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,

**EDIT**

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 :)

Thanks

Baba

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

`a`

,`b`

and`c`

have to be integers to make it clear for everyone. – Jacob Oct 21 '10 at 20:58