Least common multiple

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In arithmetic and number theory the least common multiple or lowest common multiple (lcm) or smallest common multiple of two integers a and b is the smallest positive integer that is a multiple of both a and b. If there is no such positive integer, e.g., if a = 0 or b = 0, then lcm(a, b) is defined to be zero.

For example, the least common multiple of the numbers 4 and 6 is 12.

When adding or subtracting vulgar fractions, it is useful to find the least common multiple of the denominators, often called the lowest common denominator. For instance,

{2\over21}+{1\over6}={4\over42}+{7\over42}={11\over42},

where the denominator 42 was used because lcm(21, 6) = 42.

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If a and b are not both zero, the least common multiple can be computed by using the greatest common divisor (gcd) of a and b:

\operatorname{lcm}(a,b)=\frac{a\cdot b}{\operatorname{gcd}(a,b)}.

Thus, the Euclidean algorithm for the gcd also gives us a fast algorithm for the lcm. To return to the example above,

\operatorname{lcm}(21,6) ={21\cdot6\over\operatorname{gcd}(21,6)} ={21\cdot 6\over 3}={126\over 3}=42.

Because (ab)/c = a(b/c) = (a/c)b, one can calculate the lcm using the above formula more efficiently, by first exploiting the fact that b/c or a/c will be easier to calculate than the quotient of the product ab and c, because the fact that c is a factor of both a and b entails that in either fraction, a/c or b/c, one can completely cancel the c. This can be true whether the calculations are performed by a human, or a computer, which may have storage requirements on the variables a, b, c, where the limits may be 4-byte storage - calculating ab may cause an overflow, if storage space is not allocated properly.

Using this, we can then calculate the lcm by either using:

\operatorname{lcm}(a,b)=\left({a\over\operatorname{gcd}(a,b)}\right)\cdot b

or

\operatorname{lcm}(a,b)=\left({b\over\operatorname{gcd}(a,b)}\right)\cdot a

Done this way, the previous example becomes:

\operatorname{lcm}(21,6)={21\over\operatorname{gcd}(21,6)}\cdot6={21\over3}\cdot6=7\cdot6=42.

Even if the numbers are large and not quickly factorable, the gcd can be calculated quickly with Euclid's algorithm.

The unique factorization theorem says that every positive integer number greater than 1 can be written in only one way as a product of prime numbers. The prime numbers can be considered as the atomic elements which, when combined together, make up a composite number.

For example:

90 = 2^1 \cdot 3^2 \cdot 5^1 = 2 \cdot 9 \cdot 5. \,\!

Here we have the composite number 90 made up of one atom of the prime number 2, two atoms of the prime number 3 and one atom of the prime number 5.

This knowledge can be used to find the lcm of a set of numbers.

For example: Find the value of lcm(45, 120, 75)

45\; \, = 2^0 \cdot 3^2 \cdot 5^1 \,\!
120 = 2^3 \cdot 3^1 \cdot 5^1 \,\!
75\; \,= 2^0 \cdot 3^1 \cdot 5^2. \,\!

The lcm is the number which has the greatest multiple of each different type of atom. Thus

\operatorname{lcm}(45,120,75) = 2^3 \cdot 3^2 \cdot 5^2 = 8 \cdot 9 \cdot 25 = 1800. \,\!

The least common multiple can be defined generally over commutative rings as follows: Let a and b be elements of a commutative ring R. A common multiple of a and b is an element m of R such that both a and b divide m (i.e. there exist elements x and y of R such that ax = m and by = m). A least common multiple of a and b is a common multiple that is minimal in the sense that for any other common multiple n of a and b, m divides n.

In general, two elements in a commutative ring can have no least common multiple or more than one. However, any two least common multiples of the same pair of elements are associates. In a unique factorization domain, any two elements have a least common multiple. In a principal ideal domain, the least common multiple of a and b can be characterised as a generator of the intersection of the ideals generated by a and b (the intersection of a collection of ideals is always an ideal). In principal ideal domains, one can even talk about the least common multiple of arbitrary collections of elements: it is a generator of the intersection of the ideals generated by the elements of the collection.

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