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16: Appendices- Statistical Tables

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    • 16.1: Standard Normal Distribution Table (z table)
      This page discusses a z-table featuring positive z scores and their associated proportions in various contexts, including the body, tail, and between the mean and z score. It also describes structured numerical data ranging from 0.88 to 1.82, indicating probabilities that decrease progressively alongside a pattern in numerical sequences.
    • 16.2: t Distribution Table (t Table)
      This page outlines the \(t\) table, detailing critical values for one- and two-tailed tests across varying significance levels and degrees of freedom (up to 120). It instructs users to round down to the nearest lower degree of freedom when an exact match isn't available and emphasizes the importance of selecting the correct row and column for precise critical values in \(t\)-tests.
    • 16.3: Critical Values for F (F table)
      This page features a table of critical F values at an alpha level of 0.05, displaying numerator degrees of freedom in columns and denominator degrees in rows. It provides the necessary critical values for hypothesis testing in ANOVA, aiding in statistical analysis. Each cell corresponds to specific degrees of freedom.
    • 16.4: Critical Values for Pearson's r
      This page presents a table of critical values for Pearson's correlation coefficient (r) used in one-tailed and two-tailed tests, showing significance values at various levels (.05/.10, .025/.05, .01/.02, and .005/.01) across different degrees of freedom (df). These critical values help identify the threshold correlations required for statistical significance at each specified level.
    • 16.5: Critical Values of Chi-Square (Chi-Square Table)
      This page explains critical values in chi-square distributions, denoted as \(\chi_c^2\), which are used for right tail areas in statistics. It details the degrees of freedom for various chi-square tests, including Goodness of Fit and Test of Independence, with relevant formulas. A table summarizes critical values of \(\chi_c^2\) across different significance levels (p-values) and degrees of freedom, ranging from 1 to 100.

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