Week 3

Question 1

What does descriptive statistics focus on?

Answer 1

Descriptive statistics focuses directly on summarising
and presenting data.

Question 2

What does portray the data?

Answer 2

Tables and data visualisation (e.g. graphs) portray the
data.

Question 3

What are some examples of charts?

Answer 3

Examples of charts include histograms, scatter plots,
and line graphs, among many more.

Question 4

What are descriptive measures used for?

Answer 4

Descriptive measures are used to summarise data.

Question 5

What is descriptive statistics commonly divided into?

Answer 5

Descriptive statistics is commonly divided into
measures of central tendency and measures of
variability.

Question 6

What do measures of central tendency focus on?

Answer 6

• Measures of central tendency focus on the average or
  middle values.

Question 7

What do measures of variability focus on?

Answer 7

Measures of variability focus on the dispersion of data.

Question 8

What are examples of measures of central tendency?

Answer 8

Measures of central tendency describe the center
position of a distribution for a dataset.
* Examples of measures of central tendency include the
mean, median, and mode.

Question 9

Do measures of central tendency give a whole picture of the dataset?

Answer 9

Measures of central tendency give only a partial
picture of a dataset.

Question 10

What do measures of variability aid in?

Answer 10

Measures of variability (or the measures of spread) aid
in analysing how dispersed is a data distribution.
* For example, while the mean of the data maybe 65 out
of 100, there can still be data points at both 1 and 100.

Question 11

What are examples of measures of variability?

Answer 11

Measures of variability help
communicating this by
describing the shape and
spread of the dataset.
* Variance, range, and quartiles
are examples of measures of
variability

Question 12

What are variables?

Answer 12

Variables are factors that can take on more than one
value.

Question 13

How do we generally calculate a descriptive statistic?

Answer 13

Generally, we calculate a descriptive statistic by summarising
that variable’s distribution.

Question 14

What does distribution refer to?

Answer 14

Distribution refers to the different values that can be assumed,
and their frequency (i.e. how often each value occur).

Question 15

What do we care about for discrete data?

Answer 15

For discrete data, we care especially about:
– Commonly occurring values (e.g. mode).
– Unusual values (e.g. outliers).
– Patterns in between.

Question 16

What is univariate descriptive statistics?

Answer 16

Only describing one variable at a time, so it is called
univariate descriptive statistics.

Question 17

What are some types of variables?

Answer 17

Types of variables: Discrete, Binary, Categorical, Continuous.

Question 18

What are some good practices with graphs and tables?

Answer 18

• Graphs and tables should be able to stand on their
  own.
• Titles should clearly explain what the graph or table
  is about.
• Notes aim to inform the reader about data source,
  sample size.
• Notes can also be used to explain abbreviations,
  symbols, or mention further details.

Question 19

What is the one way table?

Answer 19

The one-way table
is the tabular
equivalent of a bar
chart.
* It displays
categorical data in
the form of
frequency counts
and/or relative
frequencies.

Question 20

What are distributional features of interest?

Answer 20

Distributional features of
interest:
– Commonly occurring
values.
– Unusual values.
– Patterns in between.

Question 21

What are good practices with tables?

Answer 21

Clearly identify the variables included in the rows and
columns.
* Variable names must be meaningful.
* Order the rows to aid interpretation:
– Relevant values/ information at the top.
* We should be able to convert a percentage table back into
numbers and vice-versa

Question 22

What should tables visually do?

Answer 22

Visually, tables should:
* Avoid vertical lines.
* A minimum of horizontal lines to clarify meaning.
* Separating headings from the remaining data.
* Separating table contents from the title and notes.

Question 23

What are pie charts good at?

Answer 23

Good at presenting data when:
– Discrete (and mutually exclusive) variable.
– Small number of categories (not too much more than 6).
– Real variation across categories.
– Exhaustive: total adds up to 100%.

Question 24

Why are pie charts under attack?

Answer 24

Pie chart options under attack these days:
– Hard to compare angles (as opposed to lengths in bar charts).
– Require a legend and a mix of colours – distracting.

Question 25

What are bar charts good at?

Answer 25

Display some measure for discrete categories.
* Enables direct comparison:
– Bar height proportional to the size of the category they
represent.
* No scale for x-axis because it is the category name.
* Space between bars: Categories are discrete.
* Summing across all bars should equal 100%.

Question 26

What are graphs and tables powerful at?

Answer 26

• Graphs and tables are a powerful way of communicating
  complex information clearly and accurately.

Question 27

What is a frequency distribution?

Answer 27

A frequency distribution is a tabular summary of a
dataset showing the frequency (or number) of items in
each of several nonoverlapping classes.

Question 28

What is the objective of frequency distribution?

Answer 28

The objective is to provide insights about the data that
cannot be quickly obtained by inspecting the original raw
data.

Question 29

What is frequency distribution for qualitative data?

Answer 29

For qualitative data, it means simply counting the
number of times each value occurs.

Question 30

What is the frequency distribution for quantitative data?

Answer 30

• For quantitative data, this means either counting values
  (discrete data) or grouping the values (continuous data).

Question 31

What is symmetric frequency distribution?

Answer 31

Symmetric:
In the case that a distribution is split into two identical
halves

Question 32

What is skewness frequency distribution?

Answer 32

Skewness:
Level of asymmetry in which an elongated tail extends in
either the right-hand direction (i.e. positive skewness) or
the left-hand direction (i.e. negative skewness).

Question 33

What is kurtosis frequency distribution?

Answer 33

Kurtosis:
Degree of peakedness or steepness in a distribution.

Question 34

What is the effect of distribution shape on descriptive measures?

Answer 34

The shape of the distribution has an influence on
virtually all the statistical descriptive measures.
* When a distribution is perfectly symmetrical, the mean
and the median values are the same.
* When a distribution is skewed, this equivalence
disappears.
In that case, the median tends to be more representative
of the dataset than the mean.

Question 35

What is the mean?

Answer 35

The mean is also known as the average, expected value,
expectation, mathematical expectation, or first moment.
* Expected value is a key concept in economics, finance,
and many other subjects.
* There are several types of means in statistics.
* Three widely used means are the geometric mean (GM),
harmonic mean (HM), and arithmetic mean (AM).

Question 36

What is the arithmetic mean?

Answer 36

Arithmetic Mean: it is the sum of all of the numbers
divided by the number of numbers.
* Similarly, the mean of a sample 𝑥1, 𝑥2,…, 𝑥𝑛, usually
denoted by 𝑥ҧ, is the sum of the sampled values divided by
the number of items in the sample:

Question 37

What is the median?

Answer 37

The median is the value that separates a set of values into
two perfectly equal halves.
* The median is the middle value in an ordered list of the
data.
* In the case a dataset contains extreme values, the median
is generally the preferred measure of central location.
* If there is an odd number of items, the median is the
value of the middle item.

Question 38

What is the mode?

Answer 38

The mode is the element that occurs most often in a
dataset.
* A dataset may have zero, one (unimodal), two (bimodal),
or more (multimodal) modes.
* For example, the mode of the sample [1, 3, 6, 6, 6, 6, 7, 7,
12, 12, 17] is 6.

Question 39

What is variance?

Answer 39

• Variance is a measure of how far a set of numbers is
  spread out from their average value.
• Variance has a central role in statistics, where some ideas
  that use it include descriptive statistics, statistical
  inference, hypothesis testing, among others.
• A disadvantage of the variance for practical applications
  is that its units differ from the random variable.

Question 40

What is the variance an average of?

Answer 40

The variance is the average of the squared differences
between each data value and the mean.

Question 41

What is standard deviation?

Answer 41

The standard deviation is a measure of the amount of
variation or dispersion of the values in a dataset.
* The standard deviation is approximately the average
distance between all individual values in a dataset and its
centre (i.e. the mean).
* A low standard deviation indicates that the values tend to
be close to the mean (also called the expected value) of a
dataset.

Question 42

What does a high standard deviation indicate?

Answer 42

On the other hand, a high standard deviation indicates
that the values are spread out over a wider range.

Question 43

What is the standard deviation of a random variable?

Answer 43

The standard deviation of a random variable, sample,
statistical population, dataset, or probability distribution
is the square root of its variance.

Question 44

What is the range?

Answer 44

• The range is the difference between the smallest and the
  largest values in the dataset, as follows:
  Range = 𝑥max − 𝑥min
• It is the simplest measure of variability.
• It is very sensitive to the smallest and largest data values.

Question 45

What is the mean absolute deviation?

Answer 45

The mean absolute deviation (MAD) measures the
average absolute distance (or deviation) of values in a
dataset from the dataset mean.

Question 46

What are percentiles?

Answer 46

If the value A is the pth percentile value for a dataset, then
at least p% of the values are less than or equal to A and at
least (1 − 𝑝)% of the values are greater than or equal to
A.
* In order to determine the pth percentile we need to:
* Arrange the data in ascending order.

Question 47

What are quartiles?

Answer 47

Quartiles are specific percentiles dividing the data into
four parts.
* The first (lower) quartile corresponds to the 25th
percentile (Q1).
* The second quartile corresponds to the 50th percentile,
which is also the median (Q2).
* The third (upper) quartile corresponds to the 75th
percentile (Q3).

Question 48

What is the interquartile range?

Answer 48

The interquartile range of a dataset is the difference
between the third and the first quartile, calculated as
follows:
IQR = Q3 − Q1
* It is the range for the middle 50% of the data.
* It overcomes the sensitivity to extreme data values.

Question 49

What is a distribution?

Answer 49

A distribution is simply a collection of data or scores (e.g.
z-score, t score) of a variable.
* The values of a distribution are commonly ordered (e.g.
from smallest to largest).
* Distributions are commonly depicted using data
visualisation tools (e.g. charts).

Question 50

What does represent probability in a continuous probability distribution?

Answer 50

In a continuous probability distribution, it is the area, instead of
height, that represents probability.

Question 51

What is the normal distribution?

Answer 51

The Normal (also know and Gaussian) probability
distribution is the most popular distribution for
describing a continuous random variable in statistics.
* It plays a crucial role in the theory of sampling and is
widely used in statistical inference.
* Many natural phenomena have patterns that resemble
the normal distribution (e.g. body weight, shoe size, IQ,
etc).

Question 52

What assumption is the assumption of normality based on?

Answer 52

Many statistics are based on the assumption of normality.
* In terms of parameters, the Normal distribution contains
a mean 𝜇 and a variance 𝜎
2
(and, consequently, standard
deviation 𝜎), determining the centre and width of the
distribution, respectively.
* The highest point on the Normal curve is at the mean,
which is also the median and the mode.

Question 53

What does the shape of normal distribution resemble?

Answer 53

The shape of the Normal distribution resembles a shape
of a bell (i.e. bell-shaped curve).

Question 54

What is the central limit theorem?

Answer 54

This is one of the most important theorems in statistics.
* A sample size of 𝑛 ≥ 30 is considered large.
* Whenever the population has a Normal distribution, the
sampling distribution of the sample mean has a normal
distribution for any sample size.
As sample size increases, the sampling distribution of the
sample mean rapidly approaches the bell shape of a normal
distribution, regardless of the shape of the population.
In small sample cases (𝑛 < 30), the sampling distribution of
sample mean will be normal so long as the population is
normal.

Question 55

What is a standard normal distribution?

Answer 55

• A random variable that has a normal distribution with a
  mean of zero and a standard deviation of one is said to
  have a standard normal probability distribution.
• The letter z is commonly used to designate the standard
  normal random variable. More specifically, a z-score.

Question 56

What is the law of large numbers?

Answer 56

• The law of large numbers (LLN) consists of a theorem that
  describes the result of performing the same experiment a large
  number of times.
• According to the LLN, the mean of the results obtained from a
  large number of trials should be close to the expected value
  and tends towards the expected value as more trials are
  performed.
• The LLN is relevant due to the fact that it guarantees stable
  long-term results for the averages of some random events.

Question 57

What is hypothesis testing?

Answer 57

*In hypothesis testing, a statement – call it a hypothesis – is
made about some characteristic of a particular population.
*A sample is then taken in an effort to establish whether or
not the statement is true.
*If the sample produces results that would be highly
unlikely under an assumption that the statement is true,
then we’ll conclude that the statement is false.
▪ The null hypothesis H0
is the statement to be tested.
▪ The alternative hypothesis Ha is the opposite of what is
stated in the null hypothesis.

Question 58

How to establish the hypothesis?

Answer 58

*The status quo (no change) position serves as the null
hypothesis.
*Compelling sample evidence to the contrary would have
to be produced before we’d conclude that a change in
prevailing conditions has occurred.
*This approach usually involves a decision that needs to
be made if the null hypothesis is rejected.
*Example:
*H0
: The machine continues to function properly.
*Ha
: The machine is not functioning properly

Question 59

What does it mean by accepting or rejecting a hypothesis?

Answer 59

Failing to reject a null hypothesis shouldn’t be taken to
mean that we necessarily agree that the claim is true.
*We’re simply concluding that there’s not enough sample
evidence to convince us that it’s false.
*It’s for this reason we’ve chosen to use the phrase “fail to
reject” rather than “accept” the claim.

Question 60

What is the p-value?

Answer 60

The p-value measures the probability that, if the null
hypothesis is true (as an equality), we would randomly
produce a sample result at least as unlikely as the sample
result that we actually produced
p-value Decision Rule
If the p-value is less than a, reject the null hypothesis

Question 61

What is the possibility of hypothesis error?

Answer 61

*Whenever we make a judgment about a population
parameter based on sample information, there’s a chance
we could be wrong.
*In hypothesis testing, in fact, we can identify two types of
potential errors.
a, the significance level, measures the maximum
probability of making a Type I error.

Question 62

What is bootstrapping?

Answer 62

Bootstrapping is a statistical procedure that resamples a
single dataset to create many simulated samples.
* This process allows to calculate standard errors, build
confidence intervals, and perform hypothesis testing.
* Both bootstrapping and traditional methods use samples
to draw inferences about populations.