m (New page: My favorite theorem is <math>\sum^n_{i=0}i=\frac{n(n+1)}{2}</math>. I like this theorem not as much for it's importance but because of the story behind it. The story I've heard is that w...)
 
 
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My favorite theorem is <math>\sum^n_{i=0}i=\frac{n(n+1)}{2}</math>.  I like this theorem not as much for it's importance but because of the story behind it.  The story I've heard is that when Gauss was a young boy, his teacher made every student sum all the numbers from 1 to 100 to keep them occupied.  Gauss however was able to return the correct answer in a matter of seconds, and when his teacher asked him how he was doing it, Gauss showed him how he had derived this useful equation.--[[User:Jniederh|Jniederh]] 22:35, 24 January 2009 (UTC)
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[[Category:MA453Spring2009Walther]]
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My favorite theorem is <math>\sum^n_{i=0}i=\frac{n(n+1)}{2}</math>.  I like this theorem not as much for it's importance but because of the story behind it.  The story I've heard is that when Gauss was a young boy, his teacher made every student sum all the numbers from 1 to 100 to keep them occupied.  Gauss however was able to return the correct answer in a matter of seconds, and when his teacher asked him how he was doing it, Gauss showed him how he had derived this useful equation.--[[User:Jniederh|Jniederh]] 22:35, 24 January 2009

Latest revision as of 10:17, 1 February 2009

My favorite theorem is $ \sum^n_{i=0}i=\frac{n(n+1)}{2} $. I like this theorem not as much for it's importance but because of the story behind it. The story I've heard is that when Gauss was a young boy, his teacher made every student sum all the numbers from 1 to 100 to keep them occupied. Gauss however was able to return the correct answer in a matter of seconds, and when his teacher asked him how he was doing it, Gauss showed him how he had derived this useful equation.--Jniederh 22:35, 24 January 2009

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