Difference between revisions of "1985 IMO Problems/Problem 2"
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== Problem == | == Problem == | ||
− | Let <math> | + | Let <math>n</math> and <math>k</math> be given relatively prime natural numbers, <math>n < k</math>. Each number in the set <math>M = \{ 1,2, \ldots , n-1 \} </math> is colored either blue or white. It is given that |
− | (i) for each <math> i \in M </math>, both <math> | + | (i) for each <math> i \in M </math>, both <math>i </math> and <math>n-i </math> have the same color; |
− | (ii) for each <math> i \in M, i \neq k </math>, both <math> | + | (ii) for each <math> i \in M, i \neq k </math>, both <math>i </math> and <math>|i-j| </math> have the same color. |
− | Prove that all number in <math> | + | Prove that all number in <math>M</math> have the same color. |
== Solution == | == Solution == | ||
− | We may consider the elements of <math> | + | We may consider the elements of <math>M </math> as residues mod <math>n</math>. To these we may add the residue 0, since (i) may only imply that 0 has the same color as itself, and (ii) may only imply that 0 has the same color as <math>k</math>, which put no restrictions on the colors of the other residues. |
− | We note that (i) is equivalent to saying that <math> | + | We note that (i) is equivalent to saying that <math>i</math> has the same color as <math>-i</math>, and given this, (ii) implies that <math>i </math> and <math>(-i + k) </math> have the same color. But this means that <math>i, -i </math>, and <math>i+k </math> have the same color, which is to say that all residues of the form <math> i + mk \; (m \in \mathbb{N}_0)</math> have the same color. But these are all the residues mod <math>n</math>, since <math>k </math> and <math>n </math> are relatively prime. Q.E.D. |
{{alternate solutions}} | {{alternate solutions}} | ||
− | + | {{IMO box|year=1985|num-b=1|num-a=3}} | |
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[[Category:Olympiad Combinatorics Problems]] | [[Category:Olympiad Combinatorics Problems]] |
Revision as of 19:55, 25 October 2007
Problem
Let and be given relatively prime natural numbers, . Each number in the set is colored either blue or white. It is given that
(i) for each , both and have the same color;
(ii) for each , both and have the same color.
Prove that all number in have the same color.
Solution
We may consider the elements of as residues mod . To these we may add the residue 0, since (i) may only imply that 0 has the same color as itself, and (ii) may only imply that 0 has the same color as , which put no restrictions on the colors of the other residues.
We note that (i) is equivalent to saying that has the same color as , and given this, (ii) implies that and have the same color. But this means that , and have the same color, which is to say that all residues of the form have the same color. But these are all the residues mod , since and are relatively prime. Q.E.D.
Alternate solutions are always welcome. If you have a different, elegant solution to this problem, please add it to this page.
1985 IMO (Problems) • Resources | ||
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1 • 2 • 3 • 4 • 5 • 6 | Followed by Problem 3 |
All IMO Problems and Solutions |