To confirm the formula for probabilities, given that an event has occured, I wonder if it is true that:
$\mathbb{P}(A \mid B)=1-\mathbb{P}(A^{C} \mid B)$
where $\mathbb{P}(A)+\mathbb{P}(A^{C})=1$.
$A$ and $B$ are events.
To confirm the formula for probabilities, given that an event has occured, I wonder if it is true that:
$\mathbb{P}(A \mid B)=1-\mathbb{P}(A^{C} \mid B)$
where $\mathbb{P}(A)+\mathbb{P}(A^{C})=1$.
$A$ and $B$ are events.