Normal
The Normal Distribution
Description
Density, distribution function, quantile function and random generation for the normal distribution with mean equal to mean
and standard deviation equal to sd
.
Usage
dnorm(x, mean = 0, sd = 1, log = FALSE) pnorm(q, mean = 0, sd = 1, lower.tail = TRUE, log.p = FALSE) qnorm(p, mean = 0, sd = 1, lower.tail = TRUE, log.p = FALSE) rnorm(n, mean = 0, sd = 1)
Arguments
x, q | vector of quantiles. |
p | vector of probabilities. |
n | number of observations. If |
mean | vector of means. |
sd | vector of standard deviations. |
log, log.p | logical; if TRUE, probabilities p are given as log(p). |
lower.tail | logical; if TRUE (default), probabilities are P[X ≤ x] otherwise, P[X > x]. |
Details
If mean
or sd
are not specified they assume the default values of 0
and 1
, respectively.
The normal distribution has density
f(x) = 1/(√(2 π) σ) e^-((x - μ)^2/(2 σ^2))
where μ is the mean of the distribution and σ the standard deviation.
Value
dnorm
gives the density, pnorm
gives the distribution function, qnorm
gives the quantile function, and rnorm
generates random deviates.
The length of the result is determined by n
for rnorm
, and is the maximum of the lengths of the numerical arguments for the other functions.
The numerical arguments other than n
are recycled to the length of the result. Only the first elements of the logical arguments are used.
For sd = 0
this gives the limit as sd
decreases to 0, a point mass at mu
. sd < 0
is an error and returns NaN
.
Source
For pnorm
, based on
Cody, W. D. (1993) Algorithm 715: SPECFUN – A portable FORTRAN package of special function routines and test drivers. ACM Transactions on Mathematical Software 19, 22–32.
For qnorm
, the code is a C translation of
Wichura, M. J. (1988) Algorithm AS 241: The percentage points of the normal distribution. Applied Statistics, 37, 477–484.
which provides precise results up to about 16 digits.
For rnorm
, see RNG for how to select the algorithm and for references to the supplied methods.
References
Becker, R. A., Chambers, J. M. and Wilks, A. R. (1988) The New S Language. Wadsworth & Brooks/Cole.
Johnson, N. L., Kotz, S. and Balakrishnan, N. (1995) Continuous Univariate Distributions, volume 1, chapter 13. Wiley, New York.
See Also
Distributions for other standard distributions, including dlnorm
for the Lognormal distribution.
Examples
require(graphics) dnorm(0) == 1/sqrt(2*pi) dnorm(1) == exp(-1/2)/sqrt(2*pi) dnorm(1) == 1/sqrt(2*pi*exp(1)) ## Using "log = TRUE" for an extended range : par(mfrow = c(2,1)) plot(function(x) dnorm(x, log = TRUE), -60, 50, main = "log { Normal density }") curve(log(dnorm(x)), add = TRUE, col = "red", lwd = 2) mtext("dnorm(x, log=TRUE)", adj = 0) mtext("log(dnorm(x))", col = "red", adj = 1) plot(function(x) pnorm(x, log.p = TRUE), -50, 10, main = "log { Normal Cumulative }") curve(log(pnorm(x)), add = TRUE, col = "red", lwd = 2) mtext("pnorm(x, log=TRUE)", adj = 0) mtext("log(pnorm(x))", col = "red", adj = 1) ## if you want the so-called 'error function' erf <- function(x) 2 * pnorm(x * sqrt(2)) - 1 ## (see Abramowitz and Stegun 29.2.29) ## and the so-called 'complementary error function' erfc <- function(x) 2 * pnorm(x * sqrt(2), lower = FALSE) ## and the inverses erfinv <- function (x) qnorm((1 + x)/2)/sqrt(2) erfcinv <- function (x) qnorm(x/2, lower = FALSE)/sqrt(2)
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Licensed under the GNU General Public License.