Explaining: Spearman's Rank Correlation Coefficient
Вставка
- Опубліковано 26 лип 2024
- Spearman's rank is probably one of the most useful statistical tests that we can do in Geography to prove a relationship between two different sets of data. In this video I explain how to use it and and what it means. This is ideal for Geography coursework.
Thank you - your explanation was completely clear and fresh, even though my brain feels utterly tired!
Thank you - very helpful. Note, though the "14" width should have rank 7 and the "18" width should have rank 6 in the first Sunflower example.
Whoua! Great video. Thank you very much.
Very good explanations. Thanks for sharing!
Thank you for the clear explanation and getting to the point.
Really clear explanation - thank you :)
Thank you, this was very clear.
Thank you so much. It was very helpful.
Thank you!
Nice
Hi, thanks for these explanations. It's is very clear. I have two questions: First, would it be possible to use spearman's rank correlation with different rank numbers (eg: 7 ranks for the height and 10 for the width)?. Second, would it be possible to use the formula by ranking pvalues? Thanks plenty, Najla
1. I dont think that would be well defined. We cant even apply Pearsons correlation to unmatched data. I.e. it doesnt make sense to compare two data sets of different length. An extreme example is to compare 1 data value against no data value (e.g. height 1.7m, weight unknown).
2. Depends on whether the p-values are comparable. Some argue that p-values should only be seen as binary, either being greater than or less than the level of significance, and that the value of p-values should be ignored.
When there are repeated values I find a different formula where the D^2 gets terms added for each repeated value a 1/2(value^3 -value). For each value that is repeated a term is added to the numerator. Can you explain why your formula is different?
Can it be computed for all quantitative variables??
Thanks a lot I’m regretting taking geography tho lol