Bivariate

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Revision as of 18:08, 18 March 2024 by Rice (talk | contribs)

Consider two numerica random variables and . We can measure their covariance.

The correlation of two random variables measures the line dependent between and

Correlation is always between -1 and 1

Bivariate Normal

The bivariate normal (aka. bivariate gaussian) is one special type of continuous random variable.

is bivariate normal if

  1. The marginal PDF of both X and Y are normal
  2. For any , the condition PDF of given is Normal
    • Works the other way around: Bivariate gaussian means that condition is satisfied

Predicting Y given X

Given bivariate normal, we can predict one variable given another. Let us try estimating the expected Y given X is x

There are three main methods

  • Scatter plot approximation
  • Joint PDF
  • 5 statistics

5 Parameters

We need to know 5 parameters about and

If follows bivariate normal distribution, then we have

The left side is the predicted Z-score for Y, and the right side is the product of correlation and Z-score of X = x

The variance is given by

Due to the range of , the variance of Y given X is always smaller than the actual variance. The standard deviation is just rooted that.