Category:Examples of Lowest Common Multiples of Integers
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This category contains examples of Lowest Common Multiple of Integers.
For all $a, b \in \Z: a b \ne 0$, there exists a smallest $m \in \Z: m > 0$ such that $a \divides m$ and $b \divides m$.
This $m$ is called the lowest common multiple of $a$ and $b$, and denoted $\lcm \set {a, b}$.
Pages in category "Examples of Lowest Common Multiples of Integers"
The following 13 pages are in this category, out of 13 total.
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- Ladies' Diary/Lowest Common Multiple of 1 to 9
- Lowest Common Multiple of Integers/Examples
- Lowest Common Multiple of Integers/Examples/-12 and 30
- Lowest Common Multiple of Integers/Examples/25 and 30
- Lowest Common Multiple of Integers/Examples/27 and 81
- Lowest Common Multiple of Integers/Examples/28 and 29
- Lowest Common Multiple of Integers/Examples/2n-1 and 2n+1
- Lowest Common Multiple of Integers/Examples/3, 9, 11
- Lowest Common Multiple of Integers/Examples/3054 and 12378
- Lowest Common Multiple of Integers/Examples/42 and 49
- Lowest Common Multiple of Integers/Examples/6 and 15
- Lowest Common Multiple of Integers/Examples/7, 9, 12, 14
- Lowest Common Multiple of Integers/Examples/n and n+1