least common multiple

Noun

 * 1)  The smallest positive integer which is divisible by (equivalently, is an integer multiple of) each of a specified finite set of integers.

Usage notes

 * The requirement that the least common multiple be positive has two effects:
 * It excludes zero, which is trivially divisible by any integer.
 * It means that the specified set cannot contain an element equal to zero. (This is also achieved by the requirement that the numbers be divisors, zero not being a valid divisor of any number.)
 * Notations used include $$\operatorname{LCM}(a,b),\ \operatorname{lcm}(a,b),\ \operatorname{l.c.m.}(a,b)$$ and $$\ [a,b]$$.

Translations

 * Chinese:
 * Mandarin:
 * Danish: mindste fælles multiplum
 * Dutch: kleinste gemene veelvoud
 * Estonian: vähim ühiskordne
 * Finnish: pienin yhteinen jaettava, pienin yhteinen monikerta
 * French:
 * Georgian: უმცირესი საერთო ჯერადი, საერთო უმცირესი ჯერადი
 * German: kleinstes gemeinsames Vielfaches
 * Greek:
 * Hungarian:
 * Indonesian:
 * Italian:
 * Japanese:
 * Korean: 최소공배수
 * Malay: gandaan sepunya terkecil
 * Polish: najmniejsza wspólna wielokrotność
 * Romanian:, c.m.m.m.c.
 * Russian: наиме́ньшее о́бщее кра́тное,
 * Spanish: mínimo común múltiplo
 * Tagalog: pinakamaliit na lahatang kaparami
 * Turkish: ortak katların en küçüğü
 * Ukrainian: найме́нше спі́льне кра́тне, НСК
 * Vietnamese: bội chung nhỏ nhất, bội số chung nhỏ nhất