Difference between revisions of "2011 USAJMO Problems/Problem 4"
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A ''word'' is defined as any finite string of letters. A word is a ''palindrome'' if it reads the same backwards as forwards. Let a sequence of words <math>W_0</math>, <math>W_1</math>, <math>W_2</math>, <math>\dots</math> be defined as follows: <math>W_0 = a</math>, <math>W_1 = b</math>, and for <math>n \ge 2</math>, <math>W_n</math> is the word formed by writing <math>W_{n - 2}</math> followed by <math>W_{n - 1}</math>. Prove that for any <math>n \ge 1</math>, the word formed by writing <math>W_1</math>, <math>W_2</math>, <math>\dots</math>, <math>W_n</math> in succession is a palindrome. | A ''word'' is defined as any finite string of letters. A word is a ''palindrome'' if it reads the same backwards as forwards. Let a sequence of words <math>W_0</math>, <math>W_1</math>, <math>W_2</math>, <math>\dots</math> be defined as follows: <math>W_0 = a</math>, <math>W_1 = b</math>, and for <math>n \ge 2</math>, <math>W_n</math> is the word formed by writing <math>W_{n - 2}</math> followed by <math>W_{n - 1}</math>. Prove that for any <math>n \ge 1</math>, the word formed by writing <math>W_1</math>, <math>W_2</math>, <math>\dots</math>, <math>W_n</math> in succession is a palindrome. | ||
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Revision as of 16:20, 2 May 2011
A word is defined as any finite string of letters. A word is a palindrome if it reads the same backwards as forwards. Let a sequence of words 
, 
, 
, 
be defined as follows: 
, 
, and for 
, 
is the word formed by writing 
followed by 
. Prove that for any 
, the word formed by writing , , , in succession is a palindrome.
