inferential statistics Flashcards
1
Q
inferential statistics
A
- Descriptive statistics describe a sample
* Inferential statistics allow us to make inferences about the larger population
2
Q
Determining Analyses
A
- Need to know method
- Analysis will depend on study design
- Once we know this, we can work out what analysis to use
3
Q
Univariate data
A
- So far we’ve looked at one variable (univariate data)
- Summarising
- Visualising
- Understanding
- Univariate data can only really answer simple questions
4
Q
bivariate data
A
- Univariate means 1 variable
- Bivariate means 2 variables
- Bivariate data can be:
- 2 continuous variables
- 2 categorical variables
- 1 continuous and 1 categorical variable
5
Q
building a model
A
- Lots of different variables influence RPE
- Use a path diagram to model relationship
- We hypothesise that there will be a relationship between caffeine and RPE
- Univariate data can only really answer simple questions
- We usually want to answer more interesting questions
- Bivariate data allow us to do this
6
Q
scatterplpots
A
- Numbers often aren’t easy to understand
- Visualising data gives us a head-start
- Statistics don’t give us the full picture
- Scatterplots help us to understand our data
- Used with 2 continuous variables
- One on each axis
- Doesn’t matter which order
- We can look at:
- The pattern of the data
- The spread of the data
- The orientation of the data
7
Q
interpreting scatterplots
A
- Scatterplots help to describe our sample
- Any relationships / patterns between variables
- How much of a relationship
- The type of relationship
- Outliers in the data
8
Q
linear relationships
A
- Linear = straight line
- As one variable changes, the other variable changes
- e.g. RPE increases as caffeine increases
- The rate of change remains constant
- e.g. a 5mg increase in caffeine results in 2.5 increase in RPE
9
Q
curvilinear relationships
A
- Most common example is Yerkess-Dodson
- As one variable changes another variable changes, but only up to a certain point
- After that point, there’s either no relationship, or the direction of the relationship changes
10
Q
exponential relationships
A
- As one variable changes another variable changes
- Unlike linear relationships, the other variable changes exponentially
- i.e. as x increases, the rate at which y changes also increases
11
Q
What do we mean by ‘change’
A
- Could mean as one variable increases, the other variable increases
- This is a positive relationship
- Could mean as one variable increases, the other variable decreases
- This is a negative relationship
12
Q
no relationship
A
- Sometimes there is no relationship
- Scatterplot points don’t form a pattern
- Linear, curvilinear, or exponential
- Negative or positive
- There is no meaningful relationship between two variables
