# Project Euler Problem 2 in F#

I'm a bit stuck on the last step of getting the solution to problem 2 on Project Euler. This is the source I've gotten so far.

``````#light
module pe2 (* Project Euler Problem 2 solution *)

open System

let Phi = 1.6180339887;;

let invPhi = 1.0/Phi;;

let rootOfFive = 2.236067977;;

let maxFib = 4000000.0;

let Fib n =
System.Math.Round((Phi**n - invPhi**n)/rootOfFive);;

let FibIndices = Seq.unfold(fun i -> Some(i, i+3.0)) 3.0;;

let FibNos = FibIndices |> Seq.map(fun index -> Fib(index));;

let setAllowedFibNos = FibNos |> Seq.filter(fun fn -> (fn <= maxFib));;

//   let answer = setAllowedFibNos |> Seq.fold (+) 0.0;
``````

When I uncomment the last line, the process never seems to finish. So I was hoping that someone could give me a gentle nudge in the right direction. I did look at setAllowedFibNos and it looks right but it's also an infinite sequence so I only see the first three terms.

Also, could someone point me to the right way to chain the various sequences together? I tried something like this:

``````let answer = Seq.unfold(fun i-> Some(i, i + 3.0)) 3.0
|> Seq.map (fun index -> Fib(index))
|> Seq.filter(fun fn -> (fn <= maxFib))
|> Seq.fold (+) 0.0;;
``````

But that didn't work. As you can probably guess I'm just learning F# so please go gentle and if this sort of question has been asked and answered before, please post a link to the answer and I'll withdraw this one.

-

'setAllowedFibNos' is indeed an infinite seq computation; 'fold' needs the whole sequence, so the 'filter' will run forever looking for another number <= maxFib.

Take a look at takeWhile:

http://research.microsoft.com/en-us/um/cambridge/projects/fsharp/manual/FSharp.Core/Microsoft.FSharp.Collections.Seq.html

I think it is what you want instead of filter.

Also note that you can use 'sqrt 5.0'.

-
Also, you can use Seq.sum instead of the fold and your anonymous function around Fib is redundant (Seq.map Fib is sufficient). –  dahlbyk Oct 14 '09 at 0:17
Thanks Brian. I was curious about one thing--doesn't Seq.filter make the sequence non-infinite? –  Onorio Catenacci Oct 14 '09 at 0:23
No; I can filter just the evens from 1,2,3,4,... and the result is still infinite 2,4,... –  Brian Oct 14 '09 at 0:50
@dahlbyk--thanks for the pointers. –  Onorio Catenacci Oct 14 '09 at 10:33
``````let rec Fib(n) =
if (n < 2) then
1
else
Fib(n-2) + Fib(n-1)

Seq.initInfinite Fib
|> Seq.takeWhile (fun a -> a <= 4000000)
|> Seq.filter (fun a -> (a % 2) = 0)
|> Seq.fold (+) 0
``````
-

I'm still trying to get used to the Seq approach. But, here is my solution without it.

``````
#light
let rec fib n =
match n with
|0|1 -> n
|_ -> fib(n-1) + fib(n-2)

let maxFib = 4000000
let phi = (1.0 + sqrt(5.0)) / 2.0
let upperBound = 1 + int( log10((float(maxFib) - 0.5) * sqrt(5.0)) / log10(phi))

[1..upperBound] |> List.filter (fun x-> x%3=0) |> List.map fib |> List.filter (fun x -> x%2 = 0) |> List.filter (fun x -> x List.sum |> printfn "%d"
```
```
-

My solution is:

``````Seq.unfold (fun state ->
if (fst state + snd state > 4000000) then None
else Some(fst state + snd state, (snd state, fst state + snd state))) (0,1)
|> Seq.filter (fun x -> x % 2 = 0)
|> Seq.sum;;
``````
-
it makes sense to compare your solution with this snippet‌​. Even at this toy problem size it follows more FP-idiomatic approach of building generic functions and then getting concrete results by use of combinators. Following this "Glueing Functions Together" way you should not embed the termination condition into `Seq.unfold` generator function and go instead with sequence of indefinite length lazily evaluated to the specific `4000000` demand. –  Gene Belitski Jun 22 '12 at 17:42