The mathematical theory of casino games

There is talk that casino sells adrenaline. Sometimes there is talk that casino sells the fortune ticket. If we will speak the soft language of statistics, casino sells games: Spins and Bonuses. In this article I want to talk about the probability. The outcomes from lucky best cash games online are random by definition. The field of the mathematics that is used for counting of chances is called the theory of probability.

Most people are aware of this theory. During the coin throwing, the probability of heads falling is equal to ½ as we expect that the tails will fall in the half of the chances. The probability reflects the fact how often we expect the event and can be represented as the part of the opportunity where this event will occur for a long period of the time. In such cases, the probability of the event is the approximate proportion of the event’s outcome to the common amount of the tests during the repeated duplication of the random experiment.

The standard deck of 52 cards includes 4 Aces. During the random choose of the card from the deck, the probability of Ace falling is equal 1/13. One can say that the chance of the random choice is equal to 7, 7%. The probability that the card will be of diamonds is equal 13/52. On the roulette wheel you can see 18 red, 18 black and 1 green number – altogether 37. The probability of any number falling is equal to 1/37, the probability of red number falling is 18/37. Many basic experiments can be analyzed with the use of the basic rules. The knowledge of these rules provides the comprehension of the casino games mathematics.

Rule Number 1

The probability of the event cannot be less 0 or more than 1

The probability of the event values the opportunity the fact that will occur. If the event has the probability that is equal to 0, it means that the event is impossible. If the event has the probability that is equal to 1, the event is possible.

Rule Number 2

The probability of the event plus the probability of the event absence is equal to 1
The opposition of the event is his addition. The addition of the heads is tails, the addition of even is uneven, the addition of the spades are not spades.

Rule Number 3

For alternative events the probability of appearance is equal to the sum of the events probabilities

The rule of the combining probabilities has two variants: one for the alternative events and one for not alternative events. The alternative events are events where one is going to exclude other.