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Difference between revisions of "1983 USAMO Problems/Problem 5"

(I'll leave my progress up for anyone who wants to finish the problem. I have a solution sketch in mind, but I need sleep now.)
 
(Solution)
 
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== Solution ==
 
== Solution ==
This problem references the [[Farey Sequence]] of order <math>n</math>. We wish to show that no open interval of length <math>1/n</math> contains more than <math>(n+1)/2</math> consecutive terms of the <math>n</math>th Farey sequence.
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Let <math>I</math> be an open interval of length <math>1/n</math> and <math>F_n</math> the set of fractions <math>p/q\in I</math> with <math>p,q\in\mathbb{Z}</math>, <math>\gcd(p,q)=1</math> and <math>1\leq q\leq n</math>.  
  
'''Lemma:''' If <math>a/b</math> and <math>c/d</math> are consecutive terms of the <math>n</math>th Farey sequence and <math>c/d>a/b</math>, then <math>(c/d)-(a/b)=1/bd</math>.
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Assume that <math>\frac{p}{q}\in F_n</math>. If <math>k\in\mathbb{Z}</math> is such that <math>1\leq kq\leq n</math>, and <math>p'\in\mathbb{Z}</math> is such that <math>\gcd(p',kq)=1</math>, then
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<cmath>\left|\frac{p}{q}-\frac{p'}{kq}\right|\geq\frac{1}{kq}\geq \frac{1}{n}</cmath>
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Therefore <math>\frac{p'}{kq}\notin I\supset F_n</math>. This means that <math>\frac{p}{q}</math> is the only fraction in <math>F_n</math> with denominator <math>q</math> or multiple of <math>q</math>.
  
'''Proof:''' It suffices to show that, for any reduced fraction <math>a/b</math> with <math>1\leq b\leq n</math>, we can find an ordered pair of integers <math>(c,d)</math> with <math>1\leq d\leq n</math> such that <math>bc-ad=1</math>. Then <math>(c/d)-(a/b)=1/bd</math>.
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Therefore, from each of the pairs in <math>P=\left\{(k,2k):\ 1\leq k\leq \left\lfloor\frac{n+1}{2}\right\rfloor\right\}</math> at most one element from each can be a denominator of a fraction in <math>F_n</math>.
  
{{solution}}
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Hence <math>|F_n|\leq |P|\leq\frac{n+1}{2}</math>
  
 
== See Also ==
 
== See Also ==

Latest revision as of 11:23, 7 December 2022

Problem

Consider an open interval of length $1/n$ on the real number line, where $n$ is a positive integer. Prove that the number of irreducible fractions $p/q$, with $1\le q\le n$, contained in the given interval is at most $(n+1)/2$.

Solution

Let $I$ be an open interval of length $1/n$ and $F_n$ the set of fractions $p/q\in I$ with $p,q\in\mathbb{Z}$, $\gcd(p,q)=1$ and $1\leq q\leq n$.

Assume that $\frac{p}{q}\in F_n$. If $k\in\mathbb{Z}$ is such that $1\leq kq\leq n$, and $p'\in\mathbb{Z}$ is such that $\gcd(p',kq)=1$, then \[\left|\frac{p}{q}-\frac{p'}{kq}\right|\geq\frac{1}{kq}\geq \frac{1}{n}\] Therefore $\frac{p'}{kq}\notin I\supset F_n$. This means that $\frac{p}{q}$ is the only fraction in $F_n$ with denominator $q$ or multiple of $q$.

Therefore, from each of the pairs in $P=\left\{(k,2k):\ 1\leq k\leq \left\lfloor\frac{n+1}{2}\right\rfloor\right\}$ at most one element from each can be a denominator of a fraction in $F_n$.

Hence $|F_n|\leq |P|\leq\frac{n+1}{2}$

See Also

1983 USAMO (ProblemsResources)
Preceded by
Problem 4 		Followed by
Last Question
1 2 3 4 5
All USAMO Problems and Solutions

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