Bayes Theorem: P(A∣B)=fracP(B∣A)P(A)P(B)P(A|B) = \\frac{P(B|A)P(A)}{P(B)}P(A∣B)=fracP(B∣A)P(A)P(B). If P(B∣A)=0.5,P(A)=0.4,P(B)=0.5P(B|A)=0.5, P(A)=0.4, P(B)=0.5P(B∣A)=0.5,P(A)=0.4,P(B)=0.5, find P(A∣B)P(A|B)P(A∣B).
frac0.50.5\\frac{0.5}{0.5}frac0.50.5
frac0.10.5\\frac{0.1}{0.5}frac0.10.5
frac0.20.5\\frac{0.2}{0.5}frac0.20.5
frac0.40.5\\frac{0.4}{0.5}frac0.40.5