LCM( 45, 60, 150 ) = 900
Step 1: Write down factorisation of each number:
45 = 3 · 3 · 5
60 = 2 · 2 · 3 · 5
150 = 2 · 3 · 5 · 5
Step 2 : Match primes vertically:
45 | = | 3 | · | 3 | · | 5 | ||||||
60 | = | 2 | · | 2 | · | 3 | · | 5 | ||||
150 | = | 2 | · | 3 | · | 5 | · | 5 |
Step 3 : Bring down numbers in each column and multiply to get LCM:
45 | = | 3 | · | 3 | · | 5 | ||||||||
60 | = | 2 | · | 2 | · | 3 | · | 5 | ||||||
150 | = | 2 | · | 3 | · | 5 | · | 5 | ||||||
LCM | = | 2 | · | 2 | · | 3 | · | 3 | · | 5 | · | 5 | = | 900 |
This solution can be visualized using a Venn diagram.
The LCM is equal to the product of all the numbers on the diagram.