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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) ){

        if((a == b)){


        }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:

enter image description here

But this I do as follows:

//see if they are repeats

if((a == 96)){



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

if((a == b)){



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

Thank you again!!

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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... –  Oliver 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

3 Answers 3

up vote 0 down vote accepted

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.

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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.

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How about (if (abs (a-b) < EPSILON)) continue...

Also, use the same inequality (define EPSILON somewhere) in the first if structure.

It's been a while since I did C-coding, but equality in double or floating point numbers used to get wrong results. Unless they are all integers, in which case (a==b) is same as (b==a), not sure why you have both.

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why would he ever use floating point numbers for pythagorean triplets?! the whole point of it is the integrality! –  stefan Feb 13 '13 at 21:44
true, I take that back. I was wondering why the OP was trying a==b || b==a –  Manidip Sengupta Feb 13 '13 at 21:46
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

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