Lottery castle

Profit C-Due-Sheet (3 & 4) Digit – (The Boxer)


Anatomy of Due-Sheet


(3-Digit): The Due-Sheet (D-S) is composed of (112) Boxed-Combinations (B-C) and (40) Post-Positions, (P-P) represented by (8) Columns (C) and (5) Rows (R) divided into (2) sections (S), (A) and (B), also represented is Leading Digits (L-D) system and including the system of Front-Pair (F-P) – Back-Pair (B-P) – Split-Pair (S-P).

  1. (6-Way): All three digits are different – Example (1 2 3)
  1. Section (A): (40) (B-C)
  2. Section (B): (34) (B-C)
  1. (3-Way): Two of the (3) digits are the same – Double (DO) – Example (1 3 3)
  1. Section (A): (38) (B-C)
  1. (L-D): Composed of first (5) leading-digits in each of (3) columns – Example:
C-1 C-2 C-3
8 4 7
3 8 5
0 1 0
1 9 2
7 3 1

Important to remember: The leading digits reflects the actual record of drawn digits per column from beginning of (3) digit drawings to present. (All-Draws)

The (D-S) only records actual combinations drawn, listed on the sheet.

  1. (Pair-System): Two digits of (3) digit combinations is a (Pair)
(F-P): 1 2 3
(B-P): 1 2 3
(S-P): 1 2 3

The selected combinations on the sheet are the same each month, only their position changes; when a combination in any (C) is drawn, the following month the drawn combination is listed at bottom of column and combinations previously listed below drawn combination, move up (1) position. The listed combinations remains in the same position for the month, position changes are made on the first day of each month.
That is why the sheet is named (D-S), the combinations at the top is due more than combinations at the bottom.
The selected combinations are from the Add-Up (A-U) system, in each of the (8) (C), all combinations have the same (A-U) pertaining to the same (C). – Example:
(C): C-1 C-2 C-3 C-4 C-5 C-6 C-7 C-8
(A-U): 10 11 12 13 14 15 16 17
(Com): 127 056 345 256 248 078 457 179

Anatomy of Due-Sheet



(4-Digit): The Due-Sheet (D-S) is composed of (353) Boxed-Combinations (B-C) and (81) Post-Positions, (P-P) represented by (9) Columns (C) and (9) Rows (R) divided by (3) Sections (S), (A)-(B)-(C) and (3) parts, also represented is Leading Digits (L-D) system, including the system of Front-Pair (F-P) – Middle-Pair (M-P) Back-Pair-(B-P) – Split-Pair (S-P).
  1. (24-Way): All four digits are different – Example (1 2 3 4)
  1. Section (A): (81) (B-C)
  2. Section (B): (55) (B-C)
  1. (12-Way): Two of the (4) digits are the same-Double (DO)-Example (1 2 2 3)
  1. Section (A): (81) (B-C)
  2. Section (B): (75) (B-C)
  3. Section (C): (12) (B-C)
  1. (6 & 4-Way): (1) Section – (49) (B-C)
  1. (6-Way): (DO-DO)-Example (1 1 2 2) - (21) (B-C)
  2. (4-Way): (Triple)-Example (1 2 2 2) - (28) (B-C)
  1. (L-D): Composed of first (5) leading-digits in each of (4) columns – Example:
C-1 C-2 C-3 C-4
8 4 7 3
3 8 5 8
0 1 0 9
1 9 2 2
7 3 1 5

Important to remember: The leading digits reflects the actual record of drawn digits per column from beginning of (4) digit drawings to present. (All-Draws)
The (D-S) only records actual combinations drawn, listed on the sheet.
  1. (Pair-System): Two digits of (4) digit combinations is a (Pair)

(F-P): 1 2 3 4
(M-P): 1 2 3 4
(B-P): 1 2 3 4
(S-P): 1 2 3 4

The selected combinations on the sheet are the same each month, only their position changes; when a combination in any (C) is drawn, the following month the drawn combination is listed at bottom of column and combinations previously listed below drawn combination, move up (1) position. The listed combinations remains in the same position for the month, position changes are made on the first day of each month.
That is why the sheet is named (D-S), the combinations at the top is due more than combinations at the bottom.

The selected combinations are from the Add-Up (A-U) system, in each of the (9) (C), all combinations have the same (A-U) pertaining to the same (C). – Example:
(C): C-1 C-2 C-3 C-4 C-5 C-6 C-7 C-8 C-9
(A-U): 14 15 16 17 18 19 20 21 22
(Com): 1247 0456 2356 1457 2358 0289 0578 1578 3568

How to use (D-S) to Advantage



Lottery games are mathematical challenges and require mathematical resolve to access advantage. Lottery games are structured based on odds to favor operators; those odds can be altered/changed to favor players of the games and that is the way Profit C Due-Sheet is structured.

Serious minds that are willing to apply time and Mind-Energy (M-E) can learn how to access advantage and experience a new way of life relative to economics.

The advantage of (3 & 4) digit Due-Sheet is related to approach and understanding. When someone presents a gambling proposition, with rules and restrictions the odds usually are in favor of the presenter. Understanding the proposition is a mind produced challenge, applying universal knowledge enables one to develop a mathematical advantage to the challenge.

The base of mathematics is (10) digits, (0-1-2-3-4-5-6-7-8-9), two digits or more become numbers. Each digit requires space and is located in a position, the position is identified by mathematics and therefore it is an advantage to focus attention to position mathematics as oppose to the digit or number system proposed by operators.

The (3-Digit) system is comprised of (3) columns and (10) digits per columns, equaling (1,000) straight combinations, reflecting (1,000) selections, certifying an odds structure of (999 to 1) favoring operator, meaning player has to select a winning combination of (1 out of 1,000) selections.

Player’s advantage is in Group-Selection (G-S) which reduces odds in selection process. The (D-S) is a (G-S) system applied to (P-P) selections.

The (3-Digit) system on the (D-S) consists of (8) (C) and (5) (R), when selecting a (C & R) for (S-A), there is (1) (B-C), Example: (C-3 & R-5) reveals (1) (B-C), applying both (S-A & S-B), there is (2) (B-C). Selection may include (DO) section if desired, which adds up to (3) (B-C) using the same selection formula of (C-3 amp; R-5).

Selecting by (C) alone or (R) alone is viable, selecting by (C) in (S-A) reveals (5) (B-C) or selecting (S-A & S-B) reveals (8-9 or 10) (B-C) depending on (C) selected. Adding (DO) section for (C) is an additional (4 or 5) (B-C) depending on (C) selected. Individual selections of (S-A, S-B or DO) is viable.
Selecting by (R) in (S-A) reveals (8) (B-C) or selecting (S-A & S-B) reveals either (12-14 or 16) (B-C) depending on (R) selected. Each (R) does not have the same number of (B-C).

The (4-Digit) system on the (D-S) consists of (9) (C) and (9) (R), when selecting a (C & R) for (S-A) in (24-Way) game, there is (1) (B-C), Example: (C-4 & R-6) reveals (1) (B-C), applying both (S-A & S-B), there is (2) (B-C). Selection may include applying (12-Way) (S-A, S-B or S-C), if desired, which adds (3) more (B-C) using the same selection formula of (C-4 & R-6). The (6 & 4-Way) can be included, adding (1) more (B-C). Selecting (1) section or including a few or all sections or groups, is viable.

Selecting by (C) alone or (R) alone is viable, selecting by (C) in (24-Way) (S-A) reveals (9) (B-C) or selecting (S-A & S-B) reveals (13-14-15-16-17 or 18) (B-C) depending on (C) selected. Adding (12-Way) and (6 & 4-Way) include the number of (B-C) for selected (C). Individual selections of (S-A, S-B, S-C) is viable.

Selecting by (R) in (24-Way) (S-A) reveals (9) (B-C) or selecting (S-A & S-B) reveals either (10-14-16 or 18) (B-C) depending on (R) selected. Adding (12-Way) and (6 & 4-Way) include the number of (B-C) for selected (R). Individual selections of (S-A, S-B, C) is viable. Each (R) does not have the same number of (B-C).

Leading Digits

Leading Digits (L-D) system works the same for the (3 & 4) digit games, listing the first five leading digits in each column, information to be used suggestively, for combinations drawn straight.
Example: The (3-4-digit) game (7 4 9) and (3 1 5 4) combinations are drawn and listed:

C-1 C-2 C-3   C-1 C-2 C-3 C-4
7 4 9   3 1 5 4
 
3-Digit 4-Digit
C-1 C-2 C-3   C-1 C-2 C-3 C-4
1. 0 8 7   1 3 8 9
2. 8 5 3   3 7 1 4
3. 1 4 9   8 2 5 6
4. 3 1 6   5 4 7 8
5. 7 2 4   6 1 3 2


(3 & 4) Digit – F-P – B-P – S-P    F-P – M-P – B-P – S-P

3-Digit 4-Digit
F-P B-P S-P   F-P M-P B-P S-P
1. 07x x02 0x9   06xx x09x xx04 0xx7
2. 19x x14 1x0   18xx x11x xx19 1xx3
3. 21x x27 2x3   22xx x29x xx26 2xx5
4. 34x x38 3x6   31xx x30x xx33 3xx8
5. 40x x41 4x1   44xx x42x xx40 4xx3
6. 56x x50 5x2   53xx x59x xx51 5xx0
7. 67x x62 6x8   66xx x61x xx67 6xx1
8. 74x x79 7x5   71xx x73x xx79 7xx6
9. 88x x84 8x7   80xx x88x xx82 8xx5
8. 74x x79 7x5   71xx x73x xx79 7xx6
10. 96x x92 9x4   99xx x99x xx98 9xx4



(3-Digit): There are (100) pairs each, per (F-P – B-P – S-P)
(4-Digit): There are (100) pairs each, per (F-P – M-P – B-P – S-P)

The (D-S) reveals pairs listed in the number (1) (P-P) of daily drawings charts.
The (D-S) does not list the daily drawings, (D-S) only registers drawn combinations listed on the (D-S).

(3-Digit) Example:
If combination (3 4 8) is drawn, check (34X) in (F-P)
If combination (5 5 0) is drawn, check (X50) in (B-P)
If combination (7 1 5) is drawn, check (7X5) in (S-P)

(4-Digit) Example:
If combination (8 0 2 7) is drawn, check (80XX) in (F-P)
If combination (0 9 0 5) is drawn, check (X90X) in (M-P)
If combination (4 3 2 6) is drawn, check (XX26) in (B-P)
If combination (1 8 9 3) is drawn, check (1XX3) in (S-P)
If combination (3 1 4 8) is drawn, check (31XX) & (3XX8) in (F-P & S-P)





SUMMARY


(The Boxer) (D-S) is structured as a position system for player’s advantage of reducing the selection process. Focusing on positions of column and row is an advantage.

(3-Digit): Has (8) columns and (5) rows for a total of (40) selections, selecting a column and a row reveals (1) box combination. Each section of the (6-Way) (A - B) and (3-Way) has the same form of numbers in structure, (8) columns and (5) rows, revealing (1) box combination in each section, except when there is no combination. The choice can be (1) section, (2) sections of (6-Way) or/and include (3-Way).

(4-Digit): Has (9) columns and (9) rows for a total of (81) selections, selecting a column and a row reveals (1) box combination. Each section of the (24-Way) (A & B), the (12-Way) (A-B-C) and (6-4-Way) has the same form of numbers in structure, except for section (C) in the (12-Way) system, which only has (4) rows. When applying column and row selection, only (1) box combination is revealed from each section of systems.





Regular (3-Digit) Structure

(3) Columns
(10-Digits) per Column (0-1-2-3-4-5-6-7-8-9)
(1,000) Combinations (6-Way & 3-Way)
(720) (6-Way) Combinations – All (3-Digits) are different (1 2 3)
(270) (3-Way) Combinations – Two of the digits are the same (1 2 2)
(10-Triples) – All (3-Digits) are the same (3 3 3)
(210) Boxed Combinations (6-Way - 3-Way)
(120) (6-Way) Boxed Combinations
(90) (3-Way) Boxed Combinations

Regular (4-Digit) Structure
(4) Columns
(10-Digits) per Column (0-1-2-3-4-5-6-7-8-9)
(10,000) Combinations
  1. (24-Way) – All (4-Digits) are different (1 2 3 4)
  2. (12-Way) – Two of the digits are the same ( 1 1 2 3)
  3. (6-4-Way) – (6-Way) (DO-DO) (2 2 3 3) – (4-Way) – Triple (2 3 3 3)

(705) Boxed Combinations (24-Way - 12-Way - 6-4-Way)
(10) (Quads) – All (4-Digits) are the same (2 2 2 2)