I'm required to create a function of the form factors below and I believe I've implemented this properly

``````   factors :: Int -> [Int]
factors n = [x | x <- [1..(div n 2) ++ n], mod n x == 0]
``````

Now using the function or otherwise I need to define the list of numbers whos only prime factors are 2 3 and 5, the hamming numbers. (hamming = 1,2,3,4,5,6,8,9,10,12,15) (2^i * 3^j *5 ^k).

I'm wondering how to create the filter list of (2^i * 3^j *5 ^k), then I can just have that in my comprehension.

``````   hamming :: [int]
hamming = [n |n <- [1..]  ,where n is a member of helper]

helper :: [Int]
helper = [2^i * 3^j * 5^k |i<-[0..], j<-[0..], k<-[0..]]
``````

my syntax needs work.

-

Now using the function or otherwise

I recommend doing it otherwise.

One simple way is to implement a function getting the prime factorisation of a number, and then you can have

``````isHamming :: Integer -> Bool
isHamming n = all (< 7) \$ primeFactors n
``````

which would then be used to filter the list of all positive integers

``````hammingNumbers :: [Integer]
hammingNumbers = filter isHamming [1 .. ]
``````

Another way, more efficient is to avoid the divisions and the filtering, and create a list of only the hamming numbers.

One simple way is to use the fact that a number `n` is a Hamming number if and only if

• `n == 1`, or
• `n == 2*k`, where `k` is a Hamming number, or
• `n == 3*k`, where `k` is a Hamming number, or
• `n == 5*k`, where `k` is a Hamming number.

Then you can create the list of all Hamming number as

``````hammingNumbers :: [Integer]
hammingNumbers = 1 : union (map (2*) hammingNumbers)
(union (map (3*) hammingNumbers) (map (5*) hammingNumbers))
``````

where `union` merges two sorted lists together removing duplicates.

That's already rather efficient, but it can be improved by avoiding to produce duplicates from the beginning.

-
Actually, this `hammingNumbers` is equivalent to `[2^i*3^j*5^k | k<-[0..], j<-[0..], i<-[0..]]`. Theoretically, it contains all hamming numbers, but in practice it is just `[1,2,4,8,16,32,...]`. –  nymk Mar 23 '13 at 18:55
So how can we get it to creat all hamming numbers? –  john stamos Mar 23 '13 at 20:47
@johnstamos Give it infinite time ;-) You can get them as `[2^i * 3^j * 5^k | n <- [0 .. ], k <- [0 .. n], let m = n-k, j <- [0 .. m], let i = m-j]`. But if you want them listed in increasing order, the merging strategy I proposed is the best way I know of. –  Daniel Fischer Mar 23 '13 at 20:52
Great Thanks daniel. I have a couple questions about your code though. in isHamming what is "all (< 7) \$ primeFactors n" doing? I haven't see the all function (i'm assuming <7 is a part of it), the \$, and what is the function prime factors? (Believe I only have factors defined so far) And in hammingNumbers I haven't seen the union function, or * function yet. –  john stamos Mar 23 '13 at 21:03
`all` is a function that takes a predicate and a list and checks whether all list elements satisfy the predicate, `all :: (a -> Bool) -> [a] -> Bool`; For prime factors, `(< 7)` checks that they are `2, 3` or `5`. `(*)` is simply multiplication, and `(2*)` is an operator section, so `(2*) = \x -> 2*x`. The functions `primeFactors` or `union` remain to be written (or copied from elsewhere). I suppose it is an exercise, and for you to learn from it, you have to do at least part yourself. If it's not an exercise, just go and take the code from the other question. –  Daniel Fischer Mar 23 '13 at 21:17

Note that `hamming` set is

``````{2^i*3^j*5^k | (i, j, k) ∈ T}
``````

where

``````T = {(i, j, k) | i ∈ [0..], j ∈ [0..], k ∈ [0..]}
``````

But we can't use [(i, j, k) | i <- [0..], j <- [0..], k <- [0..]]. Because this list starts with an infinitely many triples like `(0, 0, k)`.
Given any `(i,j,k)`, `elem (i,j,k) T` should return True in finite time.
Sounds familiar? You can recall the question you asked before: haskell infinite list of incrementing pairs

In that question, hammar gave the answer for pairs. We can generalize it to triples.

``````triples = [(i,j,t-i-j)| t <- [0..], i <- [0..t], j <- [0..t-i]]
hamming = [2^i*3^j*5^k | (i,j,k) <- triples]
``````
-