# How to get the (Greatest Common Divisor)GCD of Doubles

This is a simple task but i can't seem to figure out how to do it

Here is a sample function structure

private double GetGCD(double num1, double num2)
{
//should return the GCD of the two double
}

test data

num1 = 6;
num2 = 3;
*return value must be 3*

num1 = 8.8;
num2 = 6.6;
*return value must be 2.2*

num1 = 5.1;
num2 = 8.5;
*return value must be 1.7*

note: maximum decimal places is 1. programming language is not important. i just need the algorthm

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If you have only one decimal place, multiply the numbers by 10, convert them to integers and run an integer GCD function.

This will also save you floating point precision errors.

Quoting this answer, the base Euclidean algorithm in Python (for integers!) is:

def gcd(a, b):
"""Calculate the Greatest Common Divisor of a and b.

Unless b==0, the result will have the same sign as b (so that when
b is divided by it, the result comes out positive).
"""
while b:
a, b = b, a%b
return a

So, your code should be something like:

def gcd_floats(x,y):
return gcd( int(x*10), int(y*10) )/10
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can you help me with the algo.. im really stumped. i think i deteriorated in math =( –  Philip Badilla Feb 22 '12 at 9:29
Look it up in the attached link, or search for GCD algorithm. Almost any algorithms you'll find is designed for integers. –  Adam Matan Feb 22 '12 at 9:31
made this one and it works! thanks private int GCD(int a, int b) { if (b == 0) return a; else return GCD(b, a % b); } –  Philip Badilla Feb 22 '12 at 10:51

There are zillions of places on the web to find code for the GCD function. Since, strictly speaking, it is only defined on integers, I suggest you multiply your doubles by 10, work out the GCD and divide the result by 10. This will save you a world of pain arising from using the wrong datatype.

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here is a source from google with some java code : http://www.merriampark.com/gcd.htm this is pretty comprehensive.

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When it's 8.8 and 6.6 then you can find the GCD of 88 and 66 and then divide it by 10.

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There is no such thing as the GCD of a number which is not discrete. However, your case is more specific. If your input is not a Double, but a Decimal, then you can convert it to a Fraction, multiply the denominators, find the GCD of the numerators and divide back down. That is:

8.800 = 8800/1000 = 44/5 (by GCD)
6.600 = 6600/1000 = 33/5 (by GCD)

5.100 = 5100/1000 = 51/10
8.500 = 8500/1000 = 17/2

It's useful to simplify the fractions in this step in order to avoid our numbers getting too large.

Move to a common denominator:

44*5/5*5 = 220/25
33*5/5*5 = 165/25

51*2/2*10 = 102/20
17*10/2*10 = 170/20

GCD of numerator:

gcd(165,220) = 55

gcd(102,170) = 34

So answers are 55/25 and 34/20.

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Using 2 methods

2. Euclid's method

class GCD
{
public static void main(String[] args)
{
int a = (int)(1.2*10);
int b = (int)(3.4*10);

System.out.println((float)gcd(a, b)/10);
}
// 1

public static int gcd(int a, int b)
{
if(b==0)
return a;
else
return gcd(b, (int)a%b);
}

// 2
public static int gcd(int a, int b)
{
int k,i;

if(a>b)
k = b;
else
k = a;

for(i=k; i>=2; i--)
{
if( (a%i==0)&&(b%i==0) )
{
break;
}
}
return i;
}
}
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