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If E and F are events in S (sample space) the  the conditional probability of E and F is P(E|F) = P(E intersect F).
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[[Category:MA375]]
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[[Category:math]]
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[[Category:discrete math]]
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[[Category:lecture notes]]
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=[[MA375]]: Lecture Notes=
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Fall 2008, Prof. Walther
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----
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==Some Definitions==
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If '''E''' and '''F''' are events in '''S''' (sample space) the  the conditional probability of '''E''' and '''F''' is '''P(E|F) = P(E intersect F)'''.
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Further :
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          the conditional probability of "E" given "F" is =<math> \frac {P(EnF)}{P(F)}</math>
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''defn:'' if P(E|F) = P(E) , then E and F are independent events otherwise they are dependant events.
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            note: independence implies that  <math> P(E)= P(E|F) = \frac {P(EnF)}{P(F)}</math>
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                      or P(E).P(F)=P(EnF).
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            note : if P(E|F) = P(E)
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                                then P(F|E) = P(F)
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----
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[[Main_Page_MA375Fall2008walther|Back to MA375, Fall 2008, Prof. Walther]]

Latest revision as of 07:16, 20 May 2013


MA375: Lecture Notes

Fall 2008, Prof. Walther


Some Definitions

If E and F are events in S (sample space) the the conditional probability of E and F is P(E|F) = P(E intersect F).

Further :

         the conditional probability of "E" given "F" is =$  \frac {P(EnF)}{P(F)} $

defn: if P(E|F) = P(E) , then E and F are independent events otherwise they are dependant events.

           note: independence implies that  $  P(E)= P(E|F) = \frac {P(EnF)}{P(F)} $
                    
                      or P(E).P(F)=P(EnF).
           note : if P(E|F) = P(E)
                               then P(F|E) = P(F)

Back to MA375, Fall 2008, Prof. Walther

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