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Applies Bayes theorem updating probability based on new evidence. Foundation of probabilistic reasoning.

Formula

P(A|B) = P(B|A) × P(A) ÷ P(B)

P: overall probability of evidence — overall probability of evidence
A: likelihood of evidence given A — likelihood of evidence given A
B: overall probability of evidence — overall probability of evidence

Guida passo passo

1P(A|B) = P(B|A) × P(A) ÷ P(B)
2P(A|B) = posterior (updated probability)
3P(A) = prior probability
4P(B|A) = likelihood of evidence given A
5P(B) = overall probability of evidence

Esempi risolti

Ingresso

P(A), P(B|A), P(B)

Risultato

P(A|B) calculated

Errori comuni da evitare

✕Confusing conditional probabilities
✕Not updating priors properly
✕Forgetting normalization constant P(B)

Domande frequenti

What's practical example?

Medical test: prior disease probability, test accuracy, posterior if positive test result.

Why is Bayes important?

Foundation of statistical inference, machine learning, and decision-making under uncertainty.

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