AP Statistics Curriculum 2007 Bayesian Gibbs - Revision history

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New page: Gibbs sampling is an algorithm to generate a sequence of samples from the joint probability distribution of two or more random variables. The purpose of this sequence is to approximate the...

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Gibbs sampling is an algorithm to generate a sequence of samples from the joint probability distribution of two or more random variables. The purpose of this sequence is to approximate the joint distribution, or to compute an expected value. Gibbs sampling is a special case of the Metropolis-Hastings algorithm also making it an example of a Markov chain Monte Carlo algorithm.

==Introduction to numerical methods==

==EM algorithm==

==Data augmentation by Monte Carlo==

==The Gibbs Sampler==

==Rejection Sampling==

==Metropolis Hastings Algorithm==

==Generalized Linear Model==

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 ==[[EBook | Probability and Statistics Ebook]] - Expectation Maximization Estimation, Gibbs Sampling and Monte Carlo Simulations==
-Gibbs sampling is an algorithm to generate a sequence of samples from the joint probability distribution of two or more random variables. The purpose of this sequence is to approximate the joint distribution, or to compute an expected value. Gibbs sampling is a special case of the Metropolis-Hastings algorithm, also making it an example of a Markov chain Monte Carlo algorithm.
+Gibbs sampling is an algorithm to generate a sequence of samples from the joint probability distribution of two or more random variables. The purpose of this sequence is to approximate the joint distribution, or to compute an expected value. Gibbs sampling is a special case of the Metropolis-Hastings algorithm and is also  an example of a Markov chain Monte Carlo algorithm.
 ==Introduction to numerical methods==

@@ Line 1: / Line 1: @@
 ==[[EBook | Probability and Statistics Ebook]] - Expectation Maximization Estimation, Gibbs Sampling and Monte Carlo Simulations==
-Gibbs sampling is an algorithm to generate a sequence of samples from the joint probability distribution of two or more random variables. The purpose of this sequence is to approximate the joint distribution, or to compute an expected value. Gibbs sampling is a special case of the Metropolis-Hastings algorithm also making it an example of a Markov chain Monte Carlo algorithm.
+Gibbs sampling is an algorithm to generate a sequence of samples from the joint probability distribution of two or more random variables. The purpose of this sequence is to approximate the joint distribution, or to compute an expected value. Gibbs sampling is a special case of the Metropolis-Hastings algorithm, also making it an example of a Markov chain Monte Carlo algorithm.
 ==Introduction to numerical methods==

@@ Line 1: / Line 1: @@
 Gibbs sampling is an algorithm to generate a sequence of samples from the joint probability distribution of two or more random variables. The purpose of this sequence is to approximate the joint distribution, or to compute an expected value. Gibbs sampling is a special case of the Metropolis-Hastings algorithm also making it an example of a Markov chain Monte Carlo algorithm.
 ==Introduction to numerical methods==
 ==EM algorithm==
 ==Data augmentation by Monte Carlo==
@@ Line 25: / Line 23: @@
-==Generalized Linear Model==