## Kniffel: Würfelvergnügen per Mausklick

Du kannst alleine (1 Player) gegen den Computer (Play Button) oder gegen Freunde (2 Player) zu Hause auf dem Tablet oder dem PC spielen. Es gibt zwei. - Bis jetzt gibt es das erfolgreiche Kniffel Dice Clubs von b-interaktive nur für mobile Geräte und noch nicht für herkömmliche Computer. Doch mit. Sie können Kniffel allein, online mit einem anderen Spieler oder gegen den Computer spielen. Der Computer Robot wendet immer die beste Strategie an.## Kniffel Computer Spiele wie Kniffel Video

Der dritte Weltkrieg 🎮 Risiko - Tabletop SimulatorHow to play? Play Yahtzee Online for Free! Zasady gry. Spiegazione in italiano. BGA wiki. See the game in action. Videos 4.

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Players can make 35 points bonus if they score a total of 63 or more in upper section. Some combinations can be used to choose which category to use them for.

For ex. For more information on this game please refer to wikipedia. All Rights Reserved. On average 2. The distribution is as follows:.

There are slightly different strategies depending on whether a player is simply just trying to get a three-of-a-kind or if they are trying to maximize their average score.

Different strategies will also be required should a specific target be needed to achieve. The strategy to maximize the chance of getting a three-of-a-kind involves keeping any three-of-a-kind that is rolled.

If a three-of-a-kind is rolled then after the first throw the player should keep any other 5s and 6s, while after the second throw the player should keep any other 4s, 5s, and 6s.

An example is with the player keeps and throws the other 2. If a three-of-a-kind is not rolled the player should keep any pair that is rolled and re-roll the other dice, with two pairs the player should keep the higher pair, and with no pair the player should keep the highest die.

Following this strategy gives a This strategy does not maximize the average score since there are a few situations after the first throw where it is better to keep other combinations.

For instance, after throwing , keeping maximizes the chance of getting a three-of-a-kind a guaranteed score of 15 but keeping 66 maximizes the expected average score The situations where the strategy to maximize the average score differs are all after the first throw and are as follows: keep 33, 44, 55, 66 rather than or , , keep 4, 5 or 6 rather than 11, keep 5 or 6 rather than 22, keep rather than For example, with the player should keep 6 rather than 22 and with they should keep not If they follow the strategy to maximize the average score they will get a three-of-a-kind As with three-of-a-kind there are slightly different strategies depending on whether a player is simply trying to get a four-of-a-kind or they are trying to maximize their average score.

Different strategies will also be required should they need to achieve a specific target. The strategy to maximize their chance of getting a four-of-a-kind involves keeping any four-of-a-kind that they have.

If they have a four-of-a-kind then after the first throw they will keep the other if it is a 5 or 6, while after the second throw they will keep the die if it is a 4, 5 or 6.

So that with they keep and will throw the 3. If they do not have a four-of-a-kind, the player should keep any three-of-a-kind or pair that they have and re-roll the other dice.

With two pairs keep the higher pair. With no pair keep the highest die. Following this strategy provides a As with three-of-a-kind this strategy does not maximize the average score, since there are a few situations after the first throw where it is better to keep other combinations.

For instance, after throwing , keeping maximizes the chance of getting a four-of-a-kind but keeping 66 maximizes the expected average score 6.

The situations where the strategy to maximize the average score differs are all after the first throw and are as follows: keep 44, 55, 66 rather than , keep 4, 5, or 6 rather than 11, keep 6 rather than Following the strategy to maximize the average score one will get a four-of-a-kind A player will keep a Yahtzee or Full House.

A Yahtzee will score 25 under the Joker rule, even though it is not strictly a full house. Keep any four-of-a-kind, three-of-a-kind, or pairs that are thrown and re-roll the others.

With two pairs keep both. On average one will succeed The strategy is complicated by the fact that, because of the Joker rule, the player will score 30 if a Yahtzee is rolled.

Clearly one keeps any Small Straight or Yahtzee that is thrown. After the first throw keep a run of 3 or 3 out of 4 e.

Otherwise, keep a 3 or 4 or both and a 2 or 5 if one also has a 3 or 4 e. Do not keep just 2, 5, or The only difference after the second throw is that one keeps , , and , and will try to throw a Yahtzee unless the other die is a 3 or 4.

Again the strategy is complicated by the fact that, because of the Joker rule, one will score 40 if one gets a Yahtzee.

Clearly one will keep any Large Straight or Yahtzee that is thrown. The best strategy is also to keep a four-of-a-kind and try to throw a Yahtzee, even after the first throw.

The player should not keep a three-of-a-kind. Keep a small straight or 4 out of 5 e. Otherwise one should simply keep any 2, 3, 4 or 5 just one of each , so that with one would keep A player should keep any Yahtzee, four-of-a-kind, three-of-a-kind or pair that is thrown and re-roll the others.

On average one will succeed 4. To get the maximum average score the strategy is straightforward. After the first throw the player will keep any 5s and 6s.

After the second throw one will keep any 4s, 5s, and 6s. On average one will score Different strategies will be required when one needs to achieve a specific target.

The strategy for maximising the expected score has been determined. The "Optimal" strategy simply maximises the average score, not the chances of winning a game.

There are two main reasons for this. Firstly, the Optimal strategy takes no account of any opponents. In normal gameplay a player will adjust their strategy depending on the scores of the other player or players.

Secondly, the Optimal strategy tends to give undue importance to Yahtzee bonuses. It is rare for a player without a Yahtzee bonus to beat a player with one.

So, in normal gameplay, a player's strategy is not significantly influenced by the value given for a Yahtzee bonus. Consider the situation where the Yahtzee bonus was worth a million rather than a hundred.

It would not influence normal gameplay where the objective is to score more than the opponent. It would, however, affect the "Optimal" strategy since scoring a million would have a dramatic effect on the average score.

The "Optimal" strategy would be dominated by the prospect of a Yahtzee bonus. Even with a Yahtzee bonus worth the "Optimal" strategy tends to give too much importance to Yahtzee bonuses.

Despite these limitations the "Optimal" strategy does provide a useful guide as to the best strategy, especially in the early rounds.

The "Optimal" strategy for the first round is described in the next section. After the first round, the number of different games rapidly makes detailed analysis difficult but, in the early rounds, players generally simply adapt the first round strategy based on the boxes used.

For instance if a player throws in the first round they will keep 66 but if the 6s box was used in the first round and they throw in the second round they will naturally keep 55 instead.

The following table shows the average score obtained using the Optimal strategy and the proportion of the time that zero is scored in a particular category: [6].

It is possible to calculate the maximum average score with different rules. When the rules are changed so that there is no Upper Section bonus the average score drops from This compares with an average bonus score of

**Kniffel Computer**artificial intelligence, it uses the best strategy, so to win you need some Billiard Online Game and luck.

Billig ist zugefallen, ist leicht verlorengegangen.