# Difference between revisions of "Integers too big for floats"

Although floating point types can represent a large range of magnitudes, you will sometimes have to cope with integers that are larger than what is representable by Double.

## Dividing large integers to floats

Consider

factorial :: (Enum a, Num a) => a -> a
factorial k = product [1..k]


You will find that factorial 777 is not representable by Double. However it is representable by an Integer. You will find that factorial 777 / factorial 778 is representable as Double but not as Integer, but the temporary results are representable by Integers and not by Doubles. Is there a variant of division which accepts big integers and emits floating point numbers?

Actually you can represent the fraction factorial 777 / factorial 778 as Rational and convert that to a floating point number:

fromRational (factorial 777 % factorial 778)


Fortunately fromRational is clever enough to handle big numerators and denominators.

But there is an efficiency problem: Before fromRational can perform the imprecise division, the % operator will cancel the fraction precisely. You may use the Rational constructor :% instead. However that's a hack, since it is not sure that other operations work well on non-cancelled fractions. You had to import GHC.Real.

But since we talk about efficiency let's go on to the next paragraph, where we talk about real performance.

## Avoid big integers at all

The example seems to be stupid, because you may think that nobody divides factorial 777 by factorial 778 without noticing, that this can be greatly simplified. So let's take the original task which led to the problem above. The problem is to compute the reciprocal of $\pi$ using Chudnovsky's algorithm:

$\frac{1}{\pi} = 12 \sum^\infty_{k=0} \frac{(-1)^k (6k)! (13591409 + 545140134k)}{(3k)!(k!)^3 640320^{3k + 3/2}}\ .$

-- An exact division
-- Courtesy of Max Rabkin
(/.) :: (Real a, Fractional b) => a -> a -> b
x /. y = fromRational $toRational x / toRational y -- Compute n! fac :: Integer -> Integer fac n = product [1..n] -- Compute n! / m! efficiently facDiv :: Integer -> Integer -> Integer facDiv n m | n > m = product [n, n - 1 .. m] | n == m = 1 | otherwise = facDiv m n -- Compute pi using the specified number of iterations pi' :: Integer -> Double pi' steps = 1.0 / (12.0 * s / f) where s = sum [chudnovsky n | n <- [0..steps]] f = fromIntegral c ** (3.0 / 2.0) -- Common factor in the sum -- k-th term of the Chudnovsky serie chudnovsky :: Integer -> Double chudnovsky k | even k = num /. den | otherwise = -num /. den where num = (facDiv (6 * k) (3 * k)) * (a + b * k) den = (fac k) ^ 3 * (c ^ (3 * k)) a = 13591409 b = 545140134 c = 640320 main = print$ pi' 1000


To be honest, this program doesn't really need much more optimization than limiting the number of terms to 2, since the subsequent terms are much below the precision of Double. For these two terms it is not a problem to convert the Integers to Doubles.

But assume these conversions are a problem. We will show a way to avoid them. The trick is to compute the terms incrementally. We do not need to compute the factorials for each term, instead we compute each term using the term before.

start :: Floating a => a
start =
12 / sqrt 640320 ^ 3

arithmeticSeq :: Num a => [a]
arithmeticSeq =
iterate (545140134+) 13591409

factors :: Floating a => [a]
factors =
-- note canceling of product[(6*k+1)..6*(k+1)] / product[(3*k+1)..3*(k+1)]
map (\k -> -(6*k+1)*(6*k+3)*(6*k+5)/(320160*(k+1))^3) $iterate (1+) 0 summands :: Floating a => [a] summands = zipWith (*) arithmeticSeq$ scanl (*) start factors

recipPi :: Floating a => a
recipPi =
sum \$ take 2 summands