# Project Euler: A (much) better way to solve problem #5?

You probably know about project Euler question 5: get the smallest number divisble by all numbers 1 to 20.

The logic I applied was "start with the first number greater than the largest of the list(20) and also divisible by it which is 40" and stepsize of 20 (largest number)

I did this using list comprehension but it's pretty lame.

``````pe5 = head    [x|x<-[40,60..],x`mod`3==0,x`mod`4==0,x`mod`6==0,x`mod`7==0,x`mod`8==0,x`mod`9==0,x`mod`11==0,x`mod`12==0,x`mod`13==0,x`mod`14==0,x`mod`15==0,x`mod`16==0,x`mod`17==0,x`mod`18==0,x`mod`19==0]
``````

Can we do this better perhaps using zipWith and filter maybe?

Just to clarify, this is not a homework assignment. I'm doing this to wrap my brain around Haskell. (So far I'm losing!)

:Thanx all

I think this is a saner way (there may be thousand more better ways but this would suffice) to do it

``````listlcm'::(Integral a)=> [a] -> a
listlcm' [x] = x
listlcm' (x:xs) = lcm x (listlcm' xs)
``````
-
Without algorithmic changes, just a shorter version `head [x | x <- [40,60..], all (\y -> x `rem` y == 0) [1..20]]` –  is7s Aug 6 '11 at 16:31
If you want a much better algorithm you can think in terms of the `lcm` –  is7s Aug 6 '11 at 16:32
@is7s i didn't ask for better algorithm but thanks for the clue and that all is as in "as" handler? –  fedvasu Aug 6 '11 at 16:35
Btw, the title for this question is kinda non-descriptive (the "this" part could be clarified a bit more) –  hvr Aug 6 '11 at 16:53
@hvr thanx, i will be more precise from now on –  fedvasu Aug 6 '11 at 17:00

Yes, you can do much better. For starters, rewrite to something like

``````head [x | x<-[40,60..], all (\y -> x`mod`y == 0) [2..20] ]
``````

But what you really need here is not slicker Haskell, but a smarter algorithm. Hint: use the Fundamental Theorem of Arithmetic. Your Haskell solution would then start with the standard sieve-of-Eratosthenes example.

-
Before seeing this, I had written `all (==0) \$ zipWith mod (repeat x) [3..20]`, but I think yours is more concise. –  eternalmatt Aug 8 '11 at 15:53

In this particular case, you can get it for free using `foldl` and `lcm`:

``````euler = foldl lcm 2 [3..20]
``````

This gives me 232792560 instantaneously.

-
Adkinson "clever" –  fedvasu Aug 6 '11 at 17:19
foldl' is probably better (at least, for large inputs :)) –  alternative Aug 7 '11 at 16:42
Or even shorter: `foldl1 lcm [2..20]` –  Landei Aug 8 '11 at 6:44

Since the spoiler has already been posted, I thought I'd explain how it works.

The smallest number divisible by two numbers is also known as the least common multiple of those numbers. There is a function for calculating this in the Prelude.

``````λ> lcm 10 12
60
``````

Now, to extend this to multiple numbers we exploit the following property

lcm(a1, ... an) = lcm(lcm(a1, ... an-1), an)

In Haskell, f(f(... f(a1, a2), ...), an) can be written `foldl1 f [a1, a2, ... an]`, so we can solve the problem with this simple one-liner:

``````λ> foldl1 lcm [1..20]
232792560
``````

This finds the solution in a fraction of a second.

-
i know this is a bit too easy .. i know about the functionality of foldl (succesive function composition towards left of the list) i think my listlcm is easier (for a newbie) read my edit! –  fedvasu Aug 6 '11 at 18:03
@Vasu: Perhaps for a beginner, but it's usually considered an anti-pattern to write your own recursion when one of the standard higher-order functions would do the job. Although there are cases where this can make code less readable, this is not the case here. –  hammar Aug 6 '11 at 18:08
yup.. totally agreed! –  fedvasu Aug 6 '11 at 18:12
``````head [x | x <- [20,40..], length( filter ( \y -> x `mod` y /= 0) [1..20]) == 0]