# least common divisors

What I am trying is write recursive function which returns the least common divisor or for example let's take 150 and 125, the greatest common divisor is 25 while the least common divisor is 5. Once again I need a recursive function in direct method it is trivial.

-
I would rather say 1 is the least common factor. –  Gumbo Jul 21 '10 at 20:11
no 1 not i meant all number >1 –  dato datuashvili Jul 21 '10 at 20:16
c = gcd(a, b) what_you_are_looking_for = a/c –  getekha Jul 21 '10 at 20:19
@getekha - gcd(150, 125) = 25. 150 / 25 = 6. 6 is not a divisor of 125. –  IVlad Jul 21 '10 at 20:28
Show some effort and we'll help. We won't just do your homework for you. –  Gordon Gustafson Jul 21 '10 at 20:31

Test every number until `sqrt(min(a, b))`: if the numbers are both divisible by it, you found it. You can only test primes if you want.

If you haven't found any such number, then check if the other number is a multiple of the minimum: if yes, the minimum of the two is the solution. Otherwise, there's no solution.

You can do better. You can go only up to `sqrt(gcd(a, b))`. That should be fast enough.

-

if you want to find the `least common factor` of an array elements, you can first compute the `GCD` of all the elements and then find the `least prime factor` of the `GCD` obtained...

to get the gcd of all array elements:-

``````g=arr[0];
for(i=1;i<arr.length();i++)
g=gcd(g,arr[i]);
``````

now, to get the least prime factor loop till `sqrt(g)`

``````for(i=2;i<=sqrt(g);i++)
if(g%i==0)
return g
``````
-