# Least Common Multiple of an array values using Euclidean Algorithm

I want to calculate the least common multiple of an array of values, using Euclideans algorithm

I am using this pseudocode implementation: found on wikipedia

``````function gcd(a, b)
while b ≠ 0
t := b;
b := a mod b;
a := t;
return a;
``````

My javascript implementation is such

``````function smallestCommons(arr) {

var gcm = arr.reduce(function(a,b){

let minNum = Math.min(a,b);
let maxNum = Math.max(a,b);
var placeHolder = 0;

while(minNum!==0){
placeHolder = maxNum;
maxNum = minNum;
minNum = placeHolder%minNum;
}

return (a*b)/(minNum);
},1);

return gcm;
}

smallestCommons([1,2,3,4,5]);
``````

I get error, on my whileloop

Infinite loop

EDIT Some corrections were made, at the end of gcm function, I used 0 as the initial start value, it should be 1, since you can't have a gcm from 0.

EDIT2 The expected output should be 60, since thats the least common multiple of 1,2,3,4,5

### With ES6

``````const gcd = (a, b) => a ? gcd(b % a, a) : b;

const lcm = (a, b) => a * b / gcd(a, b);
``````

Then use reduce on given array of integers:

``````[1, 2, 3, 4, 5].reduce(lcm); // Returns 60
``````

### With ES5

``````var gcd = function (a, b) {
return a ? gcd(b % a, a) : b;
}

var lcm = function (a, b) {
return a * b / gcd(a, b);
}
``````

Then use reduce on given array of integers:

``````[1, 2, 3, 4, 5].reduce(lcm); // Returns 60
``````
• Beautiful because stunningly short and to the point. Best answer IMO. Commented Sep 23, 2018 at 10:19
• I really like how concise the ES6 version is! Great work, Елин Й.! Commented Dec 13, 2019 at 1:40
• Superb clean solution, I'm very impressed :) Commented May 21, 2020 at 8:39

Did you intentionally tangle all variables and operator sequence? ;-)

``````  while(minNum!==0){
placeHolder = minNum;
minNum = maxNum % minNum;
maxNum = placeHolder;
}

//here maxNum = GCD(a,b)

return (a*b) / (maxNum);  //LCM
``````
• probably since I wrote the formula after watching a video, then looked at wiki ;s Commented Nov 2, 2017 at 3:41