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[[Media:Mle-tutorial.pdf|MLE Tutorial in PDF Format]]  
 
[[Media:Mle-tutorial.pdf|MLE Tutorial in PDF Format]]  
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= Motivation =
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Suppose one wishes to determine just how biased an unfair coin is. Call the probability of <br>tossing a HEAD is <math>p</math>. The goal then is to determine <math>p</math>.
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Also suppose the coin is tossed 80 times: i.e., the sample might be something like <math>x_1</math> = H, <br><math>$x_2$</math> = T, …, <math>$x_80$</math>&nbsp;= T, and the count of number of HEADS, "H" is observed.
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The probability of tossing TAILS is <math>$1 - p$</math>. Suppose the outcome is 49 HEADS and 31 TAILS, <br>and suppose the coin was taken from a box containing three coins: one which gives HEADS<br>with probability <math>$p = 1/3$</math>, one which gives HEADS with probability <math>$p = 1/2$</math>&nbsp;and another which<br>gives HEADS with probability <math>$p = 2/3$</math>. The coins have lost their labels, so which one it was is<br>unknown. Clearly the probability mass function for this experiment is binomial distribution with<br>sample size equal to 80, number of successes equal to 49 but different values of <math>$p$</math>. We have<br>the following probability mass functions for each of the above mentioned cases:
  
 
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Revision as of 07:14, 5 April 2014

Tutorial on Maximum Likelihood Estimation: A Parametric Density Estimation Method



MLE Tutorial in PDF Format


Motivation


Suppose one wishes to determine just how biased an unfair coin is. Call the probability of
tossing a HEAD is $ p $. The goal then is to determine $ p $.

Also suppose the coin is tossed 80 times: i.e., the sample might be something like $ x_1 $ = H,
$ $x_2$ $ = T, …, $ $x_80$ $ = T, and the count of number of HEADS, "H" is observed.

The probability of tossing TAILS is $ $1 - p$ $. Suppose the outcome is 49 HEADS and 31 TAILS,
and suppose the coin was taken from a box containing three coins: one which gives HEADS
with probability $ $p = 1/3$ $, one which gives HEADS with probability $ $p = 1/2$ $ and another which
gives HEADS with probability $ $p = 2/3$ $. The coins have lost their labels, so which one it was is
unknown. Clearly the probability mass function for this experiment is binomial distribution with
sample size equal to 80, number of successes equal to 49 but different values of $ $p$ $. We have
the following probability mass functions for each of the above mentioned cases:


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Recent Math PhD now doing a post-doctorate at UC Riverside.

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