Multiple (mathematics)

In mathematics, a multiple is the product of any quantity and an integer.^[1][2][3] In other words, for the quantities a and b, we say that b is a multiple of a if b = na for some integer n, which is called the multiplier or coefficient. If a is not zero, this is equivalent to saying that b/a is an integer with no remainder.^[4][5][6] If a and b are both integers, and b is a multiple of a, then a is called a divisor of b.

Examples

14, 49, -21 and 0 are multiples of 7, whereas 3 and -6 are not. This is because there are integers that 7 may be multiplied by to reach the values of 14, 49, 0 and -21, while there are no such integers for 3 and -6. Each of the products listed below, and in particular, the products for 3 and -6, is the only way that the relevant number can be written as a product of 7 and another real number:

• ${\displaystyle 14=7\times 2}$
• ${\displaystyle 49=7\times 7}$
• ${\displaystyle -21=7\times (-3)}$
• ${\displaystyle 0=7\times 0}$
• ${\displaystyle 3=7\times (3/7)}$, ${\displaystyle 3/7}$ is a rational number, not an integer
• ${\displaystyle -6=7\times (-6/7)}$, ${\displaystyle -6/7}$ is a rational number, not an integer.

Properties

• 0 is a multiple of everything (${\displaystyle 0=0\cdot b}$).
• The product of any integer ${\displaystyle n}$ and any integer is a multiple of ${\displaystyle n}$. In particular, ${\displaystyle n}$, which is equal to ${\displaystyle n\times 1}$, is a multiple of ${\displaystyle n}$ (every integer is a multiple of itself), since 1 is an integer.
• If ${\displaystyle a}$ and ${\displaystyle b}$ are multiples of ${\displaystyle x}$ then ${\displaystyle a+b}$ and ${\displaystyle a-b}$ are also multiples of ${\displaystyle x}$.

References

1. Weisstein, Eric W. "Multiple". MathWorld.
2. WordNet lexicon database, Princeton University
3. WordReference.com
4. The Free Dictionary by Farlex
5. Dictionary.com Unabridged
6. Cambridge Dictionary Online

See also

• Ideal (ring theory)
• Decimal and SI prefix