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Difference between revisions of "Farey sequence"

(New page: A Farey sequence of order <math>n</math> is the sequence of all completely reduced fractions between 0 and 1 where, when in lowest terms, each fraction has a denominator less than or equal...)
 
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A Farey sequence of order <math>n</math> is the sequence of all completely reduced fractions between 0 and 1 where, when in lowest terms, each fraction has a denominator less than or equal to <math>n</math>. Each fraction starts with 0, denoted by the fraction 0/1, and ends in 1, denoted by the fraction 1/1.
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A '''Farey sequence''' of order <math>n</math> is the sequence of all completely reduced fractions between 0 and 1 where, when in lowest terms, each fraction has a denominator less than or equal to <math>n</math>. Each fraction starts with 0, denoted by the fraction 0/1, and ends in 1, denoted by the fraction 1/1.
  
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==Examples==
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Farey sequences of orders 1-4 are:
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<math>F_1=\{0/1, 1/1\}</math>
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<math>F_2=\{0/1, 1/2, 1/1\}</math>
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<math>F_3=\{0/1, 1/3, 1/2, 2/3, 1/1\}</math>
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<math>F_4=\{0/1, 1/4, 1/3, 1/2, 2/3, 3/4, 1/1\}</math>
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Where <math>F_n</math> denotes a farey sequence of order <math>n</math>.
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==Properties==
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'''Sequence length'''
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A Farey sequence of any order contains all terms  in a Farey sequence of lower order. More specifically, <math>F_n</math> contains all the terms in <math>F_{n-1}</math>. Also, <math>F_n</math> contains an extra term for every number less than <math>n</math> relatively prime to <math>n</math>. Thus, we can write
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<math>#(F_n)=#(F_{n-1})+\phi{n}</math>
 
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Revision as of 12:34, 31 August 2008

A Farey sequence of order $n$ is the sequence of all completely reduced fractions between 0 and 1 where, when in lowest terms, each fraction has a denominator less than or equal to $n$. Each fraction starts with 0, denoted by the fraction 0/1, and ends in 1, denoted by the fraction 1/1.

Examples

Farey sequences of orders 1-4 are:

$F_1=\{0/1, 1/1\}$

$F_2=\{0/1, 1/2, 1/1\}$

$F_3=\{0/1, 1/3, 1/2, 2/3, 1/1\}$

$F_4=\{0/1, 1/4, 1/3, 1/2, 2/3, 3/4, 1/1\}$

Where $F_n$ denotes a farey sequence of order $n$.

Properties

Sequence length A Farey sequence of any order contains all terms in a Farey sequence of lower order. More specifically, $F_n$ contains all the terms in $F_{n-1}$. Also, $F_n$ contains an extra term for every number less than $n$ relatively prime to $n$. Thus, we can write

$#(F_n)=#(F_{n-1})+\phi{n}$ (Error compiling LaTeX. Unknown error_msg) This article is a stub. Help us out by expanding it.

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