2007 USAMO Problems/Problem 1
Problem
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.
Solution 1
Suppose we create a parallel integer sequence such that for every , we have that . Consider what happens when . For , we have that . is a permissible value of since : if we substitute for , we get that . is the unique value for . We can repeat this argument for . As we substituted the s for the s, the s also become constant.
Now we must show that eventually . Suppose that always . By definition, , so . We also have that each so that . So . But is constant while is increasing, so eventually we will have a contradiction and . Therefore, the sequence of s will become constant.
Solution 2
Define . If we have that where is an integer such that , then we can take , and we are done since .
We always know that is a multiple of by definition of the sequence. So we know an integer ,, exists. But we also need that inequality for to be able to add as the next term. We need that, for some ,
However, we also know that .
So we note that for sufficiently large , we have that , hence . Then we are done, since we can take that suitable and keep adding it.
Solution by AoPS user Altheman
2007 USAMO (Problems • Resources) | ||
Preceded by First question |
Followed by Problem 2 | |
1 • 2 • 3 • 4 • 5 • 6 | ||
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