3 Properties

3.1 Sequence length

The Farey sequence of order n contains all of the members of the Farey sequences of lower orders. In particular F_n contains all of the members of F_n−1, and also contains an additional fraction for each number that is less than n and coprime to n. Thus F₆ consists of F₅ together with the fractions ¹⁄₆ and ⁵⁄₆. The middle term of a Farey sequence is always ¹⁄₂, for _n > 1.

From this, we can relate the lengths of F_n and F_n−1 using Euler's totient function φ(n) :-

Using the fact that |F₁| = 2, we can derive an expression for the length of F_n :-

The asymptotic behaviour of |F_n| is :-

3.2 Farey neighbours

Fractions which are neighbouring terms in a Farey sequence have the following properties.

If ^a⁄_b and ^c⁄_d are neighbours in a Farey sequence, with ^a⁄_b < ^c⁄_d, then their difference ^c⁄_d − ^a⁄_b is equal to ¹⁄_bd. Since

,

this is equivalent to saying that

bc − ad = 1.

Thus ¹⁄₃ and ²⁄₅ are neighbours in F₅, and their difference is ¹⁄₁₅.

The converse is also true. If

bc − ad = 1

for positive integers a,b,c and d with a < b and c < d then ^a⁄_b and ^c⁄_d will be neighbours in the Farey sequence of order min(b,d).

If ^p⁄_q has neighbours ^a⁄_b and ^c⁄_d in some Farey sequence, with

^a⁄_b < ^p⁄_q < ^c⁄_d

then ^p⁄_q is the mediant of ^a⁄_b and ^c⁄_d — in other words,

.

And if ^a⁄_b and ^c⁄_d are neighbours in a Farey sequence then the first term that appears between them as the order of the Farey sequence is increased is

,

which first appears in the Farey sequence of order b+d.

Thus the first term to appear between ¹⁄₃ and ²⁄₅ is ³⁄₈, which appears in F₈.

The Stern-Brocot tree is a data structure showing how the sequence is built up from 0 (= ⁰⁄₁) and 1 (= ¹⁄₁), by taking successive mediants.

Fractions that appear as neighbours in a Farey sequence have closely related continued fraction expansions. Every fraction has two continued fraction expansions - in one the final term is 1; in the other the final term is greater than 1. If ^p⁄_q, which first appears in Farey sequence F_q, has continued fraction expansions

then the nearest neighbour of ^p⁄_q in F_q (which will be its neighbour with the larger denominator) has a continued fraction expansion

and its other neighbour has a continued fraction expansion

Thus ³⁄₈ has the two continued fraction expansions [0;2,1,1,1] and [0;2,1,2], and its neighbours in F₈ are ²⁄₅, which can be expanded as [0;2,1,1]; and ¹⁄₃, which can be expanded as [0;2,1].

3.3 Ford circles

There is an interesting connection between Farey sequence and Ford circleIn mathematics a Ford circle is a circle with centre at p/q 1/2''q''2) and radius 1/(2''q''2), where p/q is a fraction in its lowest terms (i. p and q are coprime integers). History Ford circles are named after American mathematician Lester R. who describs.

For every fraction p/q (in its lowest terms) there is a Ford circle C[p/q], which is the circle with radius 1/2q² and centre at (p/q,1/2q²). Two Ford circles for different fractions are either disjoint or they are tangentIn mathematics, the word tangent has two distinct, but etymologically related meanings: one in geometry, and one in trigonometry. Geometry In plane geometry, a straight line is tangent to a curve, at some point, if both line and curve pass through the poi to one another - two Ford circles never intersect. If 0<p/q<1 then the Ford circles that are tangent to C[p/q] are precisely the Ford circles for fractions that are neighbours of p/q in some Farey sequence.

Thus C[2/5] is tangent to C[1/2], C[1/3], C[3/7], C[3/8] etc.

4 References

• Beiler, Albert H. (1964) Recreations in the Theory of Numbers (Second Edition). Dover. BooksEnthsiast.com

• Hardy, G.H. & Wright, E.M. (1979) An Introduction to the Theory of Numbers (Fifth Edition). Oxford University Press. BooksEnthsiast.com

5 External links

• Farey series
• Stern-Brocot Tree
• MathWorld page on Stern-Brocot trees

Fractions Number theoryTraditionally, number theory is that branch of pure mathematics concerned with the properties of integers and contains many open problems that are easily understood even by non-mathematicians. More generally, the field has come to be concerned with a wide

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