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Octave has functions for computing the Probability Density Function (PDF), the Cumulative Distribution function (CDF), and the quantile (the inverse of the CDF) for a large number of distributions.
The following table summarizes the supported distributions (in alphabetical order).
Distribution | CDF | Quantile | |
---|---|---|---|
Beta Distribution | betapdf | betacdf | betainv |
Binomial Distribution | binopdf | binocdf | binoinv |
Cauchy Distribution | cauchy_pdf | cauchy_cdf | cauchy_inv |
Chi-Square Distribution | chi2pdf | chi2cdf | chi2inv |
Univariate Discrete Distribution | discrete_pdf | discrete_cdf | discrete_inv |
Empirical Distribution | empirical_pdf | empirical_cdf | empirical_inv |
Exponential Distribution | exppdf | expcdf | expinv |
F Distribution | fpdf | fcdf | finv |
Gamma Distribution | gampdf | gamcdf | gaminv |
Geometric Distribution | geopdf | geocdf | geoinv |
Hypergeometric Distribution | hygepdf | hygecdf | hygeinv |
Kolmogorov Smirnov Distribution | Not Available | kolmogorov_smirnov_cdf | Not Available |
Laplace Distribution | laplace_pdf | laplace_cdf | laplace_inv |
Logistic Distribution | logistic_pdf | logistic_cdf | logistic_inv |
Log-Normal Distribution | lognpdf | logncdf | logninv |
Univariate Normal Distribution | normpdf | normcdf | norminv |
Pascal Distribution | nbinpdf | nbincdf | nbininv |
Poisson Distribution | poisspdf | poisscdf | poissinv |
Standard Normal Distribution | stdnormal_pdf | stdnormal_cdf | stdnormal_inv |
t (Student) Distribution | tpdf | tcdf | tinv |
Univariate Discrete Distribution | unidpdf | unidcdf | unidinv |
Uniform Distribution | unifpdf | unifcdf | unifinv |
Weibull Distribution | wblpdf | wblcdf | wblinv |
For each element of x, compute the probability density function (PDF) at x of the Beta distribution with parameters a and b.
For each element of x, compute the cumulative distribution function (CDF) at x of the Beta distribution with parameters a and b.
For each element of x, compute the quantile (the inverse of the CDF) at x of the Beta distribution with parameters a and b.
For each element of x, compute the probability density function (PDF) at x of the binomial distribution with parameters n and p, where n is the number of trials and p is the probability of success.
For each element of x, compute the cumulative distribution function (CDF) at x of the binomial distribution with parameters n and p, where n is the number of trials and p is the probability of success.
For each element of x, compute the quantile (the inverse of the CDF) at x of the binomial distribution with parameters n and p, where n is the number of trials and p is the probability of success.
For each element of x, compute the probability density function (PDF) at x of the Cauchy distribution with location parameter location and scale parameter scale > 0.
Default values are location = 0, scale = 1.
For each element of x, compute the cumulative distribution function (CDF) at x of the Cauchy distribution with location parameter location and scale parameter scale.
Default values are location = 0, scale = 1.
For each element of x, compute the quantile (the inverse of the CDF) at x of the Cauchy distribution with location parameter location and scale parameter scale.
Default values are location = 0, scale = 1.
For each element of x, compute the probability density function (PDF) at x of the chi-square distribution with n degrees of freedom.
For each element of x, compute the cumulative distribution function (CDF) at x of the chi-square distribution with n degrees of freedom.
For each element of x, compute the quantile (the inverse of the CDF) at x of the chi-square distribution with n degrees of freedom.
For each element of x, compute the probability density function (PDF) at x of a univariate discrete distribution which assumes the values in v with probabilities p.
For each element of x, compute the cumulative distribution function (CDF) at x of a univariate discrete distribution which assumes the values in v with probabilities p.
For each element of x, compute the quantile (the inverse of the CDF) at x of the univariate distribution which assumes the values in v with probabilities p.
For each element of x, compute the probability density function (PDF) at x of the empirical distribution obtained from the univariate sample data.
For each element of x, compute the cumulative distribution function (CDF) at x of the empirical distribution obtained from the univariate sample data.
For each element of x, compute the quantile (the inverse of the CDF) at x of the empirical distribution obtained from the univariate sample data.
For each element of x, compute the probability density function (PDF) at x of the exponential distribution with mean lambda.
For each element of x, compute the cumulative distribution function (CDF) at x of the exponential distribution with mean lambda.
The arguments can be of common size or scalars.
For each element of x, compute the quantile (the inverse of the CDF) at x of the exponential distribution with mean lambda.
For each element of x, compute the probability density function (PDF) at x of the F distribution with m and n degrees of freedom.
For each element of x, compute the cumulative distribution function (CDF) at x of the F distribution with m and n degrees of freedom.
For each element of x, compute the quantile (the inverse of the CDF) at x of the F distribution with m and n degrees of freedom.
For each element of x, return the probability density function (PDF) at x of the Gamma distribution with shape parameter a and scale b.
For each element of x, compute the cumulative distribution function (CDF) at x of the Gamma distribution with shape parameter a and scale b.
For each element of x, compute the quantile (the inverse of the CDF) at x of the Gamma distribution with shape parameter a and scale b.
For each element of x, compute the probability density function (PDF) at x of the geometric distribution with parameter p.
The geometric distribution models the number of failures (x-1) of a Bernoulli trial with probability p before the first success (x).
For each element of x, compute the cumulative distribution function (CDF) at x of the geometric distribution with parameter p.
The geometric distribution models the number of failures (x-1) of a Bernoulli trial with probability p before the first success (x).
For each element of x, compute the quantile (the inverse of the CDF) at x of the geometric distribution with parameter p.
The geometric distribution models the number of failures (x-1) of a Bernoulli trial with probability p before the first success (x).
Compute the probability density function (PDF) at x of the hypergeometric distribution with parameters t, m, and n.
This is the probability of obtaining x marked items when randomly drawing a sample of size n without replacement from a population of total size t containing m marked items.
The parameters t, m, and n must be positive integers with m and n not greater than t.
Compute the cumulative distribution function (CDF) at x of the hypergeometric distribution with parameters t, m, and n.
This is the probability of obtaining not more than x marked items when randomly drawing a sample of size n without replacement from a population of total size t containing m marked items.
The parameters t, m, and n must be positive integers with m and n not greater than t.
For each element of x, compute the quantile (the inverse of the CDF) at x of the hypergeometric distribution with parameters t, m, and n.
This is the probability of obtaining x marked items when randomly drawing a sample of size n without replacement from a population of total size t containing m marked items.
The parameters t, m, and n must be positive integers with m and n not greater than t.
Return the cumulative distribution function (CDF) at x of the Kolmogorov-Smirnov distribution.
This is defined as
Inf Q(x) = SUM (-1)^k exp (-2 k^2 x^2) k = -Inf
for x > 0.
The optional parameter tol specifies the precision up to which
the series should be evaluated; the default is tol = eps
.
For each element of x, compute the probability density function (PDF) at x of the Laplace distribution.
For each element of x, compute the cumulative distribution function (CDF) at x of the Laplace distribution.
For each element of x, compute the quantile (the inverse of the CDF) at x of the Laplace distribution.
For each element of x, compute the PDF at x of the logistic distribution.
For each element of x, compute the cumulative distribution function (CDF) at x of the logistic distribution.
For each element of x, compute the quantile (the inverse of the CDF) at x of the logistic distribution.
For each element of x, compute the probability density function (PDF) at x of the lognormal distribution with parameters mu and sigma.
If a random variable follows this distribution, its logarithm is normally distributed with mean mu and standard deviation sigma.
Default values are mu = 0, sigma = 1.
For each element of x, compute the cumulative distribution function (CDF) at x of the lognormal distribution with parameters mu and sigma.
If a random variable follows this distribution, its logarithm is normally distributed with mean mu and standard deviation sigma.
Default values are mu = 0, sigma = 1.
For each element of x, compute the quantile (the inverse of the CDF) at x of the lognormal distribution with parameters mu and sigma.
If a random variable follows this distribution, its logarithm is normally distributed with mean mu and standard deviation sigma.
Default values are mu = 0, sigma = 1.
For each element of x, compute the probability density function (PDF) at x of the negative binomial distribution with parameters n and p.
When n is integer this is the Pascal distribution. When n is extended to real numbers this is the Polya distribution.
The number of failures in a Bernoulli experiment with success probability p before the n-th success follows this distribution.
For each element of x, compute the cumulative distribution function (CDF) at x of the negative binomial distribution with parameters n and p.
When n is integer this is the Pascal distribution. When n is extended to real numbers this is the Polya distribution.
The number of failures in a Bernoulli experiment with success probability p before the n-th success follows this distribution.
For each element of x, compute the quantile (the inverse of the CDF) at x of the negative binomial distribution with parameters n and p.
When n is integer this is the Pascal distribution. When n is extended to real numbers this is the Polya distribution.
The number of failures in a Bernoulli experiment with success probability p before the n-th success follows this distribution.
For each element of x, compute the probability density function (PDF) at x of the normal distribution with mean mu and standard deviation sigma.
Default values are mu = 0, sigma = 1.
For each element of x, compute the cumulative distribution function (CDF) at x of the normal distribution with mean mu and standard deviation sigma.
Default values are mu = 0, sigma = 1.
For each element of x, compute the quantile (the inverse of the CDF) at x of the normal distribution with mean mu and standard deviation sigma.
Default values are mu = 0, sigma = 1.
For each element of x, compute the probability density function (PDF) at x of the Poisson distribution with parameter lambda.
For each element of x, compute the cumulative distribution function (CDF) at x of the Poisson distribution with parameter lambda.
For each element of x, compute the quantile (the inverse of the CDF) at x of the Poisson distribution with parameter lambda.
For each element of x, compute the probability density function (PDF) at x of the standard normal distribution (mean = 0, standard deviation = 1).
For each element of x, compute the cumulative distribution function (CDF) at x of the standard normal distribution (mean = 0, standard deviation = 1).
For each element of x, compute the quantile (the inverse of the CDF) at x of the standard normal distribution (mean = 0, standard deviation = 1).
For each element of x, compute the probability density function (PDF) at x of the t (Student) distribution with n degrees of freedom.
For each element of x, compute the cumulative distribution function (CDF) at x of the t (Student) distribution with n degrees of freedom.
For each element of x, compute the quantile (the inverse of the CDF) at x of the t (Student) distribution with n degrees of freedom.
This function is analogous to looking in a table for the t-value of a single-tailed distribution.
For each element of x, compute the probability density function (PDF) at x of a discrete uniform distribution which assumes the integer values 1–n with equal probability.
Warning: The underlying implementation uses the double class and will only
be accurate for n ≤ bitmax
(2^{53} - 1 on
IEEE-754 compatible systems).
For each element of x, compute the cumulative distribution function (CDF) at x of a discrete uniform distribution which assumes the integer values 1–n with equal probability.
For each element of x, compute the quantile (the inverse of the CDF) at x of the discrete uniform distribution which assumes the integer values 1–n with equal probability.
For each element of x, compute the probability density function (PDF) at x of the uniform distribution on the interval [a, b].
Default values are a = 0, b = 1.
For each element of x, compute the cumulative distribution function (CDF) at x of the uniform distribution on the interval [a, b].
Default values are a = 0, b = 1.
For each element of x, compute the quantile (the inverse of the CDF) at x of the uniform distribution on the interval [a, b].
Default values are a = 0, b = 1.
Compute the probability density function (PDF) at x of the Weibull distribution with scale parameter scale and shape parameter shape.
This is given by
shape * scale^(-shape) * x^(shape-1) * exp (-(x/scale)^shape)
for x ≥ 0.
Default values are scale = 1, shape = 1.
Compute the cumulative distribution function (CDF) at x of the Weibull distribution with scale parameter scale and shape parameter shape.
This is defined as
1 - exp (-(x/scale)^shape)
for x ≥ 0.
Default values are scale = 1, shape = 1.
Compute the quantile (the inverse of the CDF) at x of the Weibull distribution with scale parameter scale and shape parameter shape.
Default values are scale = 1, shape = 1.
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