Screen LibraryStatistical tables, explained and applied /
This book contains several new or unpublished tables, such as one on the significance of the correlation coefficient [symbol], one giving the percentiles of [symbol] statistic for monotonic variation (with two structural models of variation), an extensive table for the number-of-runs test, three tab...
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| Main Authors: | |
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| Corporate Authors: | |
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| Published: |
World Scientific Pub. Co.,
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| Publisher Address: | Singapore ; River Edge, N.J. : |
| Publication Dates: | 2002. |
| Literature type: | eBook |
| Language: | English |
| Subjects: | |
| Online Access: |
http://www.worldscientific.com/worldscibooks/10.1142/4935#t=toc |
| Summary: |
This book contains several new or unpublished tables, such as one on the significance of the correlation coefficient [symbol], one giving the percentiles of [symbol] statistic for monotonic variation (with two structural models of variation), an extensive table for the number-of-runs test, three tables for the binomial sum of probabilities, and a table of coefficients for the re-conversion of orthogonal polynomials. In the case of the more familiar tables, such as those of the normal integral, or Student's t, Chi-square and F percentiles, all values have been re-computed, occasionally with t |
| Carrier Form: | 1 online resource (ix,234pages) : illustrations |
| Bibliography: | Includes bibliographical references and indexes. |
| ISBN: | 9789812777669 (electronic bk.) |
| CLC: | O212-64 |
| Contents: | Introduction. Common abbreviations and notations -- Normal distribution -- Chi-square (x[symbol) distribution -- Student's t distribution with Dunn- id k's t and significance table for r -- F distribution -- Studentized range (q) distribution -- Dunnett's t distribution -- [symbol][symbol] (monotonic variation) distribution -- F[symbol] distribution -- Cochran's C distribution -- Orthogonal polynomials -- Binomial distribution -- Number-of-runs distribution -- Random numbers -- Supplementary examples -- Mathematical complement. Beta [Beta distribution [symbol][symbol](a,b), Beta function B(a |