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<math>\int_{\{|f_n|>M\}}|f_n|\leq\int_{(0,1)}|f_n-f|+\int_{\{|f_n|>M\}}|f|
+
<math>\int_{\{|f_n|>M\}}|f_n|\leq\int_{(0,1)}|f_n-f|+\int_{\{|f_n|>M\}}|f|\\
  
 
Since \int_{(0,1)}|f_n-f|\to0,
 
Since \int_{(0,1)}|f_n-f|\to0,
 
</math>
 
</math>

Revision as of 09:45, 2 July 2008

$ \int_{\{|f_n|>M\}}|f_n|\leq\int_{(0,1)}|f_n-f|+\int_{\{|f_n|>M\}}|f|\\ Since \int_{(0,1)}|f_n-f|\to0, $

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Alumni Liaison

Correspondence Chess Grandmaster and Purdue Alumni

Prof. Dan Fleetwood