precision and confidence levels Flashcards
1
Q
standard error
A
- Estimate of precision
- Smaller SE = more precise
- Makes the jump from sample to population
- A larger SD results in a larger standard error (more variability means more uncertainty)
- A larger n results in a smaller standard error (more people in the sample means less uncertainty)
2
Q
SD vs SE
A
- Standard deviation and standard error mean very different things
- SD relates to how spread out the values are in the sample collected (descriptive)
- SE relates to how precise our mean estimate is (inferential)
3
Q
how we use SE
A
- Use it to calculate many inferential statistics
- Significance tests
- Confidence intervals
4
Q
confidence intervals
A
- Estimate (mean) is not likely to be the ‘true’ estimate
- SE indicates how precise the estimate is
- Can use these together to give idea of what the true estimate is
- We attach a level of confidence to this idea
- Confidence intervals are linked to the central limit theorem
- If I was to take repeated random samples, 95% of my confidence intervals would contain the true population estimate
- Often use 95% however some fields use 99%
- All estimates of population values should be presented with a CI
- My sample estimate is my best guess, and I am 95% confident that the true population estimate is between these two limits
5
Q
how to calculate a confidence interval
A
Take mean and multiply by SE
6
Q
when can’t we use confidence intervals
A
- If the data is not normally distributed, we can’t use mean/SD
- If the data is ‘too’ heavily skewed, the normality assumption means we cannot use the SE
7
Q
SE assumptions
A
- Data is approximately normally distributed
* There is sufficient sample size (>20 individuals)
