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Continued fractions have been a fascinating and useful tool in mathematics for well over three hundred years. Axiom implements continued fractions for fractions of any Euclidean domain. In practice, this usually means rational numbers. In this section we demonstrate some of the operations available for manipulating both finite and infinite continued fractions. It may be helpful if you review StreamXmpPage to remind yourself of some of the operations with streams.
The ContinuedFraction domain is a field and therefore you can add, subtract, multiply and divide the fractions.
The continuedFractioncontinuedFractionContinuedFraction operation converts its fractional argument to a continued fraction.
This display is a compact form of the bulkier
You can write any rational number in a similar form. The fraction will be finite and you can always take the ``numerators'' to be 1. That is, any rational number can be written as a simple, finite continued fraction of the form
The are called partial quotients and the operation partialQuotientspartialQuotientsContinuedFraction creates a stream of them.
By considering more and more of the fraction, you get the convergentsconvergentsContinuedFraction. For example, the first convergent is , the second is and so on.
Since this is a finite continued fraction, the last convergent is the original rational number, in reduced form. The result of approximantsapproximantsContinuedFraction is always an infinite stream, though it may just repeat the ``last'' value.
Inverting c only changes the partial quotients of its fraction by inserting a 0 at the beginning of the list.
Do this to recover the original continued fraction from this list of partial quotients. The three-argument form of the continuedFractioncontinuedFractionContinuedFraction operation takes an element which is the whole part of the fraction, a stream of elements which are the numerators of the fraction, and a stream of elements which are the denominators of the fraction.
The streams need not be finite for continuedFractioncontinuedFractionContinuedFraction. Can you guess which irrational number has the following continued fraction? See the end of this section for the answer.
In 1737 Euler discovered the infinite continued fraction expansion
We use this expansion to compute rational and floating point approximations of e. For this and other interesting expansions, see C. D. Olds, Continued Fractions, New Mathematical Library, (New York: Random House, 1963), pp. 134--139.
By looking at the above expansion, we see that the whole part is 0 and the numerators are all equal to 1. This constructs the stream of denominators.
Therefore this is the continued fraction expansion for .
These are the rational number convergents.
You can get rational convergents for e by multiplying by 2 and adding 1.
You can also compute the floating point approximations to these convergents.
Compare this to the value of e computed by the expexpFloat operation in Float.
In about 1658, Lord Brouncker established the following expansion for ,
Let's use this expansion to compute rational and floating point approximations for .
As you can see, the values are converging to , but not very quickly.
You need not restrict yourself to continued fractions of integers. Here is an expansion for a quotient of Gaussian integers.
This is an expansion for a quotient of polynomials in one variable with rational number coefficients.
To conclude this section, we give you evidence that
is the expansion of .