysis of Paired Data


Inferences Concerning a Difference Between Population Proportions


Inferences Concerning Two Population Variances



The Analysis of Variance


Single-Factor ANOVA


Multiple Comparisons in ANOVA


More on Single-Factor ANOVA



Multifactor Analysis of Variance


Two-Factor ANOVA with Kij =



Two-Factor ANOVA with Kij >



Three-Factor ANOVA. 2p Factorial Experiments



Simple Linear Regression and Correlation


The Simple Linear Regression Model


Estimating Model Parameters


Inferences About the Slope Parameter G



Inferences Concerning &Y-x* and the Prediction of Future Y Values


Correlation



Nonlinear and Multiple Regression


Aptness of the Model and Model Checking


Regression with Transformed Variables


Polynomial Regression


Multiple Regression Analysis


Other Issues in Multiple Regression



Goodness-of-Fit Tests and Categorical Data Analysis


Goodness-of-Fit Tests When Category Probabilities are Completely Specified


Goodness of Fit for Composite Hypotheses


Two-Way Contingency Tables



Distribution-Free Procedures


The Wilcoxon Signed-Rank Test


The Wilcoxon Rank-Sum Test


Distribution-Free Confidence Intervals


Distribution-Free ANOVA



Quality Control Methods


General Comments on Control Charts


Control Charts fort Process Location


Control Charts for Process Variation


Control Charts for Attributes


CUSUM Procedures


Acceptance Sampling





Cumulative Binomial Probabilities


Cumulative Poisson Probabilities


Standard Normal Curve Areas


The Incomplete Gamma Function


Critical Values for t Distributions


Tolerance Critical Values for Normal Population Distributions


Critical Values for Chi-Squared Distributions


t Curve Tail Areas


Critical Values for F Distributions


Critical Values for Studentized Range Distributions


Chi-Squared Curve Tail Areas


Critical Values for the Ryan-Joiner Test of Normality


Critical Values for the Wilcoxon Signed-Rank Test


Critical Values for the Wilcoxon Rank-Sum Test


Critical Value