LCM (1,054; 3,162) = ? Calculate the least common multiple, LCM, by two methods: 1) Numbers' divisibility and 2) The prime factorization

lcm (1,054; 3,162) = ?

Method 1. The divisibility of numbers:

A number 'a' is divisible by a number 'b' if there is no remainder when 'a' is divided by 'b'.


Divide the larger number by the smaller one.


When we divide our numbers, there is no remainder:


3,162 ÷ 1,054 = 3 + 0


=> 3,162 = 1,054 × 3


=> 3,162 is divisible by 1,054.


=> 3,162 is a multiple of 1,054.


The smallest multiple of 3,162 is the number itself: 3,162.


The least common multiple:
lcm (1,054; 3,162) = 3,162


lcm (1,054; 3,162) = 3,162 = 2 × 3 × 17 × 31
3,162 is a multiple of 1,054

Method 2. The prime factorization:

The prime factorization of a number: finding the prime numbers that multiply together to make that number.


1,054 = 2 × 17 × 31
1,054 is not a prime number but a composite one.


3,162 = 2 × 3 × 17 × 31
3,162 is not a prime number but a composite one.


* The natural numbers that are only divisible by 1 and themselves are called prime numbers. A prime number has exactly two factors: 1 and itself.
* A composite number is a natural number that has at least one other factor than 1 and itself.



Calculate the least common multiple, lcm:

Multiply all the prime factors of the two numbers, taken by the largest exponents (largest powers).


lcm (1,054; 3,162) = 2 × 3 × 17 × 31



lcm (1,054; 3,162) = 2 × 3 × 17 × 31 = 3,162
3,162 contains all the prime factors of the number 1,054

The final answer:
The least common multiple
lcm (1,054; 3,162) = 3,162 = 2 × 3 × 17 × 31
3,162 is divisible by 1,054. 3,162 is a multiple of 1,054.
3,162 contains all the prime factors of the number 1,054

Why is it useful to calculate the least common multiple?

When adding, subtracting or sorting fractions with different denominators, in order to work with those fractions we must first make the denominators the same. An easy way is to calculate the least common multiple of all the denominators of the fractions (the least common denominator).


By definition, the least common multiple of two numbers is the smallest natural number that is: (1) greater than 0 and (2) a multiple of both numbers.


Other operations of this type:


Calculator: calculate the least common multiple, lcm

Calculate the least common multiple of the numbers, LCM:

Method 1: Run the prime factorization of the numbers - then multiply all the prime factors of the numbers, taken by the largest exponents.

Method 2: The Euclidean algorithm:
lcm (a; b) = (a × b) / gcf (a; b)

Method 3: The divisibility of the numbers.

The least common multiple, LCM: the latest calculated

The LCM of 1,054 and 3,162 = ? May 24 20:42 UTC (GMT)
The LCM of 92 and 6,540 = ? May 24 20:42 UTC (GMT)
The LCM of 50 and 40 = ? May 24 20:42 UTC (GMT)
The LCM of 50 and 40 = ? May 24 20:42 UTC (GMT)
The LCM of 40 and 4,378 = ? May 24 20:42 UTC (GMT)
The LCM of 63 and 46 = ? May 24 20:42 UTC (GMT)
The LCM of 266 and 318 = ? May 24 20:42 UTC (GMT)
The LCM of 200 and 480 = ? May 24 20:41 UTC (GMT)
The LCM of 4,329 and 25,974 = ? May 24 20:41 UTC (GMT)
The LCM of 624 and 3,120 = ? May 24 20:41 UTC (GMT)
The LCM of 193 and 1,608 = ? May 24 20:41 UTC (GMT)
The LCM of 2 and 3 = ? May 24 20:41 UTC (GMT)
The LCM of 4 and 36 = ? May 24 20:41 UTC (GMT)
The least common multiple, LCM: the list of all the operations

The least common multiple (lcm). What it is and how to calculate it.


What is a prime number? Definition, examples

What is a composite number? Definition, examples

The prime numbers up to 1,000

The prime numbers up to 10,000

The Sieve of Eratosthenes

The Euclidean Algorithm

Completely reduce (simplify) fractions to the lowest terms: Steps and Examples