Plinko is a game in which winning depends largely on the chance of hitting the right coefficient. Experienced gamblers apply various well-known and widely used mathematical strategies for successful bets in the Plinko casino. Among them are:

These principles are designed to increase the chances of success in the Plinko game, but do not guarantee a win. Note that each mathematical system has its own characteristics. It is necessary to study them carefully, evaluate them according to your preferences, experience and available bankroll, and only then use them in the Plinko game.

## Parlay strategy for Plinko

Parlay was originally used for sports betting. Gamblers have adopted this mathematical principle by dragging it to arcade casino games, and Plinko is no exception. A special feature of Parlay is that gamers raise their bet only when they win, and in case of an unsuccessful game round they go back to the original amount of bet. Parlay in Plinko is carried out as follows.

- Make a minimum deposit of 10 euro.
- If you won in the Plinko round (with coefficient not less than 1.8), add your winnings to the current bet. For example, if you started with 10 euro, and won 5 euro, the new bet is 15 euro. You continue to repeat this process after each successful game round.
- If you lose, you go back to the bet deposited on the 1st round of the Plinko game.

Parlay assumes playing with the minimum bets in the casino: large investments can lead to a loss of the bankroll. Before you start playing the Plinko game according to Parlay strategy, determine the minimum deposit (for example, from 1 to 10 euro) and the target result that you want to achieve (for example, earn 100 euro). Also add a Plinko promo code if you have one.

This system in the Plinko game is effective and promising for beginners and experienced players. It allows you to save your bankroll as much as possible, because after losing the bet is reduced to the minimum. Large amounts of investment in bets when using this Plinko strategy are excluded. Follow the pre-established rules in the game to achieve the desired result and avoid bet losses.

## The Pyramid Principle in Plinko

Pyramid in the game Plinko is effective, but requires a significant bankroll. It is based on gradually increasing bets with each round. Here are the basic rules and an example of how to use this system in Plinko.

- Determine the minimum and maximum bets in Plinko. Start the game with the minimum value.
- Gradually increase the sum by the same amount until you reach the maximum limit. For example, if your minimum is 1 euro, and your maximum is 10 euro, then each time increase the amount by 1 euro, until you reach 10 euro.
- After reaching your maximum limit, start decreasing bets in reverse order. Smoothly decreasing by the same amount until you get back to the starting amount.
- Success coefficients will be all above 1.8.

Remember that the principle of the pyramid is not a guarantee of permanent winnings in the casino, as the result of each round in the game Plinko depends on chance and coefficients. Moreover, each mathematical system has its own characteristics and the results may vary depending on a particular situation. Before using the pyramid in Plinko read the rules and practice on the demo version of the game. Note that gambling can be associated with the risk of losing money, so it is important to play responsibly and set limits for your bets.

## Labouchère system

Henry Labouchère is a literary and political figure from England with French roots. He was fascinated by horse racing betting from a young age. As a student he devoted much time to exploring the world of casino games. His passion for gambling led him to recognize the need to develop a unique strategy that would help him win while minimizing the risks.

Using the Labouchère system in Plinko is easy because it is based on a mathematical progression.

- Create a sequence of bets on the principle of the sum of two numbers (the first and the last). This sum ultimately determines the amount of investment for each round in the game Plinko.
- After each Plinko round, analyze the results and make changes to the sequence. In case you win, the first and last numbers are removed, and if you lose the sum of the two previous numbers is added to the end of the sequence.

There are two types of system:

- classic;
- reversible.

Which is the best principle to use in the Plinko game? Let’s look at some examples.

### Classic Labouchère Strategy

When using the Labouchère mathematical algorithm in Plinko, start by determining the desired amount of winnings. Choose a sum of 10% to 15% of the bankroll. Divide this amount into any number of parts without strict rules for division.

It does not matter which provider and in which casino to play the Plinko game. The round will be considered winning if the ball hits a cell with coefficient of at least 1.8-2. For this method to work, try Plinko from BGaming with the following configurations: high risk and maximum number of pins. If it is Spribe’s Plinko, choose the maximum number of rows and a red ball.

The amount of the first roll is determined by the sum of the first and the last number in a sequence of already divided parts. It is not necessary for the parts to be equal in size. The main thing is that their sum gives the desired winnings. In case you win, you cross out both numbers and take the next two outermost numbers. In case you lose, their sum is added to the end of the list. Continue playing the Plinko game until all the numbers are crossed out of the list.

**Step-by-step example**

- Determine the number of desired net profit — 200 euro.
- Divide it into 5 parts of 40 euro: 40, 40, 40, 40, 40.
- Summing up the first and last numbers, the sum defines the size of the bet — 80 euro.
- Throw the ball in Plinko.

To complete the mathematical system, you need to cross out all the numbers from the row. Remember that if the coefficients in Plinko are less than 1.8, the round is considered lost.

Sequenceof numbers | Amount of bet in euro | Result | Net profit in euro |

40, 40, 40, 40, 40 | 80 | lose | -80 |

40, 40, 40, 40, 40, 80 | 120 | lose | -200 |

40, 40, 40, 40, 40, 120 | 160 | win | -40 |

40, 40, 40, 40, 80 | 120 | win | +80 |

40, 40, 40 | 80 | win | +160 |

40 | 40 | win | +200 |

### Labouchère’s reverse strategy

Do exactly the opposite in the game Plinko in the live casino.

- Determine the amount that you can afford to lose — 500 euro.
- Define the maximum deposit — 500 euro.
- Divide an amount into parts, so that as a result the sum of a row was equal to the desired winning: 100, 100, 100, 100, 100.
- Add up the first and the last number of this row (the sum determines the bet size) — 200 euro.
- Throw the ball in Plinko.

In case you lose, cross out both numbers (first and last) and take the next two outermost numbers. In case you win, their amount is added to the end of the list. Continue until you reach the maximum deposit limit. Remember: the round is considered lost when the ball hits a cell with a coefficient less than 1.8.

Sequenceof numbers | Amount of bet in euro | Result | Net profit in euro |

100, 100, 100, 100, 100 | 200 | lose | -200 |

100, 100, 100 | 200 | win | 0 |

100, 100, 100, 200 | 300 | win | +300 |

100, 100, 100, 200, 300 | 400 | win | +700 |

100, 100, 100, 200, 300, 400 | 500 | win | +1200 |

### Conclusions

Playing using this mathematical system in Plinko is best at a high level of risk and the maximum number of paylines, because in this case the coefficients of the cells are high. You can try:

- a classic strategy if you seek to maximize your potential winnings;
- a reversible, if you prefer to control your losses and strive for stable winnings.

Both tactics are good for Plinko. The choice between them depends on your individual playing style, the possibility of increasing your stakes and your goal in the game. This method is not a guarantee of success in online casinos, but only a strategy, as everything depends on a coefficient of the cell. Be realistic in your expectations, as playing for luck always involves some degree of risk.

## D’Alembert’s Strategy

This mathematical approach is named after the French scientist Jean Leron D’Alembert, known for his work in philosophy and physics. Based on the principles of equilibrium, it assumes that with each loss the probability of winning the next round increases. In accordance with the theory of probability, the gambler is advised to gradually increase the bet size when he loses and decrease it when he wins.

Using the D’Alembert’s system in Plinko, follow these steps:

- determine the amounts of the starting round;
- decrease bets by one if you win;
- increase the bet by the amount of the starting sum when losing.

The player increases the size of the bet until he reaches a profit in Plinko. When this happens, the cycle can be completed, as the coefficient of the next round should be equal to or greater than 2.

Note that the effectiveness of the D’Alembert mathematical strategy may depend on the particular game Plinko and the casino, as operators offer deposit limits, and other factors.

### D’Alembert Betting Rules

Applying D’Alamber’s mathematical strategy in Plinko involves following certain rules.

- The game is successful only when the ball hits a cell with a coefficient of at least 2.
- To start it is necessary to use 1-2 % of the total amount of your gambling bankroll. Of course, you can also use 5%, but only if you are willing to take the risk.

This system has different variations. Let’s look at how you can apply them in the Plinko game in the online casino.

### Putting the strategy into practice

In order to apply the D’Alembert strategy, you will need to choose an initial round amount. We recommend choosing a starting round size of about 1% of your bankroll. Example: if your bankroll is 1000 euro, the starting roll will be 10 euro (1% of 1000 euro).

Then, according to D’Alembert mathematical principles, increase the amount by the sum of your starting bet when you lose and decrease it by one unit when you win. Example: if you lose in the first round of 10 euro, the next bet will be 20 euro. If you win, the amount of the next throw is reduced by 10 euro.

Continue, thus increasing or decreasing the amount according to the result of the previous game. Be cautious and manage your bankroll wisely to avoid losing a large amount of money.

### Pros and cons of the system

The advantage of the principle in question is that it has a low level of risk compared to Martingale. If the player does not have a long black streak in the game Plinko this strategy can bring significant profits. Some disadvantages of this system should be considered too:

- Replenishment of the bank is gradual.
- The need for significant start-up capital.
- Perseverance and patience are required.
- High odds for success.

Like other playing techniques, the concept has its positives and negatives. It is important to analyze and evaluate them before applying them to Plinko in order to achieve the desired results.

### Counter-D’Alembert strategy

Gamblers also use the counter-D’Alembert system in Plinko, as the probability of hitting coefficients above 2 falls once every 10-15 rounds. When losing, decrease the bet by the same unit, and after winning increase it. If suddenly the Plinko ball of the first round hits a cell with the coefficient of 1 or 0.5, the betting amount remains unchanged. In practice in online casinos it looks as follows.

- Starting round is 10 euro.
- Winning. Decide to increase the amount by 2 units (10 + 2 = 12 euro).
- Winning. Betting on another 2 units more (12 + 2 = 14 euro).
- Losing. Reduce the amount of the round by 2 units (14 – 2 = 12 euro).

### Conclusion

Do these mathematical D’Alembert strategies work in Plinko’s game? Analysis of practical aspects has shown that if the size of the first bet is 1% of your bankroll, then in order to lose all your money, you need to make 13 consecutive rounds with coefficients less than 2. And since the RTP in Plinko is high in any casino, the payoff, respectively, also. But remember that D’Alembert strategies, like any other principles, do not guarantee a constant profit in gambling and may have its own risks.