Difference between revisions of "Divisor"
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===Useful formulae=== | ===Useful formulae=== | ||
* If <math>\displaystyle{m}</math> and <math>\displaystyle{n}</math> are [[relatively prime]], then <math>d(mn)=d(m)d(n)</math> | * If <math>\displaystyle{m}</math> and <math>\displaystyle{n}</math> are [[relatively prime]], then <math>d(mn)=d(m)d(n)</math> | ||
− | * <math>\displaystyle{\sum_{n=1}^N d(n)=\left | + | * <math>\displaystyle{\sum_{n=1}^N d(n)=\left\lfloor\frac N1\right\rfloor+\left\lfloor\frac N2\right\rfloor+\dots+\left\lfloor\frac NN\right\rfloor= N\ln N+O(N)}</math> |
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===See also=== | ===See also=== | ||
*[[Sum of divisors function]] | *[[Sum of divisors function]] |
Revision as of 22:59, 21 June 2006
Contents
[hide]Definition
Any natural number is called a divisor of a natural number if there is a natural number such that or, in other words, if is also a natural number. See Divisibility for more information.
Notation
A common notation to indicate a number is a divisor of another is n|k. This means that n divides k.
How many divisors does a number have
See main article, Counting divisors. If is the prime factorization of , then the number of different divisors of is given by the formula . It is often useful to know that this expression grows slower than any positive power of as . Another useful idea is that is odd if and only if is a perfect square.
Useful formulae
- If and are relatively prime, then