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distr6 (version 1.3.2)

ChiSquared: Chi-Squared Distribution Class

Description

Mathematical and statistical functions for the Chi-Squared distribution, which is commonly used to model the sum of independent squared Normal distributions and for confidence intervals.

Value

Returns an R6 object inheriting from class SDistribution.

Constructor

ChiSquared$new(df = 1, decorators = NULL, verbose = FALSE)

Constructor Arguments

Argument Type Details
df numeric degrees of freedom.

decorators Decorator decorators to add functionality. See details.

Constructor Details

The Chi-Squared distribution is parameterised with df as a positive numeric.

Public Variables

Variable Return
name Name of distribution.
short_name Id of distribution.
description Brief description of distribution.

Public Methods

Accessor Methods Link
decorators() decorators
traits() traits
valueSupport() valueSupport
variateForm() variateForm
type() type
properties() properties
support() support
symmetry() symmetry
sup() sup
inf() inf
dmax() dmax
dmin() dmin
skewnessType() skewnessType
kurtosisType() kurtosisType

Statistical Methods

Link
pdf(x1, ..., log = FALSE, simplify = TRUE) pdf
cdf(x1, ..., lower.tail = TRUE, log.p = FALSE, simplify = TRUE) cdf
quantile(p, ..., lower.tail = TRUE, log.p = FALSE, simplify = TRUE) quantile.Distribution
rand(n, simplify = TRUE) rand
mean() mean.Distribution
variance() variance
stdev() stdev
prec() prec
cor() cor
skewness() skewness
kurtosis(excess = TRUE) kurtosis
entropy(base = 2) entropy
mgf(t) mgf
cf(t) cf
pgf(z) pgf
median() median.Distribution
iqr() iqr
mode(which = "all") mode

Parameter Methods

Link
parameters(id) parameters
getParameterValue(id, error = "warn") getParameterValue
setParameterValue(..., lst = NULL, error = "warn") setParameterValue

Validation Methods

Link
liesInSupport(x, all = TRUE, bound = FALSE) liesInSupport
liesInType(x, all = TRUE, bound = FALSE) liesInType

Representation Methods

Link
strprint(n = 2) strprint
print(n = 2) print
summary(full = T) summary.Distribution

Details

The Chi-Squared distribution parameterised with degrees of freedom, \(\nu\), is defined by the pdf, $$f(x) = (x^{\nu/2-1} exp(-x/2))/(2^{\nu/2}\Gamma(\nu/2))$$ for \(\nu > 0\).

The distribution is supported on the Positive Reals.

References

McLaughlin, M. P. (2001). A compendium of common probability distributions (pp. 2014-01). Michael P. McLaughlin.

See Also

listDistributions for all available distributions. Normal for the Normal distribution, ChiSquaredNoncentral for the noncentral Chi-Squared distribution.

Examples

Run this code
# NOT RUN {
x = ChiSquared$new(df = 2)

# Update parameters
x$setParameterValue(location = 3)
x$parameters()

# d/p/q/r
x$pdf(5)
x$cdf(5)
x$quantile(0.42)
x$rand(4)

# Statistics
x$mean()
x$variance()

summary(x)

# }

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