Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

In my previous post on this subject i have made little progress (not blaming anyone except myself!) so i'll try to approach my problem statement differently.

how do i go about writing the algorithm to generate a list of primitive triples?

all i have to start with is:

a) the basic theorem: a^2 + b^2 = c^2

b) the fact that the small sides of the triple (a and b) need to be smaller than 'n'

(note: 'n' <= 200 for this purpose)

How do i go about building my loops? Do i need 2 or 3 loops?

a professor gave me some hints but alas i am still lost. I don't know where to start with building my loops. Do i need 2 or 3 loops? do i loop through a and b or do i need to introduce the 'n' variable into a loop of its own? This probably looks like obvious hints to experienced programmers but it seems i need more hand holding still...any help will be appreciated!

A Pythagorean triple is group of a,b,c where a^2 + b^2 = c^2. you need to find all a,b,c combinations which satisfy the above rule starting a 0,0,0 up to 200 ,609,641 The first triple will be [3,4,5] the next will be [5,12,13] etc.. n is length of the small side a so if n is 5 you need to check all triples with a=1,a=2,a=3,a=4,a=5 and find the two cases shown above as being Pythagorean,


thanks for all submissions. So this is what i came up with (using python)

import math
for a in range (1,200):
    for b in range (a,a*a):
        csqrd = a * a + b * b
        c = math.sqrt(csqrd)
        if math.floor(c) == c:
                print (a,b,int(c))

this DOES return the triple (200 ,609,641) where 200 is the upper limit for 'a' but computing the upper limit for 'b' remains tricky. Not sure how i would go about this...suggestions welcome :)



p.s. i'm not looking for a solution but rather help in improving my problem solving skills. (definitely needed :-) )

share|improve this question
You should probably add that a, b and c have to be integers to make it clear for everyone. – Jacob Oct 21 '10 at 20:58
Isn't that assumed in the definition of a Pythagorean triple? – jlv Oct 21 '10 at 21:03
the question more related to the logic of shelled looping and as such it doesn't matter what the loops are running on, you could just as easy go FOREACH[A-Z] – FatherStorm Oct 21 '10 at 21:07
Hint: You should get (200, 9999, 10001). – David Thornley Oct 22 '10 at 16:00

You only need two loops. Note that n is given, meaning you read it from the keyboard or from a file.

Once you read n, you simply loop a from 1, then in that loop you loop b from a. Then you check if a <= n and if b <= n. If yes, you check if a^2 + b^2 is a square (if it can be writen as c^2 where c is an integer). If yes you output the corresponding triplet. You can stop the first loop once a > n and the second loop once b > n.

share|improve this answer

So Pythagorean tripes luckily have two properties that make this not so bad to solve:

First, all the numbers in a triple have to be integers (that means, you can calculate a^2 + b^2 and you have a triple if c^2 is an integer and not a float). Additionally, c is bounded by what a and b are.

So this should inform you how many variables you really have (which will guide your algorithm design - specifically how many for loops you need). The latter piece of information will inform you as to how long of a range you need to iterate over. I've tried to be vague as per your request, but let me know if you'd like anything more specific.

share|improve this answer
yes maybe one question: how can i test that sqrt(c) is an int? something like if sqrt(a)%1 == 0 ? – raoulbia Oct 21 '10 at 23:20
Some languages, like c# and java i believe, should have a function that checks if a number is an integer. Otherwise, you could do something like round(c) == c or c//1 = c where // is the floor division operator. Depends on what your language has built-in functions for. – jlv Oct 22 '10 at 0:38
Hi, please have a look at my update if you can. at this stage i have figured out how to build the loops but there remains one problem i can't figure out: how to deal with the upper bound of 'b' in an efficient manner. – raoulbia Oct 22 '10 at 14:45
Hey Baba, it seems like you're progressing. As of now, the only thing I can comment on are the loops. However, you have a big problem with the b loop. Think again about what the constraint is on b. It should be the exact same as the constraint for a, hence you can use a similar condition in that for-loop. (*spoiler: it should be the same). – jlv Oct 22 '10 at 15:07

To compute the upper limit of b ... certainly we can't go past a^2 + b^2 = (b+1)^2, since the gap between successive squares increases. Now, (b+1)^2 is b^2 + 2b + 1, so we can stop on b when a^2 < 2b + 1. (In fact, for odd a, the biggest triple is when b = (a^2 - 1)/2, and then a^2 + b^2 = (b+1)^2.)

Let's consider even a. Then, we need to consider a^2 + b^2 = (b+2)^2, since 2b+1 is necessarily odd. Now, (b+2)^2 - b^2 = 4b+4, so we're looking at a^2 = 4b+4, or b = (a^2 - 4)/4 as the highest b (and, as before, we know this b works).

Therefore, for given a, you need to check bs up to

(a^2 - 1)/2 (a odd)

(a ^2 - 4)/4 (a even)

share|improve this answer

Given any a and b, you can compute what c should be. You can also check if the c you get is a whole number. With that in mind, you need to check all the a and b values and find the ones that give you a whole c number.

This should take just two loops (one for a and one for b). Leave comments if you want more help, and let me know what problems you have.

share|improve this answer

Break the problem into sub problems. The first clue is that you have an upper bound n on the value of c. Let's start with c=1 --- so, let's see how many triplets can be formed with:

a^2 + b^2 = 1

Now, let's set a = 1 to c-1. So that means we have to check if b is an integer such that b^2 = c^2 - a^2 and b^2 = int(b)^2.

share|improve this answer

leaving the formula and the language alone, you're trying to find every combination of two variables, a and b so...

foreach A   
  foreach B  
    foreach C
      do something  with B and A  and eval with c  
    end foreach C  
  end foreach B  
end foreach A
for ($x = 1; $x <= 200; $x++) {
    for ($y = 1; $y <= 200; $y++) {
        for ($z = 1; $z <= 200; $z++) {
            if ($x < $y) {
                if (pow($x, 2) + pow($y, 2) == pow($z, 2)) {
                    echo "$x, $y , $z<br/>";

3, 4 , 5
5, 12 , 13
6, 8 , 10

81, 108 , 135
84, 112 , 140
84, 135 , 159

share|improve this answer
Hi, (6,8,10) is not a primitve triple as it is a multiple of (3,4,5). This is exactly where the exercise gets tricky. – raoulbia Oct 21 '10 at 23:13
@all thanks for your input, this got me started again. I'll get back to you once i've done some more testing and looping – raoulbia Oct 21 '10 at 23:14
@Baba: Primitive triples will have no common factor between a, b, and c. If a and b are relatively prime, c will be relatively prime, and if a and b share a factor so will c. Therefore, see if gcd(a, b) is 1. – David Thornley Oct 22 '10 at 16:02

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.