src/library/base/man/pretty.Rd - R - Git at Google

 % File src/library/base/man/pretty.Rd
 % Part of the R package, https://www.R-project.org
 % Copyright 1995-2018 R Core Team
 % Distributed under GPL 2 or later

 \name{pretty}
 \title{Pretty Breakpoints}
 \usage{
 pretty(x, \dots)

 \method{pretty}{default}(x, n = 5, min.n = n \%/\% 3,  shrink.sml = 0.75,
        high.u.bias = 1.5, u5.bias = .5 + 1.5*high.u.bias,
        eps.correct = 0, \dots)
 }
 \alias{pretty}
 \alias{pretty.default}
 \arguments{
   \item{x}{an object coercible to numeric by \code{\link{as.numeric}}.}
   \item{n}{integer giving the \emph{desired} number of
     intervals.  Non-integer values are rounded down.}
   \item{min.n}{nonnegative integer giving the \emph{minimal} number of
     intervals.  If \code{min.n == 0}, \code{pretty(.)} may return a
     single value.}
   \item{shrink.sml}{positive number, a factor (smaller than one)
     by which a default scale is shrunk in the case when
     \code{range(x)} is very small (usually 0).}
   \item{high.u.bias}{non-negative numeric, typically \eqn{> 1}.
     The interval unit is determined as \{1,2,5,10\} times \code{b}, a
     power of 10.  Larger \code{high.u.bias} values favor larger units.}
   \item{u5.bias}{non-negative numeric
     multiplier favoring factor 5 over 2.  Default and \sQuote{optimal}:
     \code{u5.bias = .5 + 1.5*high.u.bias}.}
   \item{eps.correct}{integer code, one of \{0,1,2\}. If non-0, an
     \emph{epsilon correction} is made at the boundaries such that
     the result boundaries will be outside \code{range(x)}; in the
     \emph{small} case, the correction is only done if \code{eps.correct
        >= 2}.}
   \item{\dots}{further arguments for methods.}
 }
 \description{
   Compute a  sequence of about \code{n+1} equally spaced \sQuote{round}
   values which cover the range of the values in \code{x}.
   The values are chosen so that they are 1, 2 or 5 times a power of 10.
 }
 \details{
   \code{pretty} ignores non-finite values in \code{x}.

   Let \code{d <- max(x) - min(x)} \eqn{\ge 0}.
   If \code{d} is not (very close) to 0, we let \code{c <- d/n},
   otherwise more or less \code{c <- max(abs(range(x)))*shrink.sml / min.n}.
   Then, the \emph{10 base} \code{b} is
   \eqn{10^{\lfloor{\log_{10}(c)}\rfloor}}{10^(floor(log10(c)))} such
   that \eqn{b \le c < 10b}.

   Now determine the basic \emph{unit} \eqn{u} as one of
   \eqn{\{1,2,5,10\} b}{{1,2,5,10} b}, depending on
   \eqn{c/b \in [1,10)}{c/b in [1,10)}
   and the two \sQuote{\emph{bias}} coefficients, \eqn{h
   =}\code{high.u.bias} and \eqn{f =}\code{u5.bias}.

   \dots\dots\dots
 }
 \seealso{
   \code{\link{axTicks}} for the computation of pretty axis tick
   locations in plots, particularly on the log scale.
 }
 \references{
   Becker, R. A., Chambers, J. M. and Wilks, A. R. (1988)
   \emph{The New S Language}.
   Wadsworth & Brooks/Cole.
 }
 \examples{
 pretty(1:15)          # 0  2  4  6  8 10 12 14 16
 pretty(1:15, h = 2)   # 0  5 10 15
 pretty(1:15, n = 4)   # 0  5 10 15
 pretty(1:15 * 2)      # 0  5 10 15 20 25 30
 pretty(1:20)          # 0  5 10 15 20
 pretty(1:20, n = 2)   # 0 10 20
 pretty(1:20, n = 10)  # 0  2  4 ... 20

 for(k in 5:11) {
   cat("k=", k, ": "); print(diff(range(pretty(100 + c(0, pi*10^-k)))))}

 ##-- more bizarre, when  min(x) == max(x):
 pretty(pi)

 add.names <- function(v) { names(v) <- paste(v); v}
 utils::str(lapply(add.names(-10:20), pretty))
 utils::str(lapply(add.names(0:20),   pretty, min.n = 0))
 sapply(    add.names(0:20),   pretty, min.n = 4)

 pretty(1.234e100)
 pretty(1001.1001)
 pretty(1001.1001, shrink = 0.2)
 for(k in -7:3)
   cat("shrink=", formatC(2^k, width = 9),":",
       formatC(pretty(1001.1001, shrink.sml = 2^k), width = 6),"\n")
 }
 \keyword{dplot}
	% File src/library/base/man/pretty.Rd
	% Part of the R package, https://www.R-project.org
	% Copyright 1995-2018 R Core Team
	% Distributed under GPL 2 or later

	\name{pretty}
	\title{Pretty Breakpoints}
	\usage{
	pretty(x, \dots)

	\method{pretty}{default}(x, n = 5, min.n = n \%/\% 3, shrink.sml = 0.75,
	high.u.bias = 1.5, u5.bias = .5 + 1.5*high.u.bias,
	eps.correct = 0, \dots)
	}
	\alias{pretty}
	\alias{pretty.default}
	\arguments{
	\item{x}{an object coercible to numeric by \code{\link{as.numeric}}.}
	\item{n}{integer giving the \emph{desired} number of
	intervals. Non-integer values are rounded down.}
	\item{min.n}{nonnegative integer giving the \emph{minimal} number of
	intervals. If \code{min.n == 0}, \code{pretty(.)} may return a
	single value.}
	\item{shrink.sml}{positive number, a factor (smaller than one)
	by which a default scale is shrunk in the case when
	\code{range(x)} is very small (usually 0).}
	\item{high.u.bias}{non-negative numeric, typically \eqn{> 1}.
	The interval unit is determined as \{1,2,5,10\} times \code{b}, a
	power of 10. Larger \code{high.u.bias} values favor larger units.}
	\item{u5.bias}{non-negative numeric
	multiplier favoring factor 5 over 2. Default and \sQuote{optimal}:
	\code{u5.bias = .5 + 1.5*high.u.bias}.}
	\item{eps.correct}{integer code, one of \{0,1,2\}. If non-0, an
	\emph{epsilon correction} is made at the boundaries such that
	the result boundaries will be outside \code{range(x)}; in the
	\emph{small} case, the correction is only done if \code{eps.correct
	>= 2}.}
	\item{\dots}{further arguments for methods.}
	}
	\description{
	Compute a sequence of about \code{n+1} equally spaced \sQuote{round}
	values which cover the range of the values in \code{x}.
	The values are chosen so that they are 1, 2 or 5 times a power of 10.
	}
	\details{
	\code{pretty} ignores non-finite values in \code{x}.

	Let \code{d <- max(x) - min(x)} \eqn{\ge 0}.
	If \code{d} is not (very close) to 0, we let \code{c <- d/n},
	otherwise more or less \code{c <- max(abs(range(x)))*shrink.sml / min.n}.
	Then, the \emph{10 base} \code{b} is
	\eqn{10^{\lfloor{\log_{10}(c)}\rfloor}}{10^(floor(log10(c)))} such
	that \eqn{b \le c < 10b}.

	Now determine the basic \emph{unit} \eqn{u} as one of
	\eqn{\{1,2,5,10\} b}{{1,2,5,10} b}, depending on
	\eqn{c/b \in [1,10)}{c/b in [1,10)}
	and the two \sQuote{\emph{bias}} coefficients, \eqn{h
	=}\code{high.u.bias} and \eqn{f =}\code{u5.bias}.

	\dots\dots\dots
	}
	\seealso{
	\code{\link{axTicks}} for the computation of pretty axis tick
	locations in plots, particularly on the log scale.
	}
	\references{
	Becker, R. A., Chambers, J. M. and Wilks, A. R. (1988)
	\emph{The New S Language}.
	Wadsworth & Brooks/Cole.
	}
	\examples{
	pretty(1:15) # 0 2 4 6 8 10 12 14 16
	pretty(1:15, h = 2) # 0 5 10 15
	pretty(1:15, n = 4) # 0 5 10 15
	pretty(1:15 * 2) # 0 5 10 15 20 25 30
	pretty(1:20) # 0 5 10 15 20
	pretty(1:20, n = 2) # 0 10 20
	pretty(1:20, n = 10) # 0 2 4 ... 20

	for(k in 5:11) {
	cat("k=", k, ": "); print(diff(range(pretty(100 + c(0, pi*10^-k)))))}

	##-- more bizarre, when min(x) == max(x):
	pretty(pi)

	add.names <- function(v) { names(v) <- paste(v); v}
	utils::str(lapply(add.names(-10:20), pretty))
	utils::str(lapply(add.names(0:20), pretty, min.n = 0))
	sapply( add.names(0:20), pretty, min.n = 4)

	pretty(1.234e100)
	pretty(1001.1001)
	pretty(1001.1001, shrink = 0.2)
	for(k in -7:3)
	cat("shrink=", formatC(2^k, width = 9),":",
	formatC(pretty(1001.1001, shrink.sml = 2^k), width = 6),"\n")
	}
	\keyword{dplot}