What is naive about Naive Bayes? Have an exam later, and this was a question on the sample paper we received. We haven't found a good clear answer yet, could anyone explain this?

There's actually a very good example on Wikipedia:
Basically, it's "naive" because it makes assumptions that may or may not turn out to be correct. 


If your data is composed of a feature vector X = {x1, x2, ... x10} and your class labels Y = {y1, y2, .. y5}. Thus, a Bayes classifier identifies the correct class label as the one that maximizes the following formula : P(y/X) = P(X/y) * P(y) = P(x1,x2, ... x10/ y) * P(y) So for, it is still not Naive. However, it is hard to calculate P(x1,x2, ... x10/ Y), so we assume the features to be independent, this is what we call the Naive assumption, hence, we end up with the following formula instead P(y/X) = P(x1/y) * P(x2/y) * ... P(x10/y) * P(y) 

