LCM for 924 and 396
What's the Least Common Multiple (LCM) of 924 and 396?
(Two thousand, seven hundred seventy-two)
Finding LCM for 924 and 396 using GCF's of these numbers
The first method to find LCM for numbers 924 and 396 is to find Greatest Common Factor (GCF) of these numbers. Here's the formula:
LCM = (Number1 × Number2) ÷ GCF
GCF of numbers 924 and 396 is 132, so
LCM = (924 × 396) ÷ 132
LCM = 365904 ÷ 132
LCM = 2772
Finding LCM for 924 and 396 by Listing Multiples
The second method to find LCM for numbers 924 and 396 is to list out the common multiples for both nubmers and pick the first which matching:
Multiples of 924: 924, 1848, 2772, 3696, 4620
Multiples of 396: 396, 792, 1188, 1584, 1980, 2376, 2772, 3168, 3564
So the LCM for 924 and 396 is 2772
Finding LCM for 924 and 396 by Prime Factorization
Another method to find LCM for numbers 924 and 396 is to list all Prime Factors for both numbers and multiply the highest exponent prime factors:
All Prime Factors of 924: 2, 2, 3, 7, 11 (exponent form: 22, 31, 71, 111)
All Prime Factors of 396: 2, 2, 3, 3, 11 (exponent form: 22, 32, 111)
22 × 32 × 71 × 111 = 2772
Related Calculations
See Also
- Greatest Common Factor - Find the Greatest Common Factor (GCF) of two numbers
LCM Table
Number 1 | Number 2 | LCM |
---|---|---|
909 | 396 | 39996 |
910 | 396 | 180180 |
911 | 396 | 360756 |
912 | 396 | 30096 |
913 | 396 | 32868 |
914 | 396 | 180972 |
915 | 396 | 120780 |
916 | 396 | 90684 |
917 | 396 | 363132 |
918 | 396 | 20196 |
919 | 396 | 363924 |
920 | 396 | 91080 |
921 | 396 | 121572 |
922 | 396 | 182556 |
923 | 396 | 365508 |
924 | 396 | 2772 |
925 | 396 | 366300 |
926 | 396 | 183348 |
927 | 396 | 40788 |
928 | 396 | 91872 |
929 | 396 | 367884 |
930 | 396 | 61380 |
931 | 396 | 368676 |
932 | 396 | 92268 |
933 | 396 | 123156 |
934 | 396 | 184932 |
935 | 396 | 33660 |
936 | 396 | 10296 |
937 | 396 | 371052 |
938 | 396 | 185724 |
About "Least Common Multiple" Calculator
Least Common Multiple (LCM) also known as the Lowest Common Multiple or Smallest Common Multiple of 2 numbers - it is the smallest positive integer that is divisible by both numbers