# find unique pythagorean triples

I am trying to exclude the repeat triangles from a sequence of Pythagorean triples which just prints triangles with hypotenuses of 100, but what I do in the exclusion part fails... I have what follows:

``````....
int one_hundred = 0,
if( (a*a) + (b*b) == (h*h) ){

//exclusion
if((a == b)){

continue;

}else {

//Just prints the the triangles that have hypotenuses of 100
if(h == 100){
cout <<  a << "     " << b << "     " << h << endl;

}

.....

}
``````

Now the output for this should be

What I mean by repeat is that the first and the last rows have the same set of pairs of sides

What I would like to is an output like this:

But this I do as follows:

//see if they are repeats

``````if((a == 96)){

continue;

}
``````

And I thought that by comparing a == b I would have achieved the same but I did not:

``````if((a == b)){

continue;

}
``````

Hopefully this clarifies what I am trying to do...

Thank you again!!

-
It's not clear what the problem is here. Please describe exactly what the problem is (i.e. what behaviour you got, and what behaviour you were expecting). Also `(a == b) || (b == a)` is redundant... –  Oli Charlesworth Feb 13 '13 at 21:31
What do you mean by "repeat triangles"? –  Joseph Mansfield Feb 13 '13 at 21:32
You're not checking for a repeat. You're checking to see if a==b and you're doing it redundantly because (a==b) == (b==a) always. –  Pete Feb 13 '13 at 21:32
Also note that a Pythagorean triple can never contain the same number twice. –  Daniel Fischer Feb 13 '13 at 21:34
@user1179105 why would you allow this to happen? Just make sure that `a < b` always (so if you try values for `b`, make sure that you don't try anything that is smaller than `a`). However, raukh has given you the better approach for systematically generating the triangles. –  Omri Barel Feb 13 '13 at 21:47
show 6 more comments

I think a simple approach would be to create a `std::vector<bool> state(h);` Because `h` is the largest of all sides the others could never be larger; right? And we know no other number multiplied by itself could equal another multiplied by itself, otherwise you could say something like 5*5 = 4*4! So, you can use the vector subscripts as representatives of the numbers. As you pull one number and find it is a solution to your problem simply switch its state to `false`. The whole thing would go something like this -

``````bool loop;
std::vector<bool> *state = new std::vector<bool>(h, true);
for(int i = 2; i != sizeof(bool) * h; ++i)
{
if((state + i))
{
a = i;
loop = true;

for(int j = i + 1; loop && j != sizeof(bool) * h; ++j)
{
if((state + j))
{
b = j;

if((a*a) + (b*b) == (h*h))
{
loop = false;
(*state)[i] = false;
(*state)[j] = false;
std::cout << a << " " << b << " " << h << std::endl;
}
}
}
}
}
``````

My output is:

``````28 96 100
60 80 100
``````

Which is what I think you meant in your desired results example. Otherwise you need to create a rule that does double print certain ones. In that case you could add a `switch(){}`. Not so hard, granted it's not all that elegant, imoo.

Note: It really isn't necessary to change `state->at(i)` to `false` for `i` is incremented and will never be touched again. But it's there in case you'd need to use the subs later on. Indexes 0 and 1 have been ignored for no side of a triangle can be 0 and if one was viable the other side would have to equal `h` so don't waste precious time. If you do indeed hold on to them remember that 0 and 1 are `true` to begin with and should be set to false.

-

Filtering out duplicates from a sequence of Pythagorean triples is pretty difficult, because you need to remember all old triples permanently, for a huge number of comparisons.

A better approach is simply not to generate repeats to begin with. To do this, you can use this set of formulae (from the "Generating a triple" section of the Wikipedia article on Pythagorean triples):

a = k·(m2 - n2)
b = k·(2mn)
c = k·(m2 + n2)

where k, m, and n are positive integers, with m and n being coprime (meaning their greatest common denominator is 1) and either m or n being even.

-
oh I see. Well even with floating point numbers `a==b || b == a` is equivalent to `a==b` and both expressions have nothing to do with the wanted behaviour, but I see how you ended up thinking about floats –  stefan Feb 13 '13 at 21:48