(Chebyshev Inequality)
(Chebyshev Inequality)
Line 15: Line 15:
 
"Any RV is likely to be close to its mean"
 
"Any RV is likely to be close to its mean"
  
:<math>\Pr(\left|X-E[X]\right|\geq \alpha)\leq\frac{var(X)}{\alpha^2}.</math>
+
:<math>\Pr(\left|X-E[X]\right|\geq C)\leq\frac{var(X)}{C^2}.</math>
  
 
==ML Estimation Rule==
 
==ML Estimation Rule==

Revision as of 16:09, 18 November 2008

Covariance

  • $ COV(X,Y)=E[(X-E[X])(Y-E[Y])]\! $
  • $ COV(X,Y)=E[XY]-E[X]E[Y]\! $

Correlation Coefficient

$ \rho(X,Y)= \frac {cov(X,Y)}{\sqrt{var(X)} \sqrt{var(Y)}} \, $

Markov Inequality

Loosely speaking: In a nonnegative RV has a small mean, then the probability that it takes a large value must also be small.

  • $ P(X \geq a) \leq E[X]/a\! $

for all a > 0

Chebyshev Inequality

"Any RV is likely to be close to its mean"

$ \Pr(\left|X-E[X]\right|\geq C)\leq\frac{var(X)}{C^2}. $

ML Estimation Rule

MAP Estimation Rule

Bias of an Estimator, and Unbiased estimators

Confidence Intervals, and how to get them via Chebyshev

Alumni Liaison

Prof. Math. Ohio State and Associate Dean
Outstanding Alumnus Purdue Math 2008

Jeff McNeal