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I am seeking for the easiest solution to get the greatest common divisor of multiple values. Something like:

x=gcd_array(30,40,35) % Should return 5
x=gcd_array(30,40) % Should return 10

How would you solve this?

Many thanks!

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possible duplicate of Euclidian greatest common divisor for more then two numbers –  starblue Jun 19 '12 at 11:42

3 Answers 3

 `% GCD OF list of Nos using Eucledian Alogorithm 
  function GCD= GCD(n);
  x=1;
  p=n;
  while(size(n,2))>=2
  p= n(:,size(n,2)-1:size(n,2));
  n=n(1,1:size(n,2)-2);
  x=1;
  while(x~=0)
  x= max(p)-min(p);
  p = [x,min(p)];
  end    
  n=[n,max(p)];
  p= [];
  end
  '
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Care to explain your solution? –  Everton Agner Nov 12 '14 at 20:30
1  
Function GCD takes list list of numbers as its argument Now , using gcd(a1,a2,a3)= gcd(a1,gcd(a2,a3). Store the last two numbers in different matrix P To calculate the GCD of P , use the algorithm gcd of a1 & a2= a1-a2 (a1-a2)-a2 and so on till u get 0 or 1 store the GCD value again in n so that now you have n = (a1,a2,a3............a(n-2),gcd(an-1,an)) –  user11948 Nov 13 '14 at 4:18

This may not be the most efficient method but start with your smallest number (we'll use your example of 30, 40) and try divide the larger number by it

mod(40,30)

if this equals zero then your answer is 30. If not divide your number by 2 so 30/2 = 15. Now try 15

mod(40,15)

still not zero so divide original number by 3 i.e. 30/3 = 10 and try 10

mod(40,10) == 0

so solution is ten.

It is easy to put in a loop and you can use recursion as has been suggested to handle multiple numbers.

so in summary this is the algorithm:

1) define L as your low number and H as your high number

2) set counter to 1

3) if MOD(H, L/counter) is zero then L/counter is your solution else increment counter and repeat

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This doesn't really answer the question originally posed. The preferred method of computing GCD is Euclid's algorithm (which is quite a bit more efficient than your approach) and is probably what MATLAB uses (re: the matlab tag). flec's answer is the correct approach to answering the question posed. –  andand Jun 19 '12 at 16:25

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