qqnorm is a generic function the default method of which
produces a normal QQ plot of the values in y.
qqline adds a line to a “theoretical”, by default
normal, quantile-quantile plot which passes through the probs
quantiles, by default the first and third quartiles. qqplot produces a QQ plot of two datasets.
Graphical parameters may be given as arguments to qqnorm,
qqplot and qqline.
qqnorm(y, ...)
"qqnorm"(y, ylim, main = "Normal Q-Q Plot", xlab = "Theoretical Quantiles", ylab = "Sample Quantiles", plot.it = TRUE, datax = FALSE, ...)
qqline(y, datax = FALSE, distribution = qnorm, probs = c(0.25, 0.75), qtype = 7, ...)
qqplot(x, y, plot.it = TRUE, xlab = deparse(substitute(x)), ylab = deparse(substitute(y)), ...)qqplot.xlab and ylab
refer to the y and x axes respectively if datax = TRUE.type of quantile computation used in quantile.qqnorm and qqplot, a list with components
y vector, i.e., the corresponding y
coordinates including NAs.ppoints, used by qqnorm to generate
approximations to expected order statistics for a normal distribution.
require(graphics)
y <- rt(200, df = 5)
qqnorm(y); qqline(y, col = 2)
qqplot(y, rt(300, df = 5))
qqnorm(precip, ylab = "Precipitation [in/yr] for 70 US cities")
## "QQ-Chisquare" : --------------------------
y <- rchisq(500, df = 3)
## Q-Q plot for Chi^2 data against true theoretical distribution:
qqplot(qchisq(ppoints(500), df = 3), y,
main = expression("Q-Q plot for" ~~ {chi^2}[nu == 3]))
qqline(y, distribution = function(p) qchisq(p, df = 3),
prob = c(0.1, 0.6), col = 2)
mtext("qqline(*, dist = qchisq(., df=3), prob = c(0.1, 0.6))")
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