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Some examples of Gram-Charlier frequency curvesRiley, Fred Earl, 1918- January 1941 (has links)
No description available.
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FrequentiecurvenHolwerda, Allard Othmar. January 1913 (has links)
Thesis--Utrecht.
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A Comparative Study of the Charlier and the Pearson Systems of Frequency CurvesBalof, C. A. 01 January 1924 (has links)
No description available.
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Cumulative frequency functions,Burr, Irving Wingate, January 1900 (has links)
Thesis (PH. D.) - University of Michigan, 1941. Bibliography: p. 232. / Reprinted from the Annals of mathematical statistics, vol. XIII, number 2, June, 1942.
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On sampling from compound populationsBrown, George M. January 1900 (has links)
Thesis (Ph. D.)--University of Michigan, 1934. / Lithoprinted. "Reprinted from the Annals of Mathematical Statistics, November, 1933."
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Decomposition of fundamental frequency contours in the general superpositional intonation model /Mishra, Taniya. January 2008 (has links)
Thesis (Ph. D.)--Oregon Health & Science University, Department of Science & Engineering, September 2008. / Includes bibliographical references (leaves 147 - 158).
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On sampling from compound populations,Brown, George M. January 1900 (has links)
Thesis (Ph. D.)--University of Michigan, 1934. / Lithoprinted. "Reprinted from the Annals of Mathematical Statistics, November, 1933."
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Some examples of Pearson's frequency curvesThomson, Mary Gilmore, 1897- January 1940 (has links)
No description available.
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The Normal Curve Approximation to the Hypergeometric Probability DistributionWillman, Edward N. (Edward Nicholas) 12 1900 (has links)
The classical normal curve approximation to cumulative hypergeometric probabilities requires that the standard deviation of the hypergeometric distribution be larger than three which limits the usefulness of the approximation for small populations. The purposes of this study are to develop clearly-defined rules which specify when the normal curve approximation to the cumulative hypergeometric probability distribution may be successfully utilized and to determine where maximum absolute differences between the cumulative hypergeometric and normal curve approximation of 0.01 and 0.05 occur in relation to the proportion of the population sampled.
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Non-Dimensional Kinetoelastic Maps for Nonlinear Behavior of Compliant SuspensionsSingh, Jagdish Pratap January 2014 (has links) (PDF)
Compliant suspensions are often used in micromechanical devices and precision mechanisms as substitutes for kinematic joints. While their small-displacement behavior is easily captured in simple formulae, large-displacement behavior requires nonlinear finite element analysis. In this work, we present a method that helps capture the geometrically nonlinear behavior of compliant suspensions using parameterized non-dimensional maps. The maps are created by performing one nonlinear finite element analysis for any one loading condition for one instance of a suspension of a given topology and fixed proportions. These maps help retrieve behavioral information for any other instance of the same suspension with changed size, cross-section dimensions, material, and loading. Such quantities as multi-axial stiffness, maximum stress, natural frequency, etc. ,can be quickly and accurately estimated from the maps. These quantities are non-dimensionalized using suitable factors that include loading, size, cross-section, and material properties. The maps are useful in not only understanding the limits of performance of the topology of a given suspension with fixed proportions but also in design. We have created the maps for 20 different suspensions. Case studies are included to illustrate the effectiveness of the method in microsystem design as well as in precision mechanisms. In particular, the method and 2D plots of non-dimensional kinetoelastic maps provide a comprehensive view of sensitivity, cross-axis sensitivity, linearity, maximum stress, and bandwidth for microsensors and microactuators.
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