Probability and Significance

Question 1

Acceptance of the Null Hypothesis

Answer 1

If the stats test is not significant the null hypothesis is accepted.

The null hypothesis states there’s no difference or no correlation between the conditions.

The stats test determines which hypothesis (null or alternative) is true and thus which we accept and reject

Question 2

Probability and the Null Hypothesis

Answer 2

Probability is a measure of the likelihood that a particular event will occur.

The null hypothesis is accepted or rejected at a particular level of probability

Question 3

Level of Significance

What are the two compromises?

Answer 3

Usual level of significance is 0.005 (or 5%).
This means the probability that the observed effect (the result) occurred by chance is equal to or less than 5%.

This is a compromise between too lenient (10%) or too stringent (1%)

Question 4

Calculated and Critical Values

Answer 4

To check for statistical significance, the calculated value (ie result of the statistical test) is compared with a critical value in a table of critical values based on probabilities

Question 5

Three Criteria to find the correct Critical Value

Answer 5

1. Hypothesis one-tailed (directional) or two-tailed (non-directional)
2. Number (N) of participants (aka degrees of freedom, df)
3. Level of significance (or p value)

Question 6

One-Tailed Hypothesis

Answer 6

Directional hypothesis

Question 7

Two-Tailed Hypothesis

Answer 7

Non-directional hypothesis

Question 8

Type I Error

Description of this error

Answer 8

The null hypothesis is rejected and the alternative is accepted when the null hypothesis is true.

This is an optimistic error or false positive as a significant difference or correlation is found when one doesn’t exist

Question 9

Type II Error

Description of this error

Answer 9

The null hypothesis is accepted, but in reality, the alternative hypothesis is true.

This is a pessimistic error or false negative

Question 10

What makes a Type I error more likely?

Answer 10

Type I error more likely to be made if the significance level is too lenient (too high, eg 0.1 or 10%)

Question 11

What makes a Type II error more likely?

Answer 11

Type II error is more likely if the significance level is too stringent (too low, eg 0.01 or 1%), as potentially significant values may be missed