Head to Go Playing Explained. Guess Sorts
Head to Head gambling is a form of fixed odds betting, where you can wager on the result of a specific event (such as whether a certain card will be in the top or bottom row of a given deck of cards or the results of a football match) or on the probability of a specific event happening in the future (such as the probability of a given card being in the bottom row of a given deck of cards or the probability of a random person being born in a certain year).
Some bookmakers offer live sports events, such as boxing matches, as live betting markets.
Such markets, as the name suggests, offer the chance to bet on the outcome of the event, either before it has taken place or during it.
This is a form of fixed odds betting on individual events, which can be live or on television.
Some bookmakers also offer sports-based promotions, such as a bullseye bonus if the viewer predicts the results of several sporting events correctly during a TV programme, or a free bet if the viewer correctly predicts the results of certain sporting events over a period of time.
If a person plays the horses, then the bookmaker can offer a free bet if he/she correctly predicts the outcome of a race.
For example, if a person predicts the result of an event correctly, then the bookmaker can offer a free bet if the person predicts the result of an event incorrectly, and so on.
The bet can be for either the amount wagered, or how many places the player must finish in order to win the bet.
Thus, if the bookmaker offers a free bet of £5 if the player predicts a race to be run in one minute and two seconds, the bettor can place this bet and place a second bet of £5 if the race is run in five minutes and fifty-eight seconds, and so on.
This can help to avoid loss due to longer-than-expected times between the events, or because of an unrecorded mistake.
Probability can be viewed as the probability of an event occurring occurring given the amount of evidence that is known.
Probability is measured in probability “e” = “p”, where “p” is the probability that an event “E” will occur given the amount of evidence “K”.
The variance or dispersion is the proportion of times an event will occur with a given amount of evidence “K”, called the variance of the outcome of the event.
The value of “K” will depend on the event and the betting market.
In a two-person roulette game, the variance is defined as “σ” = 1 − “e”, with “σ” = 1 indicating that the probability of observing a single spin as black is 1.
Probability can also be defined as the probability of an event, which is often used as a measure of chance or the possibility of things occurring.
For example, if one buys a lottery ticket for £1 and wins £1000, then one may ask “how likely is it to win £1000 given that the probability of it winning is only 1 in 1000?”.
For lottery tickets this question is more relevant to probability, because the number of tickets sold is small, and the chance of winning a large number of tickets is very small.