1. Probability

If A and B are independent events: $P (A ∣ B) = P (A)$ and $P (A \cap B) = P (A) . P (B)$
- If A and B are independent: $C o v (A, B) = 0$
A and B are conditionally independent if: $P ((A \cap B) / C) = P (A ∣ C) . P (B ∣ C)$

$P (A ∣ B) = \frac{P ( A \cap B )}{P ( B )} or \frac{P ( A , B )}{P ( B )}$

$P (x_{1}, x_{2}, \dots, x_{n}) = P (x_{1}) P (x_{2} ∣ x_{1}) P (x_{3} ∣ x_{1}, x_{2}) \dots P (x_{n} ∣ x_{1}, ..., x_{n - 1})$

$P (A ∣ B) = \frac{P ( B ∣ A ) P ( A )}{P ( B )}$

$P (A ∣ B) = \frac{P ( A \cap B )}{P ( B )} or P (A \cap B) = P (A ∣ B) . P (B) = P (B ∣ A) . P (A)$

In other words:

$posterior = \frac{likelihood * prior}{evidence}$

$P (A) = P (A ∣ B 1) . P (B 1) + P (A ∣ B 2) . P (B 2) + ... + P (A ∣ B n) . P (B n)$

or,

$p (x) = \sum_{1}^{c} p (x ∣ y_{i}) P (y_{i})$

ToDo:

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