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I'm working on strengthening my F#-fu and decided to tackle the Facebook Hacker Cup Double Squares problem. I'm having some problems with the run-time and was wondering if anyone could help me figure out why it is so much slower than my C# equivalent.

There's a good description from another post;

Source: Facebook Hacker Cup Qualification Round 2011

A double-square number is an integer X which can be expressed as the sum of two perfect squares. For example, 10 is a double-square because 10 = 3^2 + 1^2. Given X, how can we determine the number of ways in which it can be written as the sum of two squares? For example, 10 can only be written as 3^2 + 1^2 (we don't count 1^2 + 3^2 as being different). On the other hand, 25 can be written as 5^2 + 0^2 or as 4^2 + 3^2.

You need to solve this problem for 0 ≤ X ≤ 2,147,483,647.


10 => 1

25 => 2

3 => 0

0 => 1

1 => 1

Numbers From Competition


My basic strategy (which I'm open to critique on) is to;

  1. Create a dictionary (for memoize) of the input numbers initialzed to 0
  2. Get the largest number (LN) and pass it to count/memo function
  3. Get the LN square root as int
  4. Calculate squares for all numbers 0 to LN and store in dict
  5. Sum squares for non repeat combinations of numbers from 0 to LN
    • If sum is in memo dict, add 1 to memo
  6. Finally, output the counts of the original numbers.

Here is the F# code (See code changes at bottom) I've written that I believe corresponds to this strategy (Runtime: ~8:10);

open System
open System.Collections.Generic
open System.IO

/// Get a sequence of values
let rec range min max = 
    seq { for num in [min .. max] do yield num }

/// Get a sequence starting from 0 and going to max
let rec zeroRange max = range 0 max    

/// Find the maximum number in a list with a starting accumulator (acc)
let rec maxNum acc = function
    | [] -> acc
    | p::tail when p > acc -> maxNum p tail
    | p::tail -> maxNum acc tail

/// A helper for finding max that sets the accumulator to 0
let rec findMax nums = maxNum 0 nums

/// Build a collection of combinations; ie [1,2,3] = (1,1), (1,2), (1,3), (2,2), (2,3), (3,3)
let rec combos range =    
    seq { 
          let count = ref 0
          for inner in range do 
              for outer in Seq.skip !count range do 
                  yield (inner, outer)
              count := !count + 1          

let rec squares nums = 
    let dict = new Dictionary<int, int>()
    for s in nums do
        dict.[s] <- (s * s)

/// Counts the number of possible double squares for a given number and keeps track of other counts that are provided in the memo dict.
let rec countDoubleSquares (num: int) (memo: Dictionary<int, int>) =
    // The highest relevent square is the square root because it squared plus 0 squared is the top most possibility
    let maxSquare = System.Math.Sqrt((float)num)

    // Our relevant squares are 0 to the highest possible square; note the cast to int which shouldn't hurt.
    let relSquares = range 0 ((int)maxSquare)

    // calculate the squares up front;
    let calcSquares = squares relSquares

    // Build up our square combinations; ie [1,2,3] = (1,1), (1,2), (1,3), (2,2), (2,3), (3,3)
    for (sq1, sq2) in combos relSquares do
        let v = calcSquares.[sq1] + calcSquares.[sq2]
        // Memoize our relevant results
        if memo.ContainsKey(v) then            
            memo.[v] <- memo.[v] + 1

    // return our count for the num passed in

// Read our numbers from file.
//let lines = File.ReadAllLines("test2.txt")
//let nums = [ for line in Seq.skip 1 lines -> Int32.Parse(line) ]

// Optionally, read them from straight array
let nums = [1740798996; 1257431873; 2147483643; 602519112; 858320077; 1048039120; 415485223; 874566596; 1022907856; 65; 421330820; 1041493518; 5; 1328649093; 1941554117; 4225; 2082925; 0; 1; 3]

// Initialize our memoize dictionary
let memo = new Dictionary<int, int>()
for num in nums do
    memo.[num] <- 0

// Get the largest number in our set, all other numbers will be memoized along the way
let maxN = findMax nums

// Do the memoize
let maxCount = countDoubleSquares maxN memo

// Output our results.
for num in nums do
    printfn "%i" memo.[num]

// Have a little pause for when we debug
let line = Console.Read()

And here is my version in C# (Runtime: ~1:40:

using System;
using System.Collections.Generic;
using System.Diagnostics;
using System.IO;
using System.Linq;
using System.Text;

namespace FBHack_DoubleSquares
    public class TestInput
        public int NumCases { get; set; }
        public List<int> Nums { get; set; }

        public TestInput()
            Nums = new List<int>();

        public int MaxNum()
            return Nums.Max();

    class Program
        static void Main(string[] args)
            // Read input from file.
            //TestInput input = ReadTestInput("live.txt");

            // As example, load straight.
            TestInput input = new TestInput
                NumCases = 20,
                Nums = new List<int>

            var maxNum = input.MaxNum();

            Dictionary<int, int> memo = new Dictionary<int, int>();
            foreach (var num in input.Nums)
                if (!memo.ContainsKey(num))
                    memo.Add(num, 0);

            DoMemoize(maxNum, memo);

            StringBuilder sb = new StringBuilder();
            foreach (var num in input.Nums)


            var blah = Console.Read();
            //File.WriteAllText("out.txt", sb.ToString());

        private static int DoMemoize(int num, Dictionary<int, int> memo)
            var highSquare = (int)Math.Floor(Math.Sqrt(num));

            var squares = CreateSquareLookup(highSquare);
            var relSquares = squares.Keys.ToList();

            Debug.WriteLine("Starting - " + num.ToString());
            Debug.WriteLine("RelSquares.Count = {0}", relSquares.Count);

            int sum = 0;
            var index = 0;            
            foreach (var square in relSquares)
                foreach (var inner in relSquares.Skip(index))
                    sum = squares[square] + squares[inner];
                    if (memo.ContainsKey(sum))

            if (memo.ContainsKey(num))
                return memo[num];

            return 0;            

        private static TestInput ReadTestInput(string fileName)
            var lines = File.ReadAllLines(fileName);
            var input = new TestInput();
            input.NumCases = int.Parse(lines[0]);
            foreach (var lin in lines.Skip(1))

            return input;

        public static Dictionary<int, int> CreateSquareLookup(int maxNum)
            var dict = new Dictionary<int, int>();
            int square;
            foreach (var num in Enumerable.Range(0, maxNum))
                square = num * num;
                dict[num] = square;

            return dict;

Thanks for taking a look.


Changing the combos function slightly will result in a pretty big performance boost (from 8 min to 3:45):

/// Old and Busted...
let rec combosOld range =    
    seq { 
          let rangeCache = Seq.cache range
          let count = ref 0
          for inner in rangeCache do 
              for outer in Seq.skip !count rangeCache do 
                  yield (inner, outer)
              count := !count + 1          

/// The New Hotness...
let rec combos maxNum =    
    seq {
        for i in 0..maxNum do
            for j in i..maxNum do
                yield i,j } 
share|improve this question
Can you link or show your C# equivalent. Hard to compare against invisible code. :) – gradbot Jan 13 '11 at 15:57
I've added the C# code and the approximate run times for each. 8 minutes for F# and 1:40 for C# (YMMV). – Jacob Jan 13 '11 at 16:20
Could anybody post the outputs to the numbers for competition above posted so I can check my implementation? thank you! – Alberto Megía Feb 26 '14 at 14:04
This is sequence A000161 on OEIS (Number of partitions of n into 2 squares.), isn't it? – kaefer Feb 28 '14 at 12:21

8 Answers 8

up vote 2 down vote accepted

I like sequences, but in this case, they are probably the wrong tool for the job. This problem is a chance to try out a non-trivial recursive solution. Using mutation, it would be easy to do an algorithm like this (in Python, my pseudo-code of choice..)

def f(n):
    i = 0
    j = int(1 + sqrt(n))
    count = 0
    # 'i' will always be increased, and j will always be decreased.  We
    # will stop if i > j, so we can avoid duplicate pairs.
    while i <= j:
        s = i * i + j * j
        if s < n:
            # if any answers exist for this i, they were with higher
            # j values.  So, increment i.
            i +=  1
        elif s > n:
            # likewise, if there was an answer with this j, it was
            # found with a smaller i.  so, decrement it.
            j -= 1
            # found a solution.  Count it, and then move both i and 
            # j, because they will be found in at most one solution pair.
            count += 1
            i += 1
            j -= 1
    return count    

Now, this seems to work. Maybe its not right, or not the best, but I like how the recursive code looks in F#. (warning.. I don't have F# on this computer... but I hope I got this right.)

let f n = 
    let rec go i j count =
        if i > j then count
            let s = i * i + j * j
            if s < n then 
                go (i + 1) j count
            else if s > n then
                go i (j - 1) count
                go (i + 1) (j - 1) (count + 1)
    go 0 (1 + (n |> float |> sqrt |> int)) 0

This solution runs in O(sqrt(N)) time for each call, and requires constant memory. The memoizing solution takes O(N) time to setup the dictionary and the dictionary size is at least O(sqrt(N)). For large N, these are quite different.

share|improve this answer
From an initial glance at this, it looks like it's still brute forcing, but without a memoize to speed the subsequent test case lookups. I would probably incorporate a dictionary of "n"'s and check for and increment any relevant other test cases along the way. That way, the most you have to go through is one time for the largest test case. – Jacob Jan 17 '11 at 19:51
That is true, it brute forces the solution every time. The python solution takes a quarter of a second to solve all of the inputs from the example, so I am not too worried about memoizing here, because it is not needed. This was more of an example of a way recursion can be used besides fib or factorial functions. – dave jones Jan 17 '11 at 20:25
I've updated the question with the actual competition numbers given, it does seem like your algorithm is blazing fast for even large n so brute forcing even the maximum 100 cases shouldn't be a problem. If you wan't to try snippets of F#, is great for messing around in the browser. Thanks for your answer. – Jacob Jan 18 '11 at 15:41

Again, the number of integer solutions of x^2 + y^2 = k is either

  • zero, if there is a prime factor equal to 3 mod 4
  • four times the number of prime divisors of k which are equal to 1 mod 4.

Note that in the second alternative, you count a^2 + b^2 as a different solution to (-a)^2 + b^2 (and other signs), and to b^2 + a^2. So you may want to divide by four, and divide again by 2 (taking the floor, as @Wei Hu points out) if you want solutions as sets instead of ordered pairs.

Knowing this, writing a program which gives the number of solutions is easy: compute prime numbers up to 46341 once and for all.

Given k, compute the prime divisors of k by using the above list (test up to sqrt(k)). Count the ones which are equal to 1 mod 4, and sum. Multiply answer by 4 if needed.

All this is a one or two liner in any lazy functional language (I don't know enough f#, in Haskell it would be two lines long), once you have a primes infinite sequence: counting the divisors = 1 mod 4 (filterby |> count or something along these lines) is something quite natural.

I suspect it is faster than brute forcing the decompositions.

share|improve this answer
I don't understand. Doesn't this give an answer of 4 for both 10 and 15, when it should return 1 and 0? Ruling out solutions with negative x or y makes it return the correct result for 10, but what about 15? – jonderry Jan 13 '11 at 20:33
4 * (primeFactors k |> List.filter (fun p -> p % 4 = 1) |> List.length) – Markus Jarderot Jan 14 '11 at 9:15
Proven incorrect via… This formula needs modification to work correctly. First off, do not multiply by 4 because we don't care about negative solutions, also you must remove duplicate combinations (not sure how to do that yet). Finally, you must account for the square root being an integer (sqrt(k) * 0^2) – Jacob Jan 14 '11 at 16:34
@Jacob, we can remove duplicate combinations easily. For each combination (a,b) that satisfies a^2 + b^2 = n, we also counted (b,a), meaning the count is an even number, unless a == b. So the number of unique combinations is simply ceiling(count/2). – Wei Hu Jan 17 '11 at 7:59
WRT first clause: power of such prime number fits too. – Orient Jul 3 '14 at 6:06

Your F# combos function has awful perf. Something like

let rec combos range =
    let a = range |> Seq.toArray
    seq {
        for i in 0..a.Length-1 do
            for j in i..a.Length-1 do
                yield i,j } 

should be a big speedup.

share|improve this answer
Awesome... That's exactly the kind of info I was looking for. – Jacob Jan 13 '11 at 18:24
In my initial running, I'm noticing an improvement from 8 min to 4 min. Very nice. I modified to just pass in the maxNum instead of range, and iterate to maxNum instead of a.Length-a which lets me remove the whole notion of a. Thanks again for the keen eye. – Jacob Jan 13 '11 at 18:37


Given the C# code, the biggest difference is that the C# code is looping over a list, while the F# code is iterating over a sequence. The Seq.cache is only really a help when you are actually doing calculations over the seq, in this case, it doesn't avoid walking over the sequence repeatedly.

This function will be more like the C# code, but it requires the input to be an array, not just any sequence.

But, as you say elsewhere, a better algorithm is needed overall.

let combos (ss: int []) =
    let rec helper idx =
    seq {
        if idx < ss.Length then
            for jdx in idx + 1 .. ss.Length - 1 do
                 yield (ss.[idx], ss.[jdx])
            yield! helper (idx + 1)
    helper 0


This may be part of why this is slower than equivalent C# code, although I think IEnumerable would have a similar problem.

let rec combos range =    
seq { 
      let count = ref 0
      for inner in range do 
          for outer in Seq.skip !count range do 
              yield (inner, outer)
          count := !count + 1          

The double loop over range is causing it to be evaluated over and over again. Seq.cache can be used to avoid this, if the sequence must be looked at repeatedly.

share|improve this answer
Interesting. Could you modify your answer to show how you would use Seq.cache? – Jacob Jan 13 '11 at 15:29
After modifying the loop to be /// Build a collection of combinations; ie [1,2,3] = (1,1), (1,2), (1,3), (2,2), (2,3), (3,3) let rec combos range = seq { let rangeCache = Seq.cache range let count = ref 0 for inner in rangeCache do for outer in Seq.skip !count rangeCache do yield (inner, outer) count := !count + 1 } I still get 8 minute run times. – Jacob Jan 13 '11 at 15:47
hmmmm, Seq.cache probably isn't the solution. I am working on a more functional answer for you (that doesn't include ref count, or skip count), but have to be away for a while. I imagine someone else will give you a better answer before I get back. – dave jones Jan 13 '11 at 15:57
You new version of combos does improve performance quite a bit. It's only like 10 seconds slower than the other version provided by Brian. Thanks for your help. – Jacob Jan 13 '11 at 18:53

This should help some.

// Build up our square combinations;
for (sq1, sq2) in combos maxSquare do
    let v = calcSquares.[sq1] + calcSquares.[sq2]

    // Memoize our relevant results
    match memo.TryGetValue v with
    | true, value -> memo.[v] <- value + 1
    | _ -> ()
share|improve this answer

I've been using F# for Facebook hacker cup. Here is my solution which finishes in less than 0.5 seconds. While I agree that you should do as functional as you can, but sometimes going imperative is a better approach, especially in a time-constrained coding competition.

let int_sqrt (n:int) :int =
    int (sqrt (float n))

let double_square (x: int) :int =
    let mutable count = 0
    let square_x = int_sqrt x
    for i in 0..square_x do
        let y = int_sqrt (x - i*i)
        if y*y + i*i = x && i<=y then count <- count + 1
share|improve this answer
Wierd, the last two lines of my code got cut off. They are if yy + ii = x && i<=y then count <- count + 1 count – Cygwin98 Jan 27 '11 at 3:32

Without checking the code, your algorithm is sub-optimal. I solved this with the following:

Let N be the number we're testing.
Let X,Y such that X^2 + Y^2 = N
For all 0 <= X < sqrt(N)
   Let Ysquared = N - X^2
   if( Ysquared > Xsquared ) break; //prevent duplicate solutions
   if( isInteger( sqrt(ySquared) ) )
      //count unique solution
share|improve this answer
Thanks for your alternative algorithm, I'll have to give that a try. Do you have any comments about why my algorithm would take longer to run as F# than C#? – Jacob Jan 13 '11 at 15:27

It's an improvement of Stefan Kendall's answer. Consider: N=a^2+b^2 and a>=b>=0 Then: sqrt(N/2)<=a<=sqrt(N) in reals. To get an integer interval must be rounded up the first term (sqrt(N/2)) and rounded down the last term (sqrt(N)).

public class test001 {
    public static void main(String[] args) {
        int k=0,min=0,max=0;
        double[] list={1740798996,1257431873,2147483643,
        for(int i=0 ; i<=list.length-1 ; i++){
            if (Math.sqrt(list[i]/2)%1==0)
                    //Rounded up
                    //Rounded down
                for(int j=min ; j<=max ; j++)
                if(Math.sqrt(list[i]-j*j)%1==0) k++;
                //If sqrt(N-j^2) is an integer then "k" increases.
        System.out.println((int)list[i]+": "+k);
share|improve this answer
Consider expanding this answer with some explanation what the code does. It will help further visitors to understand it. As a side note, what happened with the space bar on your keyboard? :) – bytebuster Jan 30 '13 at 1:53
Also, this is really a question about a difference between f# and C# implementations – John Palmer Jan 30 '13 at 3:05
It's an improvement of Stefan Kendall's answer. – Gecko Feb 2 '13 at 21:32

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