The UNIVARIATE Procedure
- Overview
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Getting Started
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Syntax
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DetailsMissing ValuesRoundingDescriptive StatisticsCalculating the ModeCalculating PercentilesTests for LocationConfidence Limits for Parameters of the Normal DistributionRobust EstimatorsCreating Line Printer PlotsCreating High-Resolution GraphicsUsing the CLASS Statement to Create Comparative PlotsPositioning InsetsFormulas for Fitted Continuous DistributionsGoodness-of-Fit TestsKernel Density EstimatesConstruction of Quantile-Quantile and Probability PlotsInterpretation of Quantile-Quantile and Probability PlotsDistributions for Probability and Q-Q PlotsEstimating Shape Parameters Using Q-Q PlotsEstimating Location and Scale Parameters Using Q-Q PlotsEstimating Percentiles Using Q-Q PlotsInput Data SetsOUT= Output Data Set in the OUTPUT StatementOUTHISTOGRAM= Output Data SetOUTKERNEL= Output Data SetOUTTABLE= Output Data SetTables for Summary StatisticsODS Table NamesODS Tables for Fitted DistributionsODS GraphicsComputational Resources
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ExamplesComputing Descriptive Statistics for Multiple VariablesCalculating ModesIdentifying Extreme Observations and Extreme ValuesCreating a Frequency TableCreating Basic Summary PlotsAnalyzing a Data Set With a FREQ VariableSaving Summary Statistics in an OUT= Output Data SetSaving Percentiles in an Output Data SetComputing Confidence Limits for the Mean, Standard Deviation, and VarianceComputing Confidence Limits for Quantiles and PercentilesComputing Robust EstimatesTesting for LocationPerforming a Sign Test Using Paired DataCreating a HistogramCreating a One-Way Comparative HistogramCreating a Two-Way Comparative HistogramAdding Insets with Descriptive StatisticsBinning a HistogramAdding a Normal Curve to a HistogramAdding Fitted Normal Curves to a Comparative HistogramFitting a Beta CurveFitting Lognormal, Weibull, and Gamma CurvesComputing Kernel Density EstimatesFitting a Three-Parameter Lognormal CurveAnnotating a Folded Normal CurveCreating Lognormal Probability PlotsCreating a Histogram to Display Lognormal FitCreating a Normal Quantile PlotAdding a Distribution Reference LineInterpreting a Normal Quantile PlotEstimating Three Parameters from Lognormal Quantile PlotsEstimating Percentiles from Lognormal Quantile PlotsEstimating Parameters from Lognormal Quantile PlotsComparing Weibull Quantile PlotsCreating a Cumulative Distribution PlotCreating a P-P Plot
- References
References
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Bowman, K. O., and Shenton, L. R. (1983). “Johnson’s System of Distributions.” In Encyclopedia of Statistical Sciences, vol. 4, edited by S. Kotz, N. L. Johnson, and C. B. Read. New York: John Wiley & Sons.
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Chambers, J. M., Cleveland, W. S., Kleiner, B., and Tukey, P. A. (1983). Graphical Methods for Data Analysis. Belmont, CA: Wadsworth International Group.
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Cohen, A. C. (1951). “Estimating Parameters of Logarithmic-Normal Distributions by Maximum Likelihood.” Journal of the American Statistical Association 46:206–212.
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Johnson, N. L., Kotz, S., and Balakrishnan, N. (1995). Continuous Univariate Distributions. 2nd ed. Vol. 2. New York: John Wiley & Sons.
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Jones, M. C., Marron, J. S., and Sheather, S. J. (1996). “A Brief Survey of Bandwidth Selection for Density Estimation.” Journal of the American Statistical Association 91:401–407.
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Rousseeuw, P. J., and Croux, C. (1993). “Alternatives to the Median Absolute Deviation.” Journal of the American Statistical Association 88:1273–1283.
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Royston, J. P. (1992). “Approximating the Shapiro-Wilk W Test for Nonnormality.” Statistics and Computing 2:117–119.
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Shapiro, S. S., and Wilk, M. B. (1965). “An Analysis of Variance Test for Normality (Complete Samples).” Biometrika 52:591–611.
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Silverman, B. W. (1986). Density Estimation for Statistics and Data Analysis. New York: Chapman & Hall.
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Terrell, G. R., and Scott, D. W. (1985). “Oversmoothed Nonparametric Density Estimates.” Journal of the American Statistical Association 80:209–214.
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Tukey, J. W. (1977). Exploratory Data Analysis. Reading, MA: Addison-Wesley.
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Tukey, J. W., and McLaughlin, D. H. (1963). “Less Vulnerable Confidence and Significance Procedures for Location Based on a Single Sample: Trimming/Winsorization 1.” Sankhy, Series A 25:331–352.
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Wainer, H. (1974). “The Suspended Rootogram and Other Visual Displays: An Empirical Validation.” American Statistician 28:143–145.