# Greatest common divisor of multiple (more than 2) numbers

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

``````gcd(a,b,c) = gcd(a,gcd(b,c))
``````

Which means you can use recursion.

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`````` `% 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
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