A Pythagorean triplet is a set of three natural numbers, a < b < c, for which, a2 + b2 = c2

For example, 32 + 42 = 9 + 16 = 25 = 52.

There exists exactly one Pythagorean triplet for which a + b + c = 1000. Find the product abc.

Source: http://projecteuler.net/index.php?section=problems&id=9

I tried but didn't know where my code went wrong. Here's my code in C:

#include <math.h>
#include <stdio.h>
#include <conio.h>

void main()
    int a=0, b=0, c=0;
    int i;
    for (a = 0; a<=1000; a++)
        for (b = 0; b<=1000; b++)
            for (c = 0; c<=1000; c++)
                if ((a^(2) + b^(2) == c^(2)) && ((a+b+c) ==1000)))
                    printf("a=%d, b=%d, c=%d",a,b,c);
  • 4
    +1 just for the short snippet demonstrating the problem. – sharptooth May 12 '10 at 10:28
  • 1
    don't use pow, it will cast your results to floating point and equality is unlikely to work as expected! – fortran May 12 '10 at 10:41
  • 8
    I recognised the problem straightaway - maybe we could have a ProjectEuler tag, indicating that the question isn't homework per se but an exercise from that problem set; and of course there should always be code posted for the attempt that isn't working as expected, to prevent 'plz send me teh codez' questions. – Eight-Bit Guru May 12 '10 at 10:46
  • @Jonners: turns out there already is one. – outis May 12 '10 at 11:13
  • @Jonners anyone can create a tag (I think?!), but anyway, there already is a project-euler tag (which I've just added). – AakashM May 12 '10 at 11:14

16 Answers 16

#include <math.h>
#include <stdio.h>

int main()
    const int sum = 1000;
    int a;
    for (a = 1; a <= sum/3; a++)
        int b;
        for (b = a + 1; b <= sum/2; b++)
            int c = sum - a - b;
            if ( a*a + b*b == c*c )
               printf("a=%d, b=%d, c=%d\n",a,b,c);
    return 0;


  • b = a;
    if a, b (a <= b) and c are the Pythagorean triplet,
    then b, a (b >= a) and c - also the solution, so we can search only one case
  • c = 1000 - a - b; It's one of the conditions of the problem (we don't need to scan all possible 'c': just calculate it)
  • Dude can you explain me the logic: a=1 Ok; But b=a & c=1000-a-b ? Can you please elaborate. Thanks – Rahul May 13 '10 at 5:01
  • @Rahul: I've added few lines of explanation – Oleg Razgulyaev May 13 '10 at 9:09
  • @ oraz: Thanks dude. I got it – Rahul May 14 '10 at 4:28
  • 3
    If a < b and b < c, a can't be greater/equals than 1000/3 and b can't be greater/equals than 1000/2. And since a, b, c aren't used outside their loops, just declare them in the for-head. – user unknown May 18 '10 at 6:18
  • 1
    "for (b = a; b<=1000; b++)" - part of the problem description is that a < b < c so b cannot be equal to a. Make that b = a+1 – Ponkadoodle May 22 '10 at 5:52

I'm afraid ^ doesn't do what you think it does in C. Your best bet is to use a*a for integer squares.

  • And with automatic truncation to integers, I've even seen use use of ^ to 'square' floating point values. – Pete Kirkham May 13 '10 at 22:18

Here's a solution using Euclid's formula (link).

Let's do some math: In general, every solution will have the form


where k, x and y are positive integers, y < x and gcd(x,y)=1 (We will ignore this condition, which will lead to additional solutions. Those can be discarded afterwards)

Now, a+b+c= kx²-ky²+2kxy+kx²+ky²=2kx²+2kxy = 2kx(x+y) = 1000

Divide by 2: kx(x+y) = 500

Now we set s=x+y: kxs = 500

Now we are looking for solutions of kxs=500, where k, x and s are integers and x < s < 2x. Since all of them divide 500, they can only take the values 1, 2, 4, 5, 10, 20, 25, 50, 100, 125, 250, 500. Some pseudocode to do this for arbitrary n (it and can be done by hand easily for n=1000)

If n is odd
  return "no solution"
  L = List of divisors of n/2
for x in L
  for s in L
    if x< s <2*x and n/2 is divisible by x*s
      add (k*(x*x-y*y),2*k*x*y,k*(x*x+y*y)) to list of solutions
sort the triples in the list of solutions
delete solutions appearing twice
return list of solutions

You can still improve this:

  • x will never be bigger than the root of n/2
  • the loop for s can start at x and stop after 2x has been passed (if the list is ordered)

For n = 1000, the program has to check six values for x and depending on the details of implementation up to one value for y. This will terminate before you release the button.


As mentioned above, ^ is bitwise xor, not power.

You can also remove the third loop, and instead use c = 1000-a-b; and optimize this a little.


for a in 1..1000
    for b in a+1..1000
        print a, b, c if a*a+b*b=c*c

There is a quite dirty but quick solution to this problem. Given the two equations

a*a + b*b = c*c

a+b+c = 1000.

You can deduce the following relation

a = (1000*1000-2000*b)/(2000-2b)

or after two simple math transformations, you get:

a = 1000*(500-b) / (1000 - b)

since a must be an natural number. Hence you can:

for b in range(1, 500):
    if 1000*(500-b) % (1000-b) == 0:
        print b, 1000*(500-b) / (1000-b) 

Got result 200 and 375.

Good luck

  • 1
    1 up-vote for dirt, but I feel sad when I compare it with my wasted hour with this question :-|| – CY5 Mar 21 '15 at 12:22
#include <stdio.h>

int main() // main always returns int!
 int a, b, c;
 for (a = 0; a<=1000; a++)
  for (b = a + 1; b<=1000; b++) // no point starting from 0, otherwise you'll just try the same solution more than once. The condition says a < b < c.
   for (c = b + 1; c<=1000; c++) // same, this ensures a < b < c.
    if (((a*a + b*b == c*c) && ((a+b+c) ==1000))) // ^ is the bitwise xor operator, use multiplication for squaring
     printf("a=%d, b=%d, c=%d",a,b,c);
 return 0;

Haven't tested this, but it should set you on the right track.

  • 6
    how about eliminating the third loop by putting c = 1000 - a - b; That way you don't need to check for 1000 in the if condition. runs faster. – Amarghosh May 12 '10 at 10:57
  • 1
    Start a from 1. Apart from a = 0 => a degenerate triangle, there are obviously no solutions such that bb = cc and b < c. – JeremyP May 12 '10 at 11:18
  • 1
    There are many optimizations of course. This can even be solved relatively easy with no programming at all. I think it's important to understand this trivial solution before seeking to optimise it though. – IVlad May 12 '10 at 11:39

From man pow:

POW(3)                                       Linux Programmer's Manual                                      POW(3)

       pow, powf, powl - power functions

       #include <math.h>

       double pow(double x, double y);
       float powf(float x, float y);
       long double powl(long double x, long double y);

       Link with -lm.

   Feature Test Macro Requirements for glibc (see feature_test_macros(7)):

       powf(), powl(): _BSD_SOURCE || _SVID_SOURCE || _XOPEN_SOURCE >= 600 || _ISOC99_SOURCE; or cc -std=c99

       The pow() function returns the value of x raised to the power of y.

       On success, these functions return the value of x to the power of y.

       If  x  is  a  finite  value less than 0, and y is a finite non-integer, a domain error occurs, and a NaN is

       If the result overflows, a range error occurs, and the functions return HUGE_VAL, HUGE_VALF, or  HUGE_VALL,

as you see, pow is using floating point arithmetic, which is unlikely to give you the exact result (although in this case should be OK, as relatively small integers have an exact representation; but don't rely on that for general cases)... use n*n to square the numbers in integer arithmetic (also, in modern CPU's with powerful floating point units the throughput can be even higher in floating point, but converting from integer to floating point has a very high cost in number of CPU cycles, so if you're dealing with integers, try to stick to integer arithmetic).

some pseudocode to help you optimise a little bit your algorithm:

for a from 1 to 998:
    for b from 1 to 999-a:
        c = 1000 - a - b
        if a*a + b*b == c*c:
             print a, b, c

In C the ^ operator computes bitwise xor, not the power. Use x*x instead.

  • 2
    Actually, since it's to the power of 2 and we're dealing with integers, seems to me a*a, etc. is easier. – T . May 12 '10 at 10:27
  • Don't advise to use pow, because it will yield imprecise results, as I have commented my answer – fortran May 12 '10 at 10:41

I know this question is quite old, and everyone has been posting solutions with 3 for loops, which is not needed. I got this solved in O(n), by **equating the formulas**; **a+b+c=1000 and a^2 + b^2 = c^2**

So, solving further we get;

a+b = 1000-c

(a+b)^2 = (1000-c)^2

If we solve further we deduce it to;

a=((50000-(1000*b))/(1000-b)). We loop for "b", and find "a".

Once we have "a" and "b", we get "c".

public long pythagorasTriplet(){
    long a = 0, b=0 , c=0;

    for(long divisor=1; divisor<1000; divisor++){
        if( ((500000-(1000*divisor))%(1000-divisor)) ==0){
            a = (500000 - (1000*divisor))/(1000-divisor);
            b = divisor;
            c = (long)Math.sqrt(a*a + b*b);
            System.out.println("a is " + a + " b is: " + b + " c is : " + c);
    return a*b*c;
  • When do you get the 500000 from in this instance? – gcoulby Aug 9 '15 at 16:51
  • @gcoulby In the above program, he considered n=1000... so it must be 50000 not 500000... He must be mistaken... – Baradwaj Aryasomayajula Oct 26 '15 at 21:28

As others have mentioned you need to understand the ^ operator. Also your algorithm will produce multiple equivalent answers with the parameters a,b and c in different orders.

  • Very true about multiple answers. – sharptooth May 12 '10 at 10:59

While as many people have pointed out that your code will work fine once you switch to using pow. If your interested in learning a bit of math theory as it applies to CS, I would recommend trying to implementing a more effient version using "Euclid's formula" for generating Pythagorean triples (link).


Euclid method gives the perimeter to be m(m+n)= p/2 where m> n and the sides are m^2+n^2 is the hypotenuse and the legs are 2mn and m^2-n^2.thus m(m+n)=500 quickly gives m= 20 and n=5. The sides are 200, 375 and 425. Use Euclid to solve all pythorean primitive questions.


As there are two equations (a+b+c = 1000 && aˆ2 + bˆ2 = cˆ2) with three variables, we can solve it in linear time by just looping through all possible values of one variable, and then we can solve the other 2 variables in constant time.

From the first formula, we get b=1000-a-c, and if we replace b in 2nd formula with this, we get c^2 = aˆ2 + (1000-a-c)ˆ2, which simplifies to c=(aˆ2 + 500000 - 1000a)/(1000-a).

Then we loop through all possible values of a, solve c and b with the above formulas, and if the conditions are satisfied we have found our triplet.

    int n = 1000;

    for (int a = 1; a < n; a++) {
        int c = (a*a + 500000 - 1000*a) / (1000 - a);
        int b = (1000 - a - c);

        if (b > a && c > b && (a * a + b * b) == c * c) {
            return a * b * c;

I think the best approach here is this:

int n = 1000;
unsigned long long b =0;
unsigned long long c =0;
for(int a =1;a<n/3;a++){
    b=((a*a)- (a-n)*(a-n)) /(2*(a-n));

        cout<<a<<' '<<b<<' '<<c<<endl;

explanation: We shall refer to the N and A constant so we will not have to use two loops. We can do it because c=n-a-b and b=(a^2-(a-n)^2)/(2(a-n)) I got these formulas by solving a system of equations:

a+b+c=n, a^2+b^2=c^2

func maxProd(sum:Int)->Int{
    var prod = 0
    //    var b = 0
    var c = 0
    let bMin:Int = (sum/4)+1 //b can not be less than sum/4+1 as (a+b) must be greater than c as there will be no triangle if this condition is false and any pythagorus numbers can be represented by a triangle.
    for b in bMin..<sum/2 {
        for a in ((sum/2) - b + 1)..<sum/3{ //as (a+b)>c for a valid triangle
            c = sum - a - b
            let csquare = Int(pow(Double(a), 2) + pow(Double(b), 2))
            if(c*c == csquare){
                let newProd = a*b*c
                if(newProd > prod){
                    prod = newProd
    return prod

The answers above are good enough but missing one important piece of information a + b > c. ;)

More details will be provided to those who ask.

for a in range(1,334):
    for b in range(500, a, -1):
        if a + b < 500:
        c = 1000 - a - b
        if a**2 + b**2 == c**2:

Further optimization from Oleg's answer. One side cannot be greater than the sum of the other two. So a + b cannot be less than 500.

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