Difference between revisions of "Least squares modelling (2013)"
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Kevin Dunn (talk | contribs) |
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plot(V, T) | plot(V, T) | ||
v.new <- seq(0, 1.5, 0.1) | v.new <- seq(0, 1.5, 0.1) | ||
t.pred <- coef(model)[1] + coef(model)[2]*v.new | t.pred <- coef(model)[1] + coef(model)[2] * v.new | ||
lines(v.new, t.pred, type="l", col="blue") | lines(v.new, t.pred, type="l", col="blue") | ||
Revision as of 16:01, 27 February 2013
Class date(s): | 08 February 2013 | ||||
(PDF) | Course slides | ||||
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Course notes and slides
- Course textbook (print chapter 4)
- Slides for class
Software source code
Take a look at the software tutorial.
Code used in class
Thermocouple data
V <- c(0.01, 0.12, 0.24, 0.38, 0.51, 0.67, 0.84, 1.01, 1.15, 1.31)
T <- c(273, 293, 313, 333, 353, 373, 393, 413, 433, 453)
plot(V, T)
model <- lm(T ~ V)
summary(model)
coef(model)
confint(model) # get the coefficient confidence intervals
resid(model) # model residuals
library(car)
qqPlot(resid(model)) # q-q plot of the residuals to check normality
plot(V, T)
v.new <- seq(0, 1.5, 0.1)
t.pred <- coef(model)[1] + coef(model)[2] * v.new
lines(v.new, t.pred, type="l", col="blue")
# Plot x against the residuals to check for non-linearity
plot(V, resid(model))
abline(h=0)
# Plot the raw data and the regression line in red
plot(V, T)
abline(model, col="red")