Difference between revisions of "2007 USAMO Problems/Problem 1"
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Let <math>k</math> be the smallest <math>k</math> such that <math>b_k < k</math>. Then <math>b_k = m < k</math>, and <math>S_k = km</math>. To make <math>b_{k+1}</math> an integer, <math>S_{k+1} = S_k + a_{k+1}</math> must be divisible by <math>k+1</math>. Thus, because <math>km + m</math> is divisible by <math>k+1</math>, <math>a_{k+1} \equiv m \pmod{k+1}</math>, and, because <math>0 \le a_{k+1} < k</math>, <math>a_{k+1} = m</math>. Then <math>b_{k+1} = \frac{(k+1)m}{k+1} = m</math> as well. Repeating the same process using <math>k+1</math> instead of <math>k</math> gives <math>a_{k+2} = m</math>, and an easy induction can prove that for all <math>N > k+1</math>, <math>a_N = m</math>. Thus, <math>a_k</math> becomes a constant function for arbitrarily large values of <math>k</math>. | Let <math>k</math> be the smallest <math>k</math> such that <math>b_k < k</math>. Then <math>b_k = m < k</math>, and <math>S_k = km</math>. To make <math>b_{k+1}</math> an integer, <math>S_{k+1} = S_k + a_{k+1}</math> must be divisible by <math>k+1</math>. Thus, because <math>km + m</math> is divisible by <math>k+1</math>, <math>a_{k+1} \equiv m \pmod{k+1}</math>, and, because <math>0 \le a_{k+1} < k</math>, <math>a_{k+1} = m</math>. Then <math>b_{k+1} = \frac{(k+1)m}{k+1} = m</math> as well. Repeating the same process using <math>k+1</math> instead of <math>k</math> gives <math>a_{k+2} = m</math>, and an easy induction can prove that for all <math>N > k+1</math>, <math>a_N = m</math>. Thus, <math>a_k</math> becomes a constant function for arbitrarily large values of <math>k</math>. |
Revision as of 21:00, 12 August 2014
Contents
Problem
(Sam Vandervelde) Let be a positive integer. Define a sequence by setting and, for each , letting be the unique integer in the range for which is divisible by . For instance, when the obtained sequence is . Prove that for any the sequence eventually becomes constant.
Solutions
Solution 1
Let and . Thus, because , , and by definition, . Thus, . Also, both and are integers, so . As the 's form a non-increasing sequence of positive integers, they must eventually become constant.
Therefore, for some sufficiently large value of . Then , so eventually the sequence becomes constant.
Solution 2
Let . Since , we have that Since for some integer , we can keep adding to satisfy the conditions, provided that . This is true since , so the sequence must eventually become constant.
Solution 3
Define , and . By the problem hypothesis, is an integer valued sequence.
Lemma: There exists a such that .
Proof: Choose any such that . Then as desired.
End Lemma
Let be the smallest such that . Then , and . To make an integer, must be divisible by . Thus, because is divisible by , , and, because , . Then as well. Repeating the same process using instead of gives , and an easy induction can prove that for all , . Thus, becomes a constant function for arbitrarily large values of .
Solution 4
For , let We claim that for some we have . To this end, consider the sequence which computes the differences between and , i.e., whose -th term is . Note that the first term of this sequence is positive (it is equal to ) and that its terms are strictly decreasing since Further, a negative term cannot immediately follow a positive term. Suppose otherwise, namely that and . Since and are divisible by and , respectively, we can tighten the above inequalities to and . But this would imply that , a contradiction. We conclude that the sequence of differences must eventually include a term equal to zero.
Let be a positive integer such that . We claim that This follows from the fact that the sequence is uniquely determined and choosing , for , satisfies the range condition and yields
Alternate solutions are always welcome. If you have a different, elegant solution to this problem, please add it to this page.
See also
- <url>viewtopic.php?t=145842 Discussion on AoPS/MathLinks</url>
2007 USAMO (Problems • Resources) | ||
Preceded by First Question |
Followed by Problem 2 | |
1 • 2 • 3 • 4 • 5 • 6 | ||
All USAMO Problems and Solutions |
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