Complete probability formula
A relationship enabling one to calculate the unconditional probability of an event via its conditional probabilities with respect to events forming a complete set of alternatives.
More precisely, let 
be a probability space, and let 
be events for which 
for 
, 
,
 |
and 
for all 
. Then one has the complete probability formula:
 |
The complete probability formula also holds when the number of events 
is infinite.
The complete probability formula holds for mathematical expectations. Let 
, 
, be a random variable on 
, let 
be its mathematical expectation and 
the conditional mathematical expectations with respect to events 
which form a complete set of alternatives. Then
 |
Comments
A complete set of alternatives is also called a partition of the sample space. A collection of events 
forms a partition if the events are disjoint, have positive probability and if their union is the sample space.
Complete probability formula. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Complete_probability_formula&oldid=46421