# Continue the search inside a DO loop

I wrote a simple FORTRAN code in order to do the following: assume we have to integer numbers n1 and n2 which have common divisors. For example 3 and 6 both are divided by 3. Here is the code

``````PROGRAM test

INTEGER i,n1,n2

WRITE(*,*)' Please enter two numbers: '

DO i=2,10,1
IF(MOD(n1,i).EQ.0.AND.MOD(n2,i).EQ.0)THEN
n1=n1/i
n2=n2/i
ENDIF
n1=n1
n2=n2
ENDDO

WRITE(*,*)n1,n2

PAUSE

END
``````

This works fine for the example (3,6). However, there are cases like (4,8) in which the numbers have more than one common divisor, in this case 2 and 4. Another example (16,24). I want to compute the maximum common divisor of the two numbers and then reduce them (i.e. 3,6 to 1 and 2), but the code returns the first one (4,8 returns to 2, 4 instead of 1,2). How should it be modified in order to calculate the maximum divisor?

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What about Euclid's Algorithm? –  Stefan Oct 7 '13 at 8:48
@Stefan How could this be incorporated to my simple code? Any suggestions? –  Vaggelis_Z Oct 7 '13 at 8:51

You could stay with an `i`, till your `if`-statement is `false`.

In other words:

If a number can be divided by `i`, then don't immediately go to `i+1`, but try to divide by `i` again.

EDIT: I think the easiest way is to use a `DO WHILE`-loop. To calculate the divisor, you have to multiply all your `i`.

``````gcd = 1
DO i=2,10,1
DO WHILE (MOD(n1,i).EQ.0.AND.MOD(n2,i).EQ.0)
n1=n1/i
n2=n2/i
gcd = gcd * i
ENDDO
ENDDO
WRITE(*,*) gcd
``````
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I thought of it! But again how this could be incorporated to my code? I mean the specific changes needed. –  Vaggelis_Z Oct 7 '13 at 8:56
Thanks! It's working fine. –  Vaggelis_Z Oct 7 '13 at 9:04

What you are looking for is the greatest common divisor. You may do this:

``````function gcd(a, b)
implicit none
integer a, b, aa, bb, cc, gcd

aa = abs(a)
bb = abs(b)
do while (bb .ne. 0)
cc = mod(aa, bb)
aa = bb
bb = cc
end do
gcd = aa
end
``````

Note: it is written in Fortran 77 + MIL-STD-1753 (for the DO WHILE construct and IMPLICIT NONE).

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