# Finding all Pythagorean triples using Euclid's formula

The goal of this program is to find all Pythagorean triples for each value (a, b, c) less than 500 using Euclid's formula (a = m^2 -n^2, b = 2mn, c = m^2 + n^2.) So here's my code.

``````int main()
{
clock_t start = clock()/ (CLOCKS_PER_SEC/1000);

for (int m = 1; m <= 500; m++)
{

for (int n = 1; n <= 500; n++)
{

int a = (m*m)-(n*n);
int b = 2*m*n;
int c = (m*m)+(n*n);
if (m > n && a + b == c)
{
cout << a << " + " << b << " = " << c << endl;
}
}
}
clock_t finish = clock()/ (CLOCKS_PER_SEC/1000);
cout << "completed in " <<clock() << " ms";
return 0;
}
``````

I tried this and my output is nothing. The way I thought it'd work was: for every integer m less than/equal to 500 and starting at 1, add one to m each time. Same deal for n. Then plug those values into the formula and if a+b == c, it prints those values, thus finding my triples. But I'm not getting any output.

-
Save extra `a,b,c` calculations by setting your `for` loop appropriately: `for (m = 2; m <= 500; m++)` and `for (n = 1; n < m; n++)` to get rid of the first clause of the `if` statement. –  kbshimmyo Feb 20 at 15:57

``````a + b = (m^2 + 2mn - n^2) = (m+n)^2 - 2n^2
c = m^2 + n^2 = (m+n)^2 - 2mn
``````

You required `a + b = c`

``````--> 2n^2 = 2mn
--> m = n
``````

Since you also required `m > n`, you cannot find any solution.

-

Your condition is wrong: you're trying to get

(m^2 - n^2) + 2mn = (m^2 + n^2)

(m - n)^2 = m^2 + n^2

but for `n > 0` you will always have the following strict inequality:

(m - n)^2 < m^2 < m^2 + n^2

According to wikipedia, you wanted to check whether the sum of squares was equal -

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

-

I figured out the problem; in the final iteration of the program I have to restrict c to <= 500:

``````int main()
{
clock_t start = clock()/ (CLOCKS_PER_SEC/1000);

for (int n = 1; n <= 500; n++)
{
for (int m = n+1; m <= 500; m++)
{
int a = (m*m)-(n*n);
int b = 2*m*n;
int c = (m*m)+(n*n);
if ((a*a) + (b*b) == (c*c) && c <= 500)
{
cout << a << " + " << b << " = " << c << endl;
}
}
}
clock_t finish = clock()/ (CLOCKS_PER_SEC/1000);
cout << "completed in " <<clock() << " ms";
return 0;
}
``````

That way the program doesn't go long like I was having problems with. Thank you all!

-
You should move the check to the inner loop's condition to avoid doing iterations that are unnecessary: `for(int m = n + 1; m < = 500 && (m*m + n*n) <=500; ++m)`. And the if-condition inside your inner loop is also unnecessary - mathematically, any `a`, `b`, and `c` produced will satisfy the condition. –  Zac Howland Feb 20 at 16:44

``````int main()
{
for (int n = 1; n <= 500; ++n) // note the swap for the loops
{
for (int m = n + 1; m <= 500 && (m*m + n*n) <= 500; ++m) // note that m starts at n + 1
{
int a = (m*m)-(n*n);
int b = 2*m*n;
int c = (m*m)+(n*n);
// Euclid already proved this, so there is no need to test it.
std::cout << a << " + " << b << " = " << c << std::endl;
}
}
return 0;
}
``````
1. Euclid's formula requires `m > n`, so there is no need to check values that don't meet that criteria
2. Your test `(a + b) == c` will never work anyway. The formula is `a^2 + b^2 = c^2` - that does not mean `a + b = c`.
-
I adjusted my code to fix my dumb errors (Haha I don't know how I missed that I need to check a^2+b^2 == c^2) but now I'm getting an infinite loop. Or at least a very, very long program. And just checking a sampling of the outputs reveals they're not perfect squares. –  Santa Feb 20 at 16:19
@Santa If you never want numbers over 500 (that is, the highest number in the triple would be 500), just limit `c` to 500 - which you can do in the conditional check of the inner for-loop. All of the results from this formula will be Pythagorean Triples. –  Zac Howland Feb 20 at 16:48