Percentile Score

In statistics, a ''k''-th percentile (percentile score or centile) is a score ''below which'' a given percentage ''k'' of scores in its frequency distribution falls (exclusive definition) or a score ''at or below which'' a given percentage falls (inclusive definition).

For example, the 50th percentile (the median) is the score below which 50% of the scores in the distribution are found (by the "exclusive" definition), or at or below which 50% of the scores are found (by the "inclusive" definition).
Percentiles are expressed in the same unit of measurement as the input scores; for example, if the scores refer to human weight, the corresponding percentiles will be expressed in kilograms or pounds.

The percentile score and the '' percentile rank'' are related terms. The percentile rank of a score is the percentage of scores in its distribution that are less than it, an exclusive definition, and one that can be expressed with a single, simple formula.
Percentile scores and percentile ranks are often used in the reporting of test scores from norm-referenced tests, but, as just noted, they are not the same. For percentile rank, a score is given and a percentage is computed. Percentile ranks are exclusive. If the percentile rank for a specified score is 90%, then 90% of the scores were lower. In contrast, for percentiles a percentage is given and a corresponding score is determined, which can be either exclusive or inclusive. The score for a specified percentage (e.g., 90th) indicates a score below which (exclusive definition) or at or below which (inclusive definition) other scores in the distribution fall.

The 25th percentile is also known as the first ''quartile'' (''Q''₁), the 50th percentile as the median or second quartile (''Q''₂), and the 75th percentile as the third quartile (''Q''₃).

Applications

When ISPs bill "burstable" internet bandwidth, the 95th or 98th percentile usually cuts off the top 5% or 2% of bandwidth peaks in each month, and then bills at the nearest rate. In this way, infrequent peaks are ignored, and the customer is charged in a fairer way. The reason this statistic is so useful in measuring data throughput is that it gives a very accurate picture of the cost of the bandwidth. The 95th percentile says that 95% of the time, the usage is below this amount: so, the remaining 5% of the time, the usage is above that amount.

Physicians will often use infant and children's weight and height to assess their growth in comparison to national averages and percentiles which are found in growth charts.

The 85th percentile speed of traffic on a road is often used as a guideline in setting speed limits and assessing whether such a limit is too high or low.

In finance, value at risk is a standard measure to assess (in a model-dependent way) the quantity under which the value of the portfolio is not expected to sink within a given period of time and given a confidence value.

The normal distribution and percentiles

The methods given in the ''definitions section'' (below) are approximations for use in small-sample statistics. In general terms, for very large populations following a normal distribution, percentiles may often be represented by reference to a normal curve plot. The normal distribution is plotted along an axis scaled to standard deviations, or sigma ($\sigma$) units. Mathematically, the normal distribution extends to negative infinity on the left and positive infinity on the right. Note, however, that only a very small proportion of individuals in a population will fall outside the −3''σ'' to +3''σ'' range. For example, with human heights very few people are above the +3''σ'' height level.

Percentiles represent the area under the normal curve, increasing from left to right. Each standard deviation represents a fixed percentile. Thus, rounding to two decimal places, −3''σ'' is the 0.13th percentile, −2''σ'' the 2.28th percentile, −1''σ'' the 15.87th percentile, 0''σ'' the 50th percentile (both the mean and median of the distribution), +1''σ'' the 84.13th percentile, +2''σ'' the 97.72nd percentile, and +3''σ'' the 99.87th percentile. This is related to the 68–95–99.7 rule or the three-sigma rule. Note that in theory the 0th percentile falls at negative infinity and the 100th percentile at positive infinity, although in many practical applications, such as test results, natural lower and/or upper limits are enforced.

Definitions

There is no standard definition of percentile,
however all definitions yield similar results when the number of observations is very large and the probability distribution is continuous. In the limit, as the sample size approaches infinity, the 100''p''^th percentile (0<''p''<1) approximates the inverse of the cumulative distribution function (CDF) thus formed, evaluated at ''p'', as ''p'' approximates the CDF. This can be seen as a consequence of the Glivenko–Cantelli theorem. Some methods for calculating the percentiles are given below.

Calculation methods

There are many formulas or algorithms for a percentile score. Hyndman and Fan identified nine and most statistical and spreadsheet software use one of the methods they describe. Algorithms either return the value of a score that exists in the set of scores (nearest-rank methods) or interpolate between existing scores and are either exclusive or inclusive.

The figure shows a 10-score distribution, illustrates the percentile scores that result from these different algorithms, and serves as an introduction to the examples given subsequently. The simplest are nearest-rank methods that return a score from the distribution, although compared to interpolation methods, results can be a bit crude. The Nearest-Rank Methods table shows the computational steps for exclusive and inclusive methods.

Interpolation methods, as the name implies, can return a score that is between scores in the distribution. Algorithms used by statistical programs typically use interpolation methods, for example, the percentile.exc and percentile.inc functions in Microsoft Excel. The Interpolated Methods table shows the computational steps.

The nearest-rank method

One definition of percentile, often given in texts, is that the ''P''-th percentile $(0 < P \le 100)$ of a list of ''N'' ordered values (sorted from least to greatest) is the smallest value in the list such that no more than ''P'' percent of the data is strictly less than the value and at least ''P'' percent of the data is less than or equal to that value. This is obtained by first calculating the ordinal rank and then taking the value from the ordered list that corresponds to that rank. The ordinal rank ''n'' is calculated using this formula
: $n = \left \lceil \frac \times N \right \rceil.$
* Using the nearest-rank method on lists with fewer than 100 distinct values can result in the same value being used for more than one percentile.
* A percentile calculated using the nearest-rank method will always be a member of the original ordered list.
* The 100th percentile is defined to be the largest value in the ordered list.

The linear interpolation between closest ranks method

An alternative to rounding used in many applications is to use linear interpolation between adjacent ranks.

Commonalities between the variants of this method

All of the following variants have the following in common. Given the order statistics
: $\,$
we seek a linear interpolation function that passes through the points $(v_i,i)$. This is simply accomplished by
: v(x) = v_ + (x \bmod 1)(v_-v_),\forall x\in ,N: v(i)=v_i \text i=1,2,\ldots,N,
where $\lfloor x\rfloor$ uses the floor function to represent the integral part of positive , whereas $x\bmod 1$ uses the mod function to represent its fractional part (the remainder after division by 1). (Note that, though at the endpoint $x = N$, $v_$ is undefined, it does not need to be because it is multiplied by $x \bmod 1 = 0$.) As we can see, is the continuous version of the subscript , linearly interpolating between adjacent nodes.

There are two ways in which the variant approaches differ. The first is in the linear relationship between the ''rank'' , the ''percent rank'' $P=100p$, and a constant that is a function of the sample size :
: $x=f(p,N)=(N+c_1)p+c_2.$
There is the additional requirement that the midpoint of the range $(1,N)$, corresponding to the median, occur at $p=0.5$:
: $\begin f(0.5,N)&=\frac+c_2=\frac\\ \therefore 2c_2+c_1&=1 \end,$
and our revised function now has just one degree of freedom, looking like this:
: $x=f(p,N)=(N+1-2C)p+C.$
The second way in which the variants differ is in the definition of the function near the margins of the ,1/math> range of : $f(p,N)$ should produce, or be forced to produce, a result in the range ,N/math>, which may mean the absence of a one-to-one correspondence in the wider region. One author has suggested a choice of $C = \tfrac (1+\xi)$ where is the shape of the Generalized extreme value distribution which is the extreme value limit of the sampled distribution.

First variant, ''C'' = 1/2

(Sources: Matlab "prctile" function,)
: x=f(p)=\begin
Np+\frac,\forall p\in\left _1,p_N\right \\
1,\forall p\in\left ,p_1\right \\
N,\forall p\in\left _N,1\right
\end
where
: p_i=\frac\left(i-\frac\right),i\in ,Ncap\mathbb
: $\therefore p_1=\frac, p_N=\frac.$
Furthermore, let
: $P_i=100p_i.$
The inverse relationship is restricted to a narrower region:
: $p=\frac\left(x-\frac\right),x\in(1,N)\cap\mathbb.$

Second variant, ''C'' = 1

(Source: Some software packages, including NumPy and Microsoft Excel (up to and including version 2013 by means of the PERCENTILE.INC function). Noted as an alternative by NIST)

: x = f(p,N) = p(N-1)+1 \text p\in ,1/math>
: \therefore p = \frac \text x\in ,N
Note that the $x\leftrightarrow p$ relationship is one-to-one for p\in ,1/math>, the only one of the three variants with this property; hence the "INC" suffix, for ''inclusive'', on the Excel function.

Third variant, ''C'' = 0

(The primary variant recommended by NIST. Adopted by Microsoft Excel since 2010 by means of PERCENTIL.EXC function. However, as the "EXC" suffix indicates, the Excel version ''excludes'' both endpoints of the range of ''p'', i.e., $p\in(0,1)$, whereas the "INC" version, the second variant, does not; in fact, any number smaller than $\frac 1$ is also excluded and would cause an error.)

: x = f(p,N) = \begin
1\textp\in\left ,\frac\right\\
p(N+1)\textp\in\left(\frac,\frac\right) \\
N\textp\in\left frac,1\right\end.
The inverse is restricted to a narrower region:
: $p = \frac\textx\in(0,N).$

The weighted percentile method

In addition to the percentile function, there is also a ''weighted percentile'', where the percentage in the total weight is counted instead of the total number. There is no standard function for a weighted percentile. One method extends the above approach in a natural way.

Suppose we have positive weights $w_1, w_2, w_3, \dots, w_N$ associated, respectively, with our ''N'' sorted sample values. Let
: $S_N = \sum_^N w_k,$
the sum of the weights. Then the formulas above are generalized by taking
: $p_n = \frac\left(S_n - \frac\right)$ when $C=1/2$,
or
: $p_n = \frac$ for general $C$,
and
: $v = v_k + \frac(v_ - v_k).$

The 50% weighted percentile is known as the weighted median.

See also

* Decile
* Percentile rank
* Quantile
* Summary statistics

References

{{Statistics, descriptive

Summary statistics
Percentages