Difference between revisions of "Univariate data analysis (2014)"

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== Class example, 27 Jan ==
== Class example, 27 Jan ==
Test for differences: plotting the raw data.
Test for differences: plotting the raw data.
[http://www.r-fiddle.org/#/fiddle?id=deSYk0W1&version=2 Run this code in a web-browser]
<syntaxhighlight lang="rsplus">
<syntaxhighlight lang="rsplus">
dilution <- round(rnorm(N, mean=BOD.mean, sd=BOD.sd))
manometric <- round(rnorm(N, mean=BOD.mean*1.6, sd=1.5*BOD.sd))
# Analysis of the data here:
# Analysis of the data here:
dilution <-  c(11, 26, 18, 16, 20, 12,  8, 26, 12, 17, 14)
dilution <-  c(11, 26, 18, 16, 20, 12,  8, 26, 12, 17, 14)

Latest revision as of 06:54, 4 January 2017

Class date(s): 13 to 23 January 2014
Nuvola mimetypes pdf.png (PDF) Course slides








Class materials

Date Class number Video and audio files Other materials Reading (PID) Slides
13 January 02A Video (343 M) Audio (42 M) R demo file Chapter 2 Nuvola mimetypes pdf.png Slides for class
15 January 02B Video (327 M) Audio (42 M) See code below
16 January 02C Video (347 M) Audio (42 M) See code below
20 January 03A Video (347 M) Audio (42 M) Using tables of the normal distribution
22 January 03B Video (262 M) Audio (42 M) Using tables of the t-distribution
23 January 03C Video (293 M) Audio (41 M) None
27 January 04A Video from 2013 (357M) Audio from 2013 (43M) See code below
29 January 04B Video (180 M) Audio (24 M) None

Software source code

Please follow the software tutorial to install and run the course software. You should be able to quickly read, understand and use the material in steps 1 to 13.

Class example, 15 Jan

Seeing the Central Limit Theorem in action: rolling dice. Run this code in your browser (no need to install/run in R)

N = 500
m <- t(matrix(seq(1,6), 3, 2))
layout(m)
s1 <- as.integer(runif(N, 1, 7))
s2 <- as.integer(runif(N, 1, 7))
s3 <- as.integer(runif(N, 1, 7))
s4 <- as.integer(runif(N, 1, 7))
s5 <- as.integer(runif(N, 1, 7))
s6 <- as.integer(runif(N, 1, 7))
s7 <- as.integer(runif(N, 1, 7))
s8 <- as.integer(runif(N, 1, 7))
s9 <- as.integer(runif(N, 1, 7))
s10 <- as.integer(runif(N, 1, 7))

hist(s1, main="", xlab="One throw", breaks=seq(0,6)+0.5)
bins = 8
hist((s1+s2)/2, breaks=bins, main="", xlab="Average of two throws")
hist((s1+s2+s3+s4)/4, breaks=bins, main="", xlab="Average of 4 throws")
hist((s1+s2+s3+s4+s5+s6)/6, breaks=bins, main="", xlab="Average of 6 throws")
bins=12
hist((s1+s2+s3+s4+s5+s6+s7+s8)/8,  breaks=bins, main="", xlab="Average of 8 throws")
hist((s1+s2+s3+s4+s5+s6+s7+s8+s9+s10)/10, breaks=bins, main="", xlab="Average of 10 throws")

Class example, 16 Jan

# Read data from a web address
batch <- read.csv('http://datasets.connectmv.com/file/batch-yields.csv')


Code used to illustrate how the q-q plot is constructed:

Run this code in your browser (no need to install/run in R)

N <- 10

# What are the quantiles from the theoretical normal distribution?
index <- seq(1, N)
P <- (index - 0.5) / N
theoretical.quantity <- qnorm(P)

# Our sampled data:
yields <- c(86.2, 85.7, 71.9, 95.3, 77.1, 71.4, 68.9, 78.9, 86.9, 78.4)
mean.yield <- mean(yields)       # 80.0
sd.yield <- sd(yields)           # 8.35

# What are the quantiles for the sampled data?
yields.z <- (yields - mean.yield)/sd.yield
yields.z
 
yields.z.sorted <- sort(yields.z)

# Compare the values in text:
yields.z.sorted 
theoretical.quantity  

# Compare them graphically:
plot(theoretical.quantity, yields.z.sorted, asp=1)
abline(a=0, b=1)

# Built-in R function to do all the above for you:
qqnorm(yields)
qqline(yields)

# A better function: see http://learnche.mcmaster.ca/4C3/Software_tutorial/Extending_R_with_packages
library(car)
qqPlot(yields)

Code used to illustrate the central limit theorem's reduction in variance:

Run this code in your browser (no need to install/run in R)

# Show the 3 plots side by side
layout(matrix(c(1,2,3), 1, 3))

# Sample the population:
N <- 100
x <- rnorm(N, mean=80, sd=5)
mean(x)
sd(x)

# Plot the raw data
x.range <- range(x)
plot(x, ylim=x.range, main='Raw data')

# Subgroups of 2
subsize <- 2
x.2 <- numeric(N/subsize)
for (i in 1:(N/subsize))
{
    x.2[i] <- mean(x[((i-1)*subsize+1):(i*subsize)])
}
plot(x.2, ylim=x.range, main='Subgroups of 2')

# Subgroups of 4
subsize <- 4
x.4 <- numeric(N/subsize)
for (i in 1:(N/subsize))
{
    x.4[i] <- mean(x[((i-1)*subsize+1):(i*subsize)])
}
plot(x.4, ylim=x.range, main='Subgroups of 4')

Class example, 27 Jan

Test for differences: plotting the raw data.

Run this code in a web-browser

# Analysis of the data here:
dilution <-   c(11, 26, 18, 16, 20, 12,  8, 26, 12, 17, 14)
manometric <- c(25,  3, 27, 30, 33, 16, 28, 27, 12, 32, 16)

mean(manometric)
mean(dilution)

plot(c(dilution, manometric), ylab="BOD values", xaxt='n')
text(5.5,3, "Dilution")
text(18,3, "Manometric")
abline(v=11.5)

par(mar=c(4.2, 4.2, 0.2, 0.2))  # (bottom, left, top, right); defaults are par(mar=c(5, 4, 4, 2) + 0.1)
plot(dilution, type="p", pch=4, 
    cex=2, cex.lab=1.5, cex.main=1.8, cex.sub=1.8, cex.axis=1.8, 
    ylab="BOD values", xlab="Sample number",
    ylim=c(0,35), xlim=c(0,11.5), col="darkgreen")
lines(manometric, type="p", pch=16, cex=2, col="blue")
lines(rep(0, N), dilution, type="p", pch=4, cex=2, col="darkgreen")
lines(rep(0, N), manometric, type="p", pch=16, cex=2, col="blue")

abline(v=0.5)

legend(8, 5, pch=c(4, 16), c("Dilution", "Manometric"), col=c("darkgreen", "blue"), pt.cex=2)


par(mar=c(4.2, 4.2, 0.2, 0.2))  # (bottom, left, top, right); defaults are par(mar=c(5, 4, 4, 2) + 0.1)
plot(dilution-manometric, type="p", ylab="Dilution - Manometric", xlab="Sample number", 
     cex.lab=1.5, cex.main=1.8, cex.sub=1.8, cex.axis=1.8, cex=2)
abline(h=0, col="grey60")