Dependent Events (Conditional Probability)
If the occurrence of an event A is affected by the occurrence of another event B, then the events A and B are dependent. The probability of event B depending on the occurrence of event A is called conditional probability we denote it as P(B/A) and read as ‘the probability of B given A’. Similarly the probability of event A depending on the occurrence of event B is written as P(A/B).
The probability that both the dependent events A and B will occur is given by:
P(A∩B)=P(A).P(B/A) P(A)>0
=P(B).P(A/B) P(B)>0
Properties:
Conditional probabilities P(B/A) and P(A/B) are defined if and only if P(A)≠0 and P(B)≠0 respectively.
For P(B)>0,P(A/B)≤P(A).
P(A/A)=1
If A and B are independent, then P(A/B)=P(A) and P(B/A)=P(B)
∴P(A∩B)=P(A).P(B)
- The experiment with replacement leads to ‘independent events’ whereas an experiment without replacement leads to ‘dependent events’.
- If A⊂B then A∩B=A and P(A/B)=P(A∩B)/P(B)=P(A)/P(B)>P(A)
- If AℶB then A∩B=B and P(A/B)=1
- P(S/B)=P(S∩B)/P(B) =P(B)/(P(B))=1
Conditional Probability Distribution Function
Definition: Let X and Y be two random variables, discrete or continuous. The conditional distribution of the random
variable Y given X=x is
$F_Y$ (Y/X)=($F_XY$ (x,y))/($F_X$ (x) ), $F_X$ (x)>0
Similarly, the conditional distribution of the random variable X, given that Y=y is
$F_X$ (X/Y)=($F_ XY$ (x,y))/($F_Y$ (y) ), $F_Y$ (y)>0
Conditional Probability Density Function
Definition: The conditional probability density function of Y is
$f_Y$ (Y/X)=($f_XY$ (x,y))/($f_X$ (x) )
The conditional probability density function of X is
$f_x$ (X/Y)=($f_XY$ (x,y))/($f_Y$ (y) )
If X and Y are statistically independent, then
$f_x$ (X/Y)=($f_XY$ (x,y))/($f_Y$ (y) )=($f_X$ (x).$f_Y$ (y))/($f_Y$ (y) )=$f_X$ (x)
Similarly,
$f_Y$ (Y/X)=$f_Y$ (y)
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