What is the LCM of 4 and 6

Answer: The least common multiple (LCM) is the lowest (least) positive number which may be split into two or more numbers without leaving a remainder. You can discover it by listing the multiples of the given values in sequence. You would write 6, 12, 18, 24, etc., for the number 6. For the number 4, you would write 4, 8, 12, 16, 20, and 24. 

Then you get the minimum positive integer that both sets have in common. It is 12 in this situation. As you’ll see, the number 12 is the first to appear in each set. Although the number 24 is common, this is not the first prevalent multiple; hence the solution is 12. Prime factorisation, which may be the breakdown of a quantity into prime (means simply divisible by itself and 1) components, is another way to calculate an LCM. 

The number 6 is split into 3 and 2 (3×2=6). Two (2) and two (2) equal four (4) (2×2=4). Then multiply each variable by the number of times it appears in each range of criteria. Because two appear only once in 6 factors but twice in 4, we multiply two by two because twice is multiple times. 

The only other value in such distinct sets is 3, which appears just once in 6’s factors. Therefore we multiply three by 1. Now we multiply all of the selected numbers altogether. Because 2x2x3x1 equals 12, the LCM of 6 and 4 is 12.