Content deleted Content added
→Introduction: Micro improvement - it could have other representations (ex: other languages) |
|||
Line 11:
==Introduction==
A probability distribution is a mathematical description of the probabilities of events, subsets of the [[sample space]]. The sample space, often represented in notation by <math>\ \Omega\ ,</math> is the [[Set (mathematics)|set]] of all possible [[outcome (probability)|outcomes]] of a random phenomenon being observed; it may be any set:
To define probability distributions for the specific case of [[random variables]] (so the sample space can be seen as a numeric set), it is common to distinguish between '''discrete''' and '''absolutely continuous''' [[random variable]]s. In the discrete case, it is sufficient to specify a [[probability mass function]] <math>\ p\ </math> assigning a probability to each possible outcome: for example, when throwing a fair [[dice]], each of the six digits {{math|“1”}} to {{math|“6”}}, corresponding to the number of dots on the die, has the probability <math>\ \tfrac{1}{6} ~.</math> The probability of an [[Event (probability theory)|event]] is then defined to be the sum of the probabilities of all outcomes that satisfy the event; for example, the probability of the event "the die rolls an even value" is
| |||