WinRoulette Pro - Advanced Analysis and European Roulette Simulations
WinRoulette Pro is an advanced roulette spin analysis software designed for the systematic study of European roulette (single zero). It functions as a roulette spin tracker and a roulette spin statistics platform, providing detailed data on number sequences and supporting scientific game analysis.
Wheel Analysis and Strangle Method
WinRoulette Pro considers the actual position of numbers on the wheel, not just on the betting layout. The wheel is divided into six homogeneous sectors (sestinas), each containing six evenly distributed numbers.
From these sestinas derive fifteen specific combinations, forming the basis of the Strangle method. The generation logic is confidential to protect the system.
Operating Principle
- When four numbers have appeared in a sestina, the remaining two are identified as the most probable.
- The numbers are considered "encircled" by the other numbers in the sector - principle of the Strangle.
- The analysis is based solely on position on the wheel, not the betting layout.
Advanced Features
| Function | Description |
|---|---|
| Spin Recording | Real-time monitoring of every spin (roulette spin tracker) |
| Statistical Analysis | Calculation of frequencies, delays, distributions, and number patterns (roulette spin statistics) |
| Strangle Suggestions | Identification of numbers with the highest probability of appearing (roulette spin analysis software) |
WinRoulette Pro - The "strangle" algorithm in action
This section describes in detail the operating mechanism underlying the software, namely the strangle method.
The strangle method is an algorithm designed and developed by the software's own developers.
The first operation is to determine, using the WinRoulette software parameters, the method we intend to apply to the table.
In our first example, we deemed it appropriate to play in this way:
- Use of only one card.
- Win at least 10 pieces per game.
- Lose at the threshold of 36 pieces.
- Play the duplicates (doubles).
We proceed to play a game with pen and paper using, for example, the Lindau 1976 permanences.
We will need to copy the 15 cards onto a sheet of squared paper filled out in a way that facilitates the transcription of the games played. An example of a notepad sheet is the one we used for the explanation of the game with manual data recording. The outcome of the permanence must be transcribed and colored in the cards in question. The appearance of zero will be transcribed regularly. If 0 comes out twice, we will bet on it, at the appropriate time, like any other number.
It is obvious that the eventual appearance of a previously drawn number will be transcribed but will not be reported on the card because it would already be colored; this number will instead be transcribed in the "duplicates" column (numbers that come out more than once must be bet on). The card contains the 36 numbers in rows and columns of 6 numbers each, excluding 0. Their arrangement has been appropriately studied to obtain cards that are as diversified as possible.
The cards should be considered like those used in Bingo (Tombola).
When the possibility of making a "cinquina" (five in a row) occurs horizontally, vertically, or on the two main diagonals, we will bet on the two numbers that can complete the "cinquina" (together or not with those that came out more than once: remember that this is an option you can include or exclude).
It is possible that the numbers to be played come from more than one card. We will initially bet 1 piece on the numbers that can make us achieve a "cinquina" (it will be appropriate to highlight them with a color or in any other way), and then continue with a progression based on the values we previously established.
Only one card was used for our example, which is:
| 2 | 34 | 10 | 21 | 13 | 28 |
| 6 | 9 | 19 | 5 | 36 | 32 |
| 27 | 35 | 23 | 26 | 14 | 11 |
| 20 | 31 | 25 | 16 | 7 | 3 |
| 12 | 4 | 17 | 1 | 15 | 24 |
| 22 | 33 | 8 | 30 | 18 | 29 |
We repeat that below we have an example of a sheet that we could use for manual bets performed at the green table.
Remember that, for the cards used by the player in manual mode, the numbers must be reported as transcribed in the WinRoulette program.
The game reported is exactly the one described in the program's setup example.
The Game in Manual Mode.
The first number drawn is 8 and we transcribe it. Color 8 on the card.
The second number drawn is 20: we transcribe it and color it.
The third number drawn is 6 and we transcribe it, also coloring 6.
The fourth number drawn is 6 again: we transcribe it but we cannot color it on the card because we already did so previously; instead, we transcribe it under the "duplicates" column ready to be bet on when the time comes.
The fifth number drawn is 34; we transcribe it and color it.
The sixth number drawn is 9, the seventh drawn is 11, the eighth drawn is 12; we will proceed to transcribe and color these three numbers in the same way as the previous ones.
The ninth number is 2: we transcribe it and color the drawn numbers; this time, as can be observed in the first column, we could achieve a "cinquina" with the draw of 22 and 27. We will put 1 piece on these two numbers and also on 6 because it came out twice and we previously established to play numbers drawn more than once. Transcribe the bet. Numbers to bet on: 22, 27, 6.
The tenth number drawn is 1: we transcribe it and color it. We lose the three pieces bet and re-bet 1 piece on the three numbers, transcribing everything.
The eleventh drawn is 0: we only transcribe it. We note the loss of the 3 pieces and re-bet 3 pieces again on 22, 27, 6.
The twelfth drawn is 2: we transcribe it among the duplicates and add it to the numbers to bet on. We transcribe the loss of the three pieces under the "total pieces bet" column and put 1 piece again on numbers 22, 27, 6, 2. As can be seen, the eventual draw of one of the four numbers would lead us to a win of 23 pieces.
The thirteenth number drawn is 22: the game is won with a profit of 23 pieces.
The summary on the sheet.
| drawn | to bet |
dupl. | pcs bet |
tot. pcs bet |
won | balance | |
| 1 | 8 | ||||||
| 2 | 20 | ||||||
| 3 | 6 | ||||||
| 4 | 6 | 6 | |||||
| 5 | 34 | ||||||
| 6 | 9 | ||||||
| 7 | 11 | ||||||
| 8 | 12 | ||||||
| 9 | 2 | ||||||
| 10 | 1 | 22, 27, 6 | 3 | 3 | |||
| 11 | 0 | 22, 27, 6 | 3 | 6 | |||
| 12 | 2 | 22, 27, 6 | 2 | 3 | 9 | ||
| 13 | 22 | 22, 27, 6, 2 | 4 | 13 | 36 | 23 |
In the example, only one card was used.
We were playing with the intention of stopping the game if the bets exceeded the threshold of 36.
We were playing with the intention of winning a minimum of 10 pieces.
In the example presented, we won more than the 10 pieces expected.
Historical Datasets and Comparative Analysis
- Analysis of up to 10,000 simulated spins
- Number distribution by wheel sector
- Frequencies for red/black, odd/even, dozens, and columns
These datasets allow for complete statistical analysis and testing of the Strangle method under realistic conditions.
User Benefits
- Scientific study of roulette outcomes
- Identification of numbers with higher probability
- Decision support based on concrete data
- Access to advanced statistics and interpretative charts
Why WinRoulette Pro is Unique
WinRoulette Pro integrates roulette spin tracker, roulette spin statistics, and roulette spin analysis software into a single advanced tool. Its rigorous, quantitative approach, based on the position of numbers on the wheel, makes it ideal for scientific analysis of European roulette outcomes.
FAQ - Frequently Asked Questions
What is the Strangle method?
It is a proprietary algorithm based on the distribution of numbers within the wheel's sestinas. It identifies the numbers with the highest statistical probability when 4 of the 6 numbers in a sector have already appeared.
Does WinRoulette Pro work on all types of roulette?
The software is optimized for European roulette (single zero). Some features can be adapted for other variants.
How are recommended numbers calculated?
The system uses the positions of numbers on the wheel, spin sequences, and sestina combinations according to the Strangle method.