Wk 3 - Research Questions for Associations - Contingency Tables and Correlation

Question 1

What is a confidence interval?

Answer 1

A confidence interval defines a range of plausible values for the unknown population parameter that we are interested in making inferences about from our single observed sample statistic.

Question 2

What data is required to construct a confidence interval?

Answer 2

1. The observed test statistic
2. The standard error for the sample statistic
3. The critical test statistic (defined by alpha)

Question 3

What is the level of confidence?

Answer 3

100 x (1 - alpha)

So with an alpha level of 0.05, the CI will be 95%

Question 4

What does a confidence interval allow us to do?

Answer 4

Make inferences about a population parameter based on a sample statistic.

Question 5

What does a 95% confidence interval tell us about the corresponding population parameter?

Answer 5

That we can be 95% confident that the range of values for the population parameter that corresponds to an observed sample statistic, will be between the upper and lower bound of the CI.

Question 6

When does the value of p increase in a p-value function plot (when conducting multiple null hypothesis tests)?

Answer 6

The closer to the mean, the larger the p value. The further from the mean, the smaller the p value (and more likely p will be less than 0.05)

Question 7

Why is a confidence interval more informative than a null hypothesis significance test?

Answer 7

Because it defines a range of plausible values for the population parameter we are interested in, rather than just a single value (as in NHST).

Question 8

What can’t a p-value from a NHST tell us?

Answer 8

Can’t tell us about the range of values for the corresponding population parameter. The p value is only indirectly relevant when making inferences about the population, while the CI is directly relevant.

Question 9

Is a confidence interval an expression of probability?

Answer 9

No! Doesn’t tell us that there’s a 95% chance a given population parameter will be between the upper and lower bound of CI.

Only in the long run, over repeated applications will 95% of CIs contain the population parameter.

Question 10

Is a confidence interval an expression of probability?

Answer 10

No! Doesn’t tell us that there’s a 95% chance a given population parameter will be between the upper and lower bound of CI.

Question 11

What kind of statistical techniques are used for ASSOCIATIONS?

Answer 11

1. For categorical data, a contingency table, chi-squared and odds ratio
2. For continuous data, correlation.

Question 12

What kind of association is investigated using correlation?

Answer 12

Associations between continuous variables

Question 13

What does an association imply?

Answer 13

A relationship between variables (a systematic co-occurence between two variables)

Question 14

What is meant by categorical data?

Answer 14

Nominal or ordinal scales of measurement. Use of numbers to label categories is arbitrary.

Question 15

What is meant by continuous data?

Answer 15

Values imply some sort of meaningful order. Low scores imply that a person has less of a construct (and vice versa for high scores)

Question 16

What are the four components of a research question?

Answer 16

1. A question mark
2. Type of association
3. identifying relevant population
4. Defining and measuring constructs

Question 17

What is chi-squared used to measure?

Answer 17

An association between categorical variables.

Question 18

What is correlation used to measure?

Answer 18

An association between continuous variables.

Question 19

What is meant by a contingency between two variables?

Answer 19

An association in which there is a dependency between the frequencies of one categorical variable and the frequencies of the other.

Question 20

What is an independent relationship between variables?

Answer 20

No association.

Question 21

What is a dependent relationship between variables?

Answer 21

An association in which the frequencies in one category co-occur with frequencies in another category.

Question 22

What is a Chi Squared test

Answer 22

A null hypothesis significance test between frequencies in two categorical variables.

Question 23

What does the null hypothesis for a chi-squared NHST say?

Answer 23

That there is no relationship between variables. That observed and expected frequencies are the same.

Question 24

What does Chi Square statistic measure

Answer 24

The difference between observed & expected frequencies.

Question 25

What is the formula for calculating chi squared?

Answer 25

The sum of (observed - expected scores)^2/ expected scores

Question 26

How are expected frequencies determined?

Answer 26

row marginal frequency x column marginal frequency/

Question 27

What is the effect of large effects and large sample sizes on Tobs?

Answer 27

The observed test statistic will be larger when the effect is bigger and/or the sample size is bigger (pref. both)

Question 28

What is an Odds Ratio?

Answer 28

The probability of an event occurring in one variable relative to the probability of an second and different category occurring in a different variable.

Question 29

What are odds?

Answer 29

The probability of some event occurring relative to it not occurring.

Question 30

What are the odds of an event occurring?

Answer 30

P/ (1 - P)

Question 31

What are the 5 properties of odds ratios?

Answer 31

1. OR = 1 (equals no association, variables are independent of one another)
2. OR can’t be negative (range from 0 - infinity)
3. The further away from ‘1’, the stronger the association (i.e..closer to 0, or closer to infinity)
4. Odds ratio is undefined if any cell value is zero
5. The odds ration does not depend on which variable defines the rows and which one defines the columns of the contingency table

Question 32

What is the formula for odds ratio?

Answer 32

a xd/ b x c

Question 33

Can odds ratios be formed form contingency tables bigger than 2 x 2?

Answer 33

No

Question 34

How is an odds ratio larger than 1 interpreted in terms of the variables in the contingency table?

Answer 34

The odds of the variable in the ‘leading cell’ (a) are more likely to occur than it not occurring.

Question 35

Why is odds ratio useful as a measure of effect size?

Answer 35

Because the OR is

1. a sample statistic
2. an (unknown) population parameter

Question 36

What does a CI that contains 1 tell us

Answer 36

That a null association is possible at a population level.

Question 37

What does a CI that does not contain 1 tell us?

Answer 37

That the odds ration is significantly different from the null hypothesised value of 1.

It also provides a range of plausible values for the association at a population level.

Question 38

How is an odds ratio that is less than one interpreted?

Answer 38

By inverting the odds ratio

= 1/odds ratio value (when this value is less than one)

Question 39

How is a confidence interval for an odds ratio inverted?

Answer 39

By dividing the upper and lower bound into 1 and then swapping upper and lower bound around. eg. 1/lower bound value; 1/upper bound value.

Question 40

How is an inverted odds ratio interpreted?

Answer 40

The odds are lower for the people in the ‘leading cell’ (a) by the value of the odds ratio. The confidence interval provides estimate that the odds are XX lower for people in category (cell a) than for the other category) between a certain range of values.

Question 41

What cell determines the interpretation of the odds ratio?

Answer 41

The ‘a’ cell in the contingency table.

Question 42

Is the sample odds ratio a biased or unbiased estimator?

Answer 42

Biased but consistent (estimates popn odds ratio more accurately as sample size increases).

The confidence intervals are not biased.

Question 43

What does sample variance allow us to quantify?

Answer 43

The variability in construct scores

Question 44

What is covariance?

Answer 44

The extent to which scores on measures of two constructs systematically vary together

Question 45

What formula is used to calculate sample variance?

Answer 45

s^2 is the sum of squared deviation scores divided by the sample size -1 (df)

s^2 = sum (X - M)^2/ n-1

Question 46

What is the formula for covariance?

Answer 46

s xy = sum (x - M)*(y - M)/n-1

Question 47

What is a standardised covariance score called?

Answer 47

The pearson product moment correlation coefficient.

Question 48

What is the formula for the pearson’s correlation?

Answer 48

Rxy = sum (Zx)*(Zy)/n-1

Question 49

What value indicates no correlation?

Answer 49

Zero (the variables are independent of each other)

Question 50

What value indicates a perfect correlation?

Answer 50

1

Question 51

What range of values can the correlation coefficient be between?

Answer 51

Between +1 and -1

Question 52

What does a correlation between 0 and -1 indicate?

Answer 52

A negative correlation (high scores on one variable are associated with low scores on the other)

Question 53

What does a correlation between 0 and +1 indicate?

Answer 53

A positive correlation (high and low scores tend to be associated for both variables)

Question 54

What is the advantage of using a standardised metric when calculating ‘r’?

Answer 54

One correlation can be compared to another because they are in a standardised metric.

Question 55

What happens to the strength of association as r approaches +1 or -1?

Answer 55

The association becomes stronger.

Question 56

How does a negative correlation look on a scatterplot?

Answer 56

Data points go from top left to bottom right.

Question 57

How does a positive correlation look on a scatterplot?

Answer 57

Data points go from bottom left to top right.

Question 58

What does the size of the correlation indicate?

Answer 58

It’s strength

Question 59

What does the sign (+ or -) tell us about a correlation?

Answer 59

It’s direction

Question 60

What theoretical probability distribution is associated with a sampling distribution of the correlation coefficients?

Answer 60

It is t-distributed

Question 61

What happens to the t-distribution as the degrees of freedom increase?

Answer 61

It becomes closer and closer to a normal distribution

Question 62

Why is ‘r’ a natural measure of effect size?

Answer 62

Because it tells us both the strength and direction of the association.

Question 63

What is the null hypothesis for a sample correlation state?

Answer 63

That the population r (p) will equal 0

Question 64

What are the degrees of freedom for a correlation?

Answer 64

n- 2 (one data point can’t move for each variable)

Question 65

How is the observed test statistic calculated for a correlation coefficient?

Answer 65

Tobs = r - 0/standard error

Question 66

What will produce a larger Tobs?

Answer 66

1. A larger value for r (increases the numerator and reduces standard error)
2. Bigger sample size (which reduces standard error)

Question 67

What effect does r and sample size have on standard error?

Answer 67

Larger ‘r’ and larger sample size both reduce standard error.

Question 68

When are you likely to get a small p value?

Answer 68

When there is a large t-value (larger sample size, larger ‘r’ and bigger T-obs all lead to smaller p)

Question 69

What does a confidence interval tell us about a sample correlation coefficient?

Answer 69

It provides a range of possible values between which the corresponding population parameter may be found.

Question 70

What does a Ci that contains a value of zero tell us?

Answer 70

That a correlation of zero is plausible at a population level and a significant correlation is therefore unlikely.

Question 71

What happens to the size of the Ci as sample size increases?

Answer 71

The width of the CI decreases and becomes more precise.

Question 72

What are the assumptions of the Pearson correlation coefficient?

Answer 72

That both variables are:

1. Linearly related to each other
2. That both variables are continuous
3. Independence of observations
4. Normally distributed
5. Measured without error
6. Unrestricted in their range

Question 73

What kind of estimator is the Pearson Correlation Coefficient?

Answer 73

A biased but consistent estimator.

Question 74

What happens to the Pearson correlation when its assumptions are violated?

Answer 74

It becomes more biased

Question 75

What happens to the Pearson coefficient when scores on both variables are normally distributed.

Answer 75

Both point and interval estimates are unbiased.

Question 76

What happens to the Pearson correlation when both variables are non-normally distributed?

Answer 76

The estimator for sample correlation remains unbiased, but the confidence interval becomes biased and inconsistent.