LCM for 6 and 89
What's the Least Common Multiple (LCM) of 6 and 89?
(Five hundred thirty-four)
Finding LCM for 6 and 89 using GCF's of these numbers
The first method to find LCM for numbers 6 and 89 is to find Greatest Common Factor (GCF) of these numbers. Here's the formula:
LCM = (Number1 × Number2) ÷ GCF
GCF of numbers 6 and 89 is 1, so
LCM = (6 × 89) ÷ 1
LCM = 534 ÷ 1
LCM = 534
Finding LCM for 6 and 89 by Listing Multiples
The second method to find LCM for numbers 6 and 89 is to list out the common multiples for both nubmers and pick the first which matching:
Multiples of 6: 6, 12, 18, 24, 30, 36, 42, 48, 54, 60, 66, 72, 78, 84, 90, 96, 102, 108, 114, 120, 126, 132, 138, 144, 150, 156, 162, 168, 174, 180, 186, 192, 198, 204, 210, 216, 222, 228, 234, 240, 246, 252, 258, 264, 270, 276, 282, 288, 294, 300, 306, 312, 318, 324, 330, 336, 342, 348, 354, 360, 366, 372, 378, 384, 390, 396, 402, 408, 414, 420, 426, 432, 438, 444, 450, 456, 462, 468, 474, 480, 486, 492, 498, 504, 510, 516, 522, 528, 534, 540, 546
Multiples of 89: 89, 178, 267, 356, 445, 534, 623, 712
So the LCM for 6 and 89 is 534
Finding LCM for 6 and 89 by Prime Factorization
Another method to find LCM for numbers 6 and 89 is to list all Prime Factors for both numbers and multiply the highest exponent prime factors:
All Prime Factors of 6: 2, 3 (exponent form: 21, 31)
All Prime Factors of 89: 89 (exponent form: 891)
21 × 31 × 891 = 534
LCM Table
Number 1 | Number 2 | LCM |
---|---|---|
1 | 89 | 89 |
2 | 89 | 178 |
3 | 89 | 267 |
4 | 89 | 356 |
5 | 89 | 445 |
6 | 89 | 534 |
7 | 89 | 623 |
8 | 89 | 712 |
9 | 89 | 801 |
10 | 89 | 890 |
11 | 89 | 979 |
12 | 89 | 1068 |
13 | 89 | 1157 |
14 | 89 | 1246 |
15 | 89 | 1335 |
16 | 89 | 1424 |
17 | 89 | 1513 |
18 | 89 | 1602 |
19 | 89 | 1691 |
20 | 89 | 1780 |
21 | 89 | 1869 |
22 | 89 | 1958 |
23 | 89 | 2047 |
24 | 89 | 2136 |
25 | 89 | 2225 |
26 | 89 | 2314 |
27 | 89 | 2403 |
28 | 89 | 2492 |
29 | 89 | 2581 |
30 | 89 | 2670 |
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