Question: Suppose Pr(A) = Pr(B) and Pr(E | A) / Pr(E | B) > 1. Which one of the following must be true then? Assume all

Suppose Pr(A) = Pr(B) and Pr(E | A) / Pr(E |

B) > 1. Which one of the following must be true then?

Suppose Pr(A) = Pr(B) and Pr(E | A) / Pr(E | B) > 1. Which one of the following must be true then? Assume all conditional probabilities are well-defined. O Pr(B | E) > Pr(B) O Pr(A | E) > Pr(A) O Pr(A | E) = Pr(B | E) O Pr(A | E) > Pr(B | E) O Pr(A | E)

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