No, this is Fisher's exact test. The chi squared test provides an approximate p-value, which becomes too imprecise when dealing with small sample sizes. Fisher provides an exact p-value (thus the name) and is more suitable when dealing with small sample sizes.
What is really frustrating watching this is attempting to replicate since the "original" values change every few minutes (1:48, 2:44, and so on...) Thumbs down since I can't follow you Oxford Academic!
Absolutely brilliantly clear explanation! Thank you very much indeed. Is it a two-tailed Fisher's test?
Hi. If none of my p-values are less 0.05 do I keep going with my possible extreme values until I do get under the significance level?
it is not Fischer test, it's chi-qi square test
No, this is Fisher's exact test. The chi squared test provides an approximate p-value, which becomes too imprecise when dealing with small sample sizes. Fisher provides an exact p-value (thus the name) and is more suitable when dealing with small sample sizes.
What is really frustrating watching this is attempting to replicate since the "original" values change every few minutes (1:48, 2:44, and so on...) Thumbs down since I can't follow you Oxford Academic!