# Least common multiple for 3 or more numbers

How do you calculate the least common multiple of multiple numbers?

So far I've only been able to calculate it between two numbers. But have no idea how to expand it to calculate 3 or more numbers.

So far this is how I did it

``````LCM = num1 * num2 /  gcd ( num1 , num2 )
``````

With gcd is the function to calculate the greatest common divisor for the numbers. Using euclidean algorithm

But I can't figure out how to calculate it for 3 or more numbers.

• please don't tag this as homework. I'm trying to find a way to fit multiple pieces of metal sheets onto a plate and need to find a way to fit different length metal on the same plate. LCM and GCD is the best way to do this. I'ma programmer not a math guy. THat's why I asked.
– paan
Sep 29 '08 at 8:45
• Fitting small sheets into a larger sheet -- 2D bin packing ? Jan 28 '10 at 10:17
• @HighPerformanceMark Tetris? Feb 22 '17 at 14:54

You can compute the LCM of more than two numbers by iteratively computing the LCM of two numbers, i.e.

``````lcm(a,b,c) = lcm(a,lcm(b,c))
``````
• Ooooh textbook recursion :) Sep 30 '08 at 13:24
• a recursive algorithm definition does not necessarily mean a recursive subroutine. You can implement this in a loop pretty simply. Thanks for the perfect answer. Jun 27 '14 at 16:43

In Python (modified primes.py):

``````def gcd(a, b):
"""Return greatest common divisor using Euclid's Algorithm."""
while b:
a, b = b, a % b
return a

def lcm(a, b):
"""Return lowest common multiple."""
return a * b // gcd(a, b)

def lcmm(*args):
"""Return lcm of args."""
return reduce(lcm, args)
``````

Usage:

``````>>> lcmm(100, 23, 98)
112700
>>> lcmm(*range(1, 20))
232792560
``````

`reduce()` works something like that:

``````>>> f = lambda a,b: "f(%s,%s)" % (a,b)
>>> print reduce(f, "abcd")
f(f(f(a,b),c),d)
``````
• I'm not familiar with python, what does reduce() do?
– paan
Sep 29 '08 at 4:49
• Given a function f and a list l = [a,b,c,d], reduce(f,l) returns f(f(f(a,b),c),d). It's the functional implementation of "lcm can be computed by iteratively computing the lcm of the current value and the next element of the list." Sep 29 '08 at 4:53
• +1 for showing a solution that can adapt to more than three parameters Aug 4 '11 at 14:26
• can you make the lcm function behave like the lcmm function by reducing itself? My first thought is to make it do the lcm() when there are 2 arguments, and do the reduce() when there are more. Jun 14 '12 at 2:34
• @Hairy comma creates a tuple in Python. In this case, it is equivalent to: `t = a; a = b; b = t % b`
– jfs
Mar 8 '17 at 19:48

Here's an ECMA-style implementation:

``````function gcd(a, b){
// Euclidean algorithm
while (b != 0){
var temp = b;
b = a % b;
a = temp;
}
return a;
}

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

function lcmm(args){
// Recursively iterate through pairs of arguments
// i.e. lcm(args, lcm(args, lcm(args, args)))

if(args.length == 2){
return lcm(args, args);
} else {
var arg0 = args;
args.shift();
return lcm(arg0, lcmm(args));
}
}
``````
• It feels bad that I don't understand what you mean by "ECMA-style" =/ Jan 10 '12 at 12:48

I would go with this one (C#):

``````static long LCM(long[] numbers)
{
return numbers.Aggregate(lcm);
}
static long lcm(long a, long b)
{
return Math.Abs(a * b) / GCD(a, b);
}
static long GCD(long a, long b)
{
return b == 0 ? a : GCD(b, a % b);
}
``````

Just some clarifications, because at first glance it doesn't seams so clear what this code is doing:

Aggregate is a Linq Extension method, so you cant forget to add using System.Linq to your references.

Aggregate gets an accumulating function so we can make use of the property lcm(a,b,c) = lcm(a,lcm(b,c)) over an IEnumerable. More on Aggregate

GCD calculation makes use of the Euclidean algorithm.

lcm calculation uses Abs(a*b)/gcd(a,b) , refer to Reduction by the greatest common divisor.

Hope this helps,

I just figured this out in Haskell:

``````lcm' :: Integral a => a -> a -> a
lcm' a b = a`div`(gcd a b) * b
lcm :: Integral a => [a] -> a
lcm (n:ns) = foldr lcm' n ns
``````

I even took the time to write my own `gcd` function, only to find it in Prelude! Lots of learning for me today :D

• You can use foldr1 for the last line: `lcm ns = foldr1 lcm' ns` or `lcm = foldr1 lcm'` Feb 28 '13 at 5:20
• You can also dispense with the type signatures, for a really minimal result, as `Integral` is implied by `div` Feb 28 '13 at 5:24

Some Python code that doesn't require a function for gcd:

``````from sys import argv

def lcm(x,y):
tmp=x
while (tmp%y)!=0:
tmp+=x
return tmp

def lcmm(*args):
return reduce(lcm,args)

args=map(int,argv[1:])
print lcmm(*args)
``````

Here's what it looks like in the terminal:

``````\$ python lcm.py 10 15 17
510
``````

Here is a Python one-liner (not counting imports) to return the LCM of the integers from 1 to 20 inclusive:

Python 3.5+ imports:

``````from functools import reduce
from math import gcd
``````

Python 2.7 imports:

``````from fractions import gcd
``````

Common logic:

``````lcm = reduce(lambda x,y: x*y // gcd(x, y), range(1, 21))
``````

Note that in both Python 2 and Python 3, operator precedence rules dictate that the `*` and `//` operators have the same precedence, and so they apply from left to right. As such, `x*y // z` means `(x*y) // z` and not `x * (y//z)`. The two typically produce different results. This wouldn't have mattered as much for float division but it does for floor division.

Here it is in Swift.

``````// Euclid's algorithm for finding the greatest common divisor
func gcd(_ a: Int, _ b: Int) -> Int {
let r = a % b
if r != 0 {
return gcd(b, r)
} else {
return b
}
}

// Returns the least common multiple of two numbers.
func lcm(_ m: Int, _ n: Int) -> Int {
return m / gcd(m, n) * n
}

// Returns the least common multiple of multiple numbers.
func lcmm(_ numbers: [Int]) -> Int {
return numbers.reduce(1) { lcm(\$0, \$1) }
}
``````

Here is a C# port of Virgil Disgr4ce's implemenation:

``````public class MathUtils
{
/// <summary>
/// Calculates the least common multiple of 2+ numbers.
/// </summary>
/// <remarks>
/// Uses recursion based on lcm(a,b,c) = lcm(a,lcm(b,c)).
/// Ported from http://stackoverflow.com/a/2641293/420175.
/// </remarks>
public static Int64 LCM(IList<Int64> numbers)
{
if (numbers.Count < 2)
throw new ArgumentException("you must pass two or more numbers");
return LCM(numbers, 0);
}

public static Int64 LCM(params Int64[] numbers)
{
return LCM((IList<Int64>)numbers);
}

private static Int64 LCM(IList<Int64> numbers, int i)
{
// Recursively iterate through pairs of arguments
// i.e. lcm(args, lcm(args, lcm(args, args)))

if (i + 2 == numbers.Count)
{
return LCM(numbers[i], numbers[i+1]);
}
else
{
return LCM(numbers[i], LCM(numbers, i+1));
}
}

public static Int64 LCM(Int64 a, Int64 b)
{
return (a * b / GCD(a, b));
}

/// <summary>
/// Finds the greatest common denominator for 2 numbers.
/// </summary>
/// <remarks>
/// Also from http://stackoverflow.com/a/2641293/420175.
/// </remarks>
public static Int64 GCD(Int64 a, Int64 b)
{
// Euclidean algorithm
Int64 t;
while (b != 0)
{
t = b;
b = a % b;
a = t;
}
return a;
}
}'
``````

Function to find lcm of any list of numbers:

`````` def function(l):
s = 1
for i in l:
s = lcm(i, s)
return s
``````

Using LINQ you could write:

``````static int LCM(int[] numbers)
{
return numbers.Aggregate(LCM);
}

static int LCM(int a, int b)
{
return a * b / GCD(a, b);
}
``````

Should add `using System.Linq;` and don't forget to handle the exceptions ...

And the Scala version:

``````def gcd(a: Int, b: Int): Int = if (b == 0) a else gcd(b, a % b)
def gcd(nums: Iterable[Int]): Int = nums.reduce(gcd)
def lcm(a: Int, b: Int): Int = if (a == 0 || b == 0) 0 else a * b / gcd(a, b)
def lcm(nums: Iterable[Int]): Int = nums.reduce(lcm)
``````

you can do it another way - Let there be n numbers.Take a pair of consecutive numbers and save its lcm in another array. Doing this at first iteration program does n/2 iterations.Then next pick up pair starting from 0 like (0,1) , (2,3) and so on.Compute their LCM and store in another array. Do this until you are left with one array. (it is not possible to find lcm if n is odd)

In R, we can use the functions mGCD(x) and mLCM(x) from the package numbers, to compute the greatest common divisor and least common multiple for all numbers in the integer vector x together:

``````    library(numbers)
mGCD(c(4, 8, 12, 16, 20))
 4
mLCM(c(8,9,21))
 504
# Sequences
mLCM(1:20)
 232792560
``````

ES6 style

``````function gcd(...numbers) {
return numbers.reduce((a, b) => b === 0 ? a : gcd(b, a % b));
}

function lcm(...numbers) {
return numbers.reduce((a, b) => Math.abs(a * b) / gcd(a, b));
}
``````
• You called `gcd(a, b)` but the `gdc` function expects an array so you meant to call `gcd([a, b])` Jan 14 '15 at 16:58
• this is the most elegant answer by far Jan 16 '19 at 1:33

Just for fun, a shell (almost any shell) implementation:

``````#!/bin/sh
gcd() {   # Calculate \$1 % \$2 until \$2 becomes zero.
until [ "\$2" -eq 0 ]; do set -- "\$2" "\$((\$1%\$2))"; done
echo "\$1"
}

lcm() {   echo "\$(( \$1 / \$(gcd "\$1" "\$2") * \$2 ))";   }

while [ \$# -gt 1 ]; do
t="\$(lcm "\$1" "\$2")"
shift 2
set -- "\$t" "\$@"
done
echo "\$1"
``````

try it with:

``````\$ ./script 2 3 4 5 6
``````

to get

``````60
``````

The biggest input and result should be less than `(2^63)-1` or the shell math will wrap.

i was looking for gcd and lcm of array elements and found a good solution in the following link.

https://www.hackerrank.com/challenges/between-two-sets/forum

which includes following code. The algorithm for gcd uses The Euclidean Algorithm explained well in the link below.

``````private static int gcd(int a, int b) {
while (b > 0) {
int temp = b;
b = a % b; // % is remainder
a = temp;
}
return a;
}

private static int gcd(int[] input) {
int result = input;
for (int i = 1; i < input.length; i++) {
result = gcd(result, input[i]);
}
return result;
}

private static int lcm(int a, int b) {
return a * (b / gcd(a, b));
}

private static int lcm(int[] input) {
int result = input;
for (int i = 1; i < input.length; i++) {
result = lcm(result, input[i]);
}
return result;
}
``````

Here is the PHP implementation:

``````    // https://stackoverflow.com/q/12412782/1066234
function math_gcd(\$a,\$b)
{
\$a = abs(\$a);
\$b = abs(\$b);
if(\$a < \$b)
{
list(\$b,\$a) = array(\$a,\$b);
}
if(\$b == 0)
{
return \$a;
}
\$r = \$a % \$b;
while(\$r > 0)
{
\$a = \$b;
\$b = \$r;
\$r = \$a % \$b;
}
return \$b;
}

function math_lcm(\$a, \$b)
{
return (\$a * \$b / math_gcd(\$a, \$b));
}

// https://stackoverflow.com/a/2641293/1066234
function math_lcmm(\$args)
{
// Recursively iterate through pairs of arguments
// i.e. lcm(args, lcm(args, lcm(args, args)))

if(count(\$args) == 2)
{
return math_lcm(\$args, \$args);
}
else
{
\$arg0 = \$args;
array_shift(\$args);
return math_lcm(\$arg0, math_lcmm(\$args));
}
}

// fraction bonus
function math_fraction_simplify(\$num, \$den)
{
\$g = math_gcd(\$num, \$den);
return array(\$num/\$g, \$den/\$g);
}

var_dump( math_lcmm( array(4, 7) ) ); // 28
var_dump( math_lcmm( array(5, 25) ) ); // 25
var_dump( math_lcmm( array(3, 4, 12, 36) ) ); // 36
var_dump( math_lcmm( array(3, 4, 7, 12, 36) ) ); // 252
``````

Credits go to @T3db0t with his answer above (ECMA-style code).

GCD needs a little correction for negative numbers:

``````def gcd(x,y):
while y:
if y<0:
x,y=-x,-y
x,y=y,x % y
return x

def gcdl(*list):
return reduce(gcd, *list)

def lcm(x,y):
return x*y / gcd(x,y)

def lcml(*list):
return reduce(lcm, *list)
``````

``````from operator import mul as MULTIPLY

def factors(n):
f = {} # a dict is necessary to create 'factor : exponent' pairs
divisor = 2
while n > 1:
while (divisor <= n):
if n % divisor == 0:
n /= divisor
f[divisor] = f.get(divisor, 0) + 1
else:
divisor += 1
return f

def mcm(numbers):
#numbers is a list of numbers so not restricted to two items
high_factors = {}
for n in numbers:
fn = factors(n)
for (key, value) in fn.iteritems():
if high_factors.get(key, 0) < value: # if fact not in dict or < val
high_factors[key] = value
return reduce (MULTIPLY, ((k ** v) for k, v in high_factors.items()))
``````

We have working implementation of Least Common Multiple on Calculla which works for any number of inputs also displaying the steps.

What we do is:

``````0: Assume we got inputs[] array, filled with integers. So, for example:
inputsArray = [6, 15, 25, ...]
lcm = 1

1: Find minimal prime factor for each input.
Minimal means for 6 it's 2, for 25 it's 5, for 34 it's 17
minFactorsArray = []

2: Find lowest from minFactors:
minFactor = MIN(minFactorsArray)

3: lcm *= minFactor

4: Iterate minFactorsArray and if the factor for given input equals minFactor, then divide the input by it:
for (inIdx in minFactorsArray)
if minFactorsArray[inIdx] == minFactor
inputsArray[inIdx] \= minFactor

5: repeat steps 1-4 until there is nothing to factorize anymore.
So, until inputsArray contains only 1-s.
``````

And that's it - you got your lcm.

LCM is both associative and commutative.

LCM(a,b,c)=LCM(LCM(a,b),c)=LCM(a,LCM(b,c))

here is sample code in C:

``````int main()
{
int a,i,n,result=1;  // assumption: count can't exceed 20
printf("Enter number of numbers to calculate LCM(less than 20):");
scanf("%d",&n);
printf("Enter %d  numbers to calculate their LCM :",n);
for(i=0;i<n;i++)
scanf("%d",&a[i]);
for(i=0;i<n;i++)
result=lcm(result,a[i]);
printf("LCM of given numbers = %d\n",result);
return 0;
}

int lcm(int a,int b)
{
int gcd=gcd_two_numbers(a,b);
return (a*b)/gcd;
}

int gcd_two_numbers(int a,int b)
{
int temp;
if(a>b)
{
temp=a;
a=b;
b=temp;
}
if(b%a==0)
return a;
else
return gcd_two_numbers(b%a,a);
}
``````

Method compLCM takes a vector and returns LCM. All the numbers are within vector in_numbers.

``````int mathOps::compLCM(std::vector<int> &in_numbers)
{
int tmpNumbers = in_numbers.size();
int tmpMax = *max_element(in_numbers.begin(), in_numbers.end());
bool tmpNotDividable = false;

while (true)
{
for (int i = 0; i < tmpNumbers && tmpNotDividable == false; i++)
{
if (tmpMax % in_numbers[i] != 0 )
tmpNotDividable = true;
}

if (tmpNotDividable == false)
return tmpMax;
else
tmpMax++;
}
}
``````
``````clc;

data = [1 2 3 4 5]

LCM=1;

for i=1:1:length(data)

LCM = lcm(LCM,data(i))

end
``````
• Code is appreciated, but if you can add comments detailing how it works it's appreciated even more. Jun 7 '15 at 11:58
• While this code snippet may solve the question, including an explanation really helps to improve the quality of your post. Remember that you are answering the question for readers in the future, not just the person asking now! Please edit your answer to add explanation, and give an indication of what limitations and assumptions apply. Nov 2 '16 at 18:25

For anyone looking for quick working code, try this:

I wrote a function `lcm_n(args, num)` which computes and returns the lcm of all the numbers in the array `args`. The second parameter`num` is the count of numbers in the array.

Put all those numbers in an array `args` and then call the function like `lcm_n(args,num);`

This function returns the lcm of all those numbers.

Here is the implementation of the function `lcm_n(args, num)`:

``````int lcm_n(int args[], int num) //lcm of more than 2 numbers
{
int i, temp[num-1];

if(num==2)
{
return lcm(args, args);
}
else
{
for(i=0;i<num-1;i++)
{
temp[i] = args[i];
}

temp[num-2] = lcm(args[num-2], args[num-1]);
return lcm_n(temp,num-1);
}
}
``````

This function needs below two functions to work. So, just add them along with it.

``````int lcm(int a, int b) //lcm of 2 numbers
{
return (a*b)/gcd(a,b);
}

int gcd(int a, int b) //gcd of 2 numbers
{
int numerator, denominator, remainder;

//Euclid's algorithm for computing GCD of two numbers
if(a > b)
{
numerator = a;
denominator = b;
}
else
{
numerator = b;
denominator = a;
}
remainder = numerator % denominator;

while(remainder != 0)
{
numerator   = denominator;
denominator = remainder;
remainder   = numerator % denominator;
}

return denominator;
}
``````

```int gcd(int a, int b) { if (b == 0) return a; return gcd(b, a%b); } int lcm(int[] a, int n) { int res = 1, i; for (i = 0; i < n; i++) { res = res*a[i]/gcd(res, a[i]); } return res; }```

In python:

``````def lcm(*args):
"""Calculates lcm of args"""
biggest = max(args) #find the largest of numbers
rest = [n for n in args if n != biggest] #the list of the numbers without the largest
factor = 1 #to multiply with the biggest as long as the result is not divisble by all of the numbers in the rest
while True:
#check if biggest is divisble by all in the rest:
ans = False in [(biggest * factor) % n == 0 for n in rest]
#if so the clm is found break the loop and return it, otherwise increment factor by 1 and try again
if not ans:
break
factor += 1
biggest *= factor
return "lcm of {0} is {1}".format(args, biggest)
``````

``````>>> lcm(100,23,98)
'lcm of (100, 23, 98) is 112700'
>>> lcm(*range(1, 20))
'lcm of (1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19) is 232792560'
``````

This is what I used --

``````def greater(n):

a=num

for i in range(0,len(n),1):
if(a<n[i]):
a=n[i]
return a

r=input('enter limit')

num=[]

for x in range (0,r,1):

a=input('enter number ')
num.append(a)
a= greater(num)

i=0

while True:

while (a%num[i]==0):
i=i+1
if(i==len(num)):
break
if i==len(num):
print 'L.C.M = ',a
break
else:
a=a+1
i=0
``````

for python 3:

``````from functools import reduce

gcd = lambda a,b: a if b==0 else gcd(b, a%b)
def lcm(lst):
return reduce(lambda x,y: x*y//gcd(x, y), lst)
``````

In Ruby, it's as simple as:

``````> [2, 3, 4, 6].reduce(:lcm)
=> 12

> [16, 32, 96].reduce(:gcd)
=> 16
``````

(tested on Ruby 2.2.10 and 2.6.3.)