Expected gain
The expected gain (or expected return) is the weighted-average most likely outcome in gambling, probability theory, economics or finance.
[edit] Discrete scenarios
In gambling and probability theory, there is usually a discrete set of possible outcomes. In this case, expected gain is a measure of the relative balance of win or loss weighted by their chances of occurring.
For example, if a fair die is thrown and numbers 1 and 2 win $1, but 3-6 lose $0.5, then the expected gain per throw is
- $1 × 1/3 − $0.5 × 2/3 = $0
the game is thus fair.
[edit] Continuous scenarios
In economics and finance, it is more likely that the set of possible outcomes is continuous (a numerical or currency value between 0 and infinity). In this case, simplifying assumptions are made about the distribution of possible outcomes. Either a continuous probability function is constructed, or a discrete probability distribution is assumed.
[edit] See also
 |
This economics or finance-related article is a stub. You can help Wikipedia by expanding it. |
 |
This probability-related article is a stub. You can help Wikipedia by expanding it. |
