bivariate distribution

(noun)

gives the probability that both of two random variables fall in a particular range or discrete set of values specified for that variable

Examples of bivariate distribution in the following topics:

  • Regression Toward the Mean: Estimation and Prediction

    • Regression towards the mean can be defined for any bivariate distribution with identical marginal distributions.
    • Not all such bivariate distributions show regression towards the mean under this definition.
    • However, all such bivariate distributions show regression towards the mean under the other definition.
    • Then, each student's score would be a realization of one of a set of independent and identically distributed random variables, with a mean of 50.
  • Graphing Bivariate Relationships

    • We can learn much more by displaying bivariate data in a graphical form that maintains the pairing of variables.
    • Measures of central tendency, variability, and spread summarize a single variable by providing important information about its distribution.
    • Each distribution is fairly skewed with a long right tail.
    • The presence of qualitative data leads to challenges in graphing bivariate relationships.
    • Compare the strengths and weaknesses of the various methods used to graph bivariate data.
  • Introduction to Bivariate Data

    • A dataset with two variables contains what is called bivariate data.
    • Measures of central tendency, variability, and spread summarize a single variable by providing important information about its distribution.
    • In this chapter we consider bivariate data, which for now consists of two quantitative variables for each individual.Our first interest is in summarizing such data in a way that is analogous to summarizing univariate (single variable) data.
    • Each distribution is fairly skewed with a long right tail.
    • We can learn much more by displaying the bivariate data in a graphical form that maintains the pairing.
  • Tukey Ladder of Powers

    • Many statistical methods such as t tests and the analysis of variance assume normal distributions.
    • Although these methods are relatively robust to violations of normality, transforming the distributions to reduce skew can markedly increase their power.
    • The demonstration in Figure 7 shows distributions of the data from the Stereograms case study as transformed with various values of λ.
    • Decreasing λ makes the distribution less positively skewed.
    • Distribution of data from the Stereogram case study for various values of λ
  • Introduction to describing one network

    • Most social scientists have a reasonable working knowledge of basic univariate and bivariate descriptive and inferential statistics.
    • Most social scientists have learned their statistics with applications to the study of the distribution of the scores of actors (cases) on variables, and the relations between these distributions.
    • The application of statistics to social networks is also about describing distributions and relations among distributions.
    • But, rather than describing distributions of attributes of actors (or "variables"), we are concerned with describing the distributions of relations among actors.
    • Second, many of tools of standard inferential statistics that we learned from the study of the distributions of attributes do not apply directly to network data.
  • Statistical Graphics

    • Many familiar forms, including bivariate plots, statistical maps, bar charts, and coordinate paper were used in the 18th century.
    • • Multivariate distribution and correlation in the late 19th and 20th century.
  • Introduction to comparing two relations for the same set of actors

    • The basic question of bivariate descriptive statistics applied to variables is whether scores on one attribute align (co-vary, correlate) with scores on another attribute, when compared across cases.
    • The basic question of bivariate analysis of network data is whether the pattern of ties for one relation among a set of actors aligns with the pattern of ties for another relation among the same actors.
    • Three of the most common tools for bivariate analysis of attributes can also be applied to the bivariate analysis of relations:
  • Glossary

    • Bivariate data is data for which there are two variables for each observation.
    • Many empirical distributions are approximated well by mathematical distributions such as the normal distribution.
    • A distribution with long tails relative to a normal distribution is leptokurtic.
    • One of the most common continuous distributions, a normal distribution is sometimes referred to as a "bell-shaped distribution. " If μ is the distribution mean, and σ the standard deviation, then the height (ordinate) of the normal distribution is given by
    • A distribution with short tails relative to a normal distribution is platykurtic.
  • Introduction

    • The type of data described in the examples is bivariate data - "bi" for two variables.
  • Summary

    • Bivariate Data: Each data point has two values.
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