Percentile

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Percentiles are statistical parameters which describe the distribution of a (real) value in a population (or a sample). Roughly speaking, the k-th percentile separates the smallest p percent of values from the largest (100-p) percent.

Special percentiles are the median (50th percentile), the quartiles (25th and 75th percentile), and the deciles (the k-th decile is the (10k)-th percentile). Percentiles are special cases of quantiles: The k-th percentile is the same as the (k/100)-quantile.

Definition

The value x is k-th percentile if

${\displaystyle P(\omega \leq x)\geq {k \over 100}{\textrm {\ \ and\ \ }}P(\omega \geq x)\leq 1-{k \over 100}}$

Special cases

For a continuous distribution (like the normal distribution) the k-th percentile x is uniquely determined by

${\displaystyle P(\omega \leq x)={k \over 100}{\textrm {\ \ and\ \ }}P(\omega \geq x)=1-{k \over 100}}$

In the general case (e.g., for discrete distributions, or for finite samples) it may happen that the separating value has positive probability:

${\displaystyle P(\omega =x)>0\Rightarrow P(\omega \leq x)>{k \over 100}{\textrm {\ \ and\ \ }}P(\omega \geq x)>1-{k \over 100}}$

or that there are two distinct values for which equality holds ${\displaystyle x_{1}<x_{2}}$ such that

${\displaystyle P(\omega \leq x_{1})={k \over 100}{\textrm {\ \ and\ \ }}P(\omega \geq x_{2})=1-{k \over 100}}$

Then every value in the (closed) intervall between the smallest and the largest such value Failed to parse (syntax error): {\displaystyle \left [ \min \{ x \mid P(\omega\le x) = {k\over100} \}, \max \[ x \mid P(\omega\ge x) = 1-{k\over100} \} \right]} is a k-th percentiles.

Example

The following examples illustrates this:

Take a sample of 101 values, ordered according to their size:

${\displaystyle x_{1}\leq x_{2}\leq \dots \leq x_{100}\leq x_{101}}$

Then the unique k-th percentile is ${\displaystyle x_{k+1}}$.

If there are only 100 values

${\displaystyle x_{1}\leq x_{2}\leq \dots \leq x_{99}\leq x_{100}}$

then any value between ${\displaystyle x_{k}}$ and ${\displaystyle x_{k+1}}$ is a k-th percentile.