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Least Common Multiple and Greatest Common Factor: Finding LCM and GCF, Study notes of Elementary Mathematics

Texas Christian University (TCU)Elementary Mathematics

The concept of least common multiples (lcm) and greatest common factors (gcf) with examples and steps to find them using the list of numbers and prime factorization. It also highlights the difference between lcm and gcf.

What you will learn

  • How to find the least common multiple (LCM) using the list of numbers?
  • What is the least common multiple (LCM) of two numbers?
  • How to find the least common multiple (LCM) using prime factorization?

Typology: Study notes

2021/2022

Uploaded on 09/12/2022

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mortimer 🇺🇸

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LEAST COMMON MULTIPLE AND
GREATEST COMMON FACTOR
LEAST COMMON MULTIPLE (Most popular as “LCM”)
Lets start this section recalling what are “the multiples of a number”.
The multiples of a number are the products of the number and the numbers “1,2,3,4…”
For instance:
8 . 1 = 8
8 . 2 = 16
8 . 3 = 24
8 . 4 = 32
8 . 5 = 40
8 . 6 = 48
8 . 7 = 56
8 . 8 = 64
8 . 9 = 72
8 . 10 = 80
All the results above (8,16,24,32,40,48,56,64,72,80…) are multi ple of 8.
Now, lets check the multiples of 6:
6 . 1 = 6
6 . 2 = 12
6 . 3 = 18
6 . 4 = 24
6 . 5 = 30
6 . 6 = 36
6 . 7 = 42
6 . 8 = 48
6 . 9 = 54
6 . 10 = 60
6 . 11 = 66
6 . 12 = 72
The multiples of 6 are: 6,12,18,24,30,36,42,48,54,60,66,72
Did you realize 24,48 and 72 are common multiples of 8 and 6?
But what is a Least common mult iple?
Math0300
Student Learning Assistance Center - San Antonio College
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LEAST COMMON MULTIPLE AND

GREATEST COMMON FACTOR

LEAST COMMON MULTIPLE (Most popular as “ LCM ”)

Lets start this section recalling what are “the multiples of a number”. The multiples of a number are the products of the number and the numbers “1,2,3,4…” For instance:

  1. 1 = 8
  2. 2 = 16
  3. 3 = 24
  4. 4 = 32
  5. 5 = 40
  6. 6 = 48
  7. 7 = 56
  8. 8 = 64
  9. 9 = 72
  10. 10 = 80

All the results above (8,16, 24 ,32,40, 48 ,56,64, 72 ,80…) are multiple of 8.

Now, lets check the multiples of 6:

  1. 1 = 6
  2. 2 = 12
  3. 3 = 18
  4. 4 = 24
  5. 5 = 30
  6. 6 = 36
  7. 7 = 42
  8. 8 = 48
  9. 9 = 54
  10. 10 = 60
  11. 11 = 66
  12. 12 = 72

The multiples of 6 are: 6,12,18, 24 ,30,36,42, 48 ,54,60,66, 72

Did you realize 24,48 and 72 are common multiples of 8 and 6?

But what is a Least common multiple?

Math

Student Learning Assistance Center - San Antonio College 1

It is the least number among the common multiples.

Since the least number among 24, 48 and 72 is “ 24 ”, the LCM of 8 and 6 is 24.

We can find the LCM using the list of numbers (as we did), or using the prime factorization (or bases) of each number.

To find the LCM of 8 and 6 using prime factorization (or bases of the numbers):

Write the prime factorization (bases) of each number 6 = 2. 3 8 = 2.2.2= 2^3

Circle the HIGHEST power of each prime factor. 6 = 2. 3 8 = 23

The LCM is the product of the emboldened factors: 3. 2^3 = 24

GREATEST COMMON FACTOR (Most popular known as GCF )

We need to recall what is a factor of a number. The factor of a number is a number that divides another number evenly.

24 can be divided by 1,2,3,4,6 ,8, 12 and 24. So 1,2,3,6, 8,12 and 24 are factors of 24.

36 can be divided by 1,2,3,4,6 ,9, 12 ,18 and 36. So 1,2,3,4,6,9,12 and 36 are factors of 36

Did you realize that 1,2,3,4,6,and 12 are common factors of 24 and 36? So the greatest common factor of 24 and 36 is 12

We can find the GCF using the list of factors (as we did), or using the prime factorization of each number.

To find the GCF of 24 and 36 using factorization:

Write the prime factorization (bases) of each number 24 = 2^3. 3 36 = 2^2. 3^2

Select the LOWEST power of each prime factor. 24 = 2^3. 3 36 = 22. 3^2 (These are the bold numbers)

The GCF is the product of the selected factors: 22. 3 = 12

Math

Student Learning Assistance Center - San Antonio College 2