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My favorite mathematical theorem is Fermat's Last Theorem:
 
My favorite mathematical theorem is Fermat's Last Theorem:
  
An equation in the form of
+
If an equation is in the form of
  
 
'''<math>a^n + b^n = c^n </math>'''
 
'''<math>a^n + b^n = c^n </math>'''
  
does not have no solution in non-zero integers in '''<math>a</math>''', '''<math>b</math>''', and '''<math>c</math>'''.
+
when '''<math>n</math>''' > 2, it does not have no solution in non-zero integers in '''<math>a</math>''', '''<math>b</math>''', and '''<math>c</math>'''.
  
 
While I have not had any actual chance to use this theorem, it is still very fascinating that
 
While I have not had any actual chance to use this theorem, it is still very fascinating that
 
a theorem can look so simple yet its proof can remain so elusive for centuries.
 
a theorem can look so simple yet its proof can remain so elusive for centuries.

Revision as of 11:59, 7 September 2008

My favorite mathematical theorem is Fermat's Last Theorem:

If an equation is in the form of

$ a^n + b^n = c^n $

when $ n $ > 2, it does not have no solution in non-zero integers in $ a $, $ b $, and $ c $.

While I have not had any actual chance to use this theorem, it is still very fascinating that a theorem can look so simple yet its proof can remain so elusive for centuries.

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

Buyue Zhang