(New page: If Independent then P(H)*P(T)=P(H<math>union</math>T) Sample Case: One flip of coin P(H)=0.5 P(T)=0.5 P(H<math>union</math>T)=0 (You can't have both H and T in one flip) (0.5)*(0.5)=0 No...)
 
 
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If Independent then P(H)*P(T)=P(H<math>union</math>T)
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[[Category:MA375]]
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[[Category:math]]
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[[Category:discrete math]]
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[[Category:problem solving]]
  
Sample Case: One flip of coin
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=[[MA375]]: [[MA_375_Spring_2009_Walther_Week_5| Solution to a homework problem from this week or last week's homework]]=
P(H)=0.5
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Spring 2009, Prof. Walther
P(T)=0.5
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----
P(H<math>union</math>T)=0 (You can't have both H and T in one flip)
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(0.5)*(0.5)=0
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Not independent
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If Independent then P(H)*P(T)=P(H∩T)
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Sample Case: One flip of coin
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P(H)=0.5
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P(T)=0.5
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P(H∩T)=0 (You can't have both H and T in one flip)
 +
 
 +
(0.5)*(0.5)≠0
 +
Not independent
 +
 
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----
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[[MA375_%28WaltherSpring2009%29|Back to MA375, Spring 2009, Prof. Walther]]

Latest revision as of 08:23, 20 May 2013


MA375: Solution to a homework problem from this week or last week's homework

Spring 2009, Prof. Walther



If Independent then P(H)*P(T)=P(H∩T)
Sample Case: One flip of coin
P(H)=0.5
P(T)=0.5
P(H∩T)=0 (You can't have both H and T in one flip)
(0.5)*(0.5)≠0
Not independent

Back to MA375, Spring 2009, Prof. Walther

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Abstract algebra continues the conceptual developments of linear algebra, on an even grander scale.

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