Ah, but I can prove my superior understanding by pointing to this thing, which is neither [D] or [E], but from the reference I once read, which probably was peer-reviewed by a respected panel of experts, I can tell you that it shares features from both [D] and [E]. This does not mean that I do not agree with a member that has much more karma than me, it just means that the category used here might suffer from x bias. So we should really apply that theorem from this chapter of Jaynes’ book, to obtain that after all [D] is the correct bayesian option.
Ah, but I can prove my superior understanding by pointing to this thing, which is neither [D] or [E], but from the reference I once read, which probably was peer-reviewed by a respected panel of experts, I can tell you that it shares features from both [D] and [E]. This does not mean that I do not agree with a member that has much more karma than me, it just means that the category used here might suffer from x bias. So we should really apply that theorem from this chapter of Jaynes’ book, to obtain that after all [D] is the correct bayesian option.
Please upvote me, I’m so smart!