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Generating strings/Baseline for any lottery matrixPrev TopicNext Topic
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The use of the word 'generate' is not free from restraint, is guided /influence by matrix and regulations of the game. For start, lets delve into the matrix and regulations, the matrix is 3/10 with digit replacement. What's your take on this statement 'the matrix is 3/10 with digit replacement'. Lets go further with regulation that states that 'each event/draw(set) starts with fixed combination', 100 sets for P2, what's your take on this statement 'each event/draw(set) starts with fixed combination'?.
Lets picture the draw process mechanically, you have two machines, each with 10 balls spinning, do you think the two digits 3 and 3 are related for outcome event 33? Lets just use one machine and apply the rule of 'digit replacement, meaning, when the first digit is drawn, it goes back to the machine (10 balls is constant) for the next. What is the inference here? The draws/event/ spinning is very very independent, preceding event has no bearing whatsoever on subsequent event ! . Are the digits related? obviously not, the digits are reference points for transitions within a generated string/pattern/base, you may assume the digit 3 and 3 been identical are the same forgetting the TIME factor !.
So how do you generate strings based on the matrix and game regulation:
- Find a good Random generator (Random.org is perfect)
- Your low and limit parameters, P 2 ( low 0, Limit 9)
- set max combo for game matrix 2/10 is 100
Points 2 and 3 is your assumption for ensuing structure of string/pattern/base, so lets start with P2.
A. Points 1,2,3 will give different shapes/structure of digit transitions, so run the generator 2 times (two different machines or digit with replacement is the rule.
B. Observe the first two digits of each string
C. Take the current draw digits , observe how they fit into each string.
I want you to step back and forget the draw digit history, I want you to focus only on digits!
For matrix like 5/39, set up is low 1, limit 39 and matrix combo 575757(is draw without replacement)
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Quote: Originally posted by adobea78 on Mar 3, 2018
The use of the word 'generate' is not free from restraint, is guided /influence by matrix and regulations of the game. For start, lets delve into the matrix and regulations, the matrix is 3/10 with digit replacement. What's your take on this statement 'the matrix is 3/10 with digit replacement'. Lets go further with regulation that states that 'each event/draw(set) starts with fixed combination', 100 sets for P2, what's your take on this statement 'each event/draw(set) starts with fixed combination'?.
Lets picture the draw process mechanically, you have two machines, each with 10 balls spinning, do you think the two digits 3 and 3 are related for outcome event 33? Lets just use one machine and apply the rule of 'digit replacement, meaning, when the first digit is drawn, it goes back to the machine (10 balls is constant) for the next. What is the inference here? The draws/event/ spinning is very very independent, preceding event has no bearing whatsoever on subsequent event ! . Are the digits related? obviously not, the digits are reference points for transitions within a generated string/pattern/base, you may assume the digit 3 and 3 been identical are the same forgetting the TIME factor !.
So how do you generate strings based on the matrix and game regulation:
- Find a good Random generator (Random.org is perfect)
- Your low and limit parameters, P 2 ( low 0, Limit 9)
- set max combo for game matrix 2/10 is 100
Points 2 and 3 is your assumption for ensuing structure of string/pattern/base, so lets start with P2.
A. Points 1,2,3 will give different shapes/structure of digit transitions, so run the generator 2 times (two different machines or digit with replacement is the rule.
B. Observe the first two digits of each string
C. Take the current draw digits , observe how they fit into each string.
I want you to step back and forget the draw digit history, I want you to focus only on digits!
For matrix like 5/39, set up is low 1, limit 39 and matrix combo 575757(is draw without replacement)
Lets use the 3 pointers and the statement ' each event is unique and starts with fixed combo ratio x/n'.
P2>
Parameters for random generator set up: Low 0, limit 9, combo ratio 2/10 (100)
Process: Assume two hoppers or one with digit replacement, so generate two sets at time.
Digit transition: The process gives you the assumed 'structure/shape' of the 10 digit string, so take any current draw digits to filter/adjust the structure(digit positions does not change much).
FL-2 day
ate Results Sun, Mar 4, 2018 8-8?Prize Payouts Sat, Mar 3, 2018 1-2?Prize Payouts Fri, Mar 2, 2018 4-6?Prize Payouts Thu, Mar 1, 2018 2-8?Prize Payouts Wed, Feb 28, 2018 3-3?Prize Payouts Tue, Feb 27, 2018 0-1?Prize Payouts Mon, Feb 26, 2018 9-4?Prize Payouts Sun, Feb 25, 2018 2-6?Prize Payouts Sat, Feb 24, 2018 9-8?Prize Payouts Fri, Feb 23, 2018 7-4?Prize Payouts Thu, Feb 22, 2018 6-5?Prize Payouts Wed, Feb 21, 2018 9-1?Prize Payouts Tue, Feb 20, 2018 1-5?Prize Payouts Mon, Feb 19, 2018 4-6?Prize Payouts Sun, Feb 18, 2018 3-3?Prize Payouts Sat, Feb 17, 2018 9-6?Prize Payouts Fri, Feb 16, 2018 0-0?Prize Payouts Thu, Feb 15, 2018 8-3?Prize Payouts Wed, Feb 14, 2018 2-7?Prize Payouts Tue, Feb 13, 2018 7-6?Prize Payouts Mon, Feb 12, 2018 6-5?Prize Payouts Sun, Feb 11, 2018 0-0?Prize Payouts Sat, Feb 10, 2018 5-2?Prize Payouts Fri, Feb 9, 2018 6-1?Prize Payouts Thu, Feb 8, 2018 4-1?Prize Payouts Wed, Feb 7, 2018 8-9?Prize Payouts Tue, Feb 6, 2018 7-5?Prize Payouts Mon, Feb 5, 2018 7-0?Prize Payouts Sun, Feb 4, 2018 3-1?Prize Payouts Sat, Feb 3, 2018 7-4?Prize Payouts Fri, Feb 2, 2018 4-4?Prize Payouts Thu, Feb 1, 2018 5-3?Prize Payouts Wed, Jan 31, 2018 8-3?Prize Payouts Tue, Jan 30, 2018 8-0?Prize Payouts Mon, Jan 29, 2018 9-4?Prize Payouts Sun, Jan 28, 2018 2-3?Prize Payouts Sat, Jan 27, 2018 0-6?Prize Payouts Fri, Jan 26, 2018 2-6?Prize Payouts Thu, Jan 25, 2018 3-0?Prize Payouts Wed, Jan 24, 2018 4-9?Prize Payouts Random sequence based on setup:
A:0 3 7 8 1 6 5 4 9 2
B:7 0 2 1 3 6 8 9 4 5
Say your current draw is 4 and 9, delete 4 then 9
A:0 3 7 8 1 6 5 2
B:7 0 2 1 3 6 8 5
Lets consider the first pair of the string for just observation:
03-07-08-01-06-05-02-30-37-38-31-36-35-32
70-72-71-73-76-78-75-07-02-01-03-06-08-05
Hits>30-03-06-06-23(32)-80(08-08)-31-70-(07-07)-75-76-
Lets observe some generated patterns within and across the strings
03-07-08-01-06-05-02-30-37-38-31-36-35-32>>>>within 03-30-
70-72-71-73-76-78-75-07-02-01-03-06-08-05>>within 70-07
Across> 03-07--08-01-06-05-02> summary 03-30-70-07 are picks generated.
What if we reduced the string further by a digit at time with 3 then 0
A:0 7 8 1 6 5 2> 07-08-01-06-05-02-70-78-71-76-75-72
B:7 0 2 1 6 8 5> 70-72-71-76-78-75-07-02-01-06-08-05
Observation>notice the transitions of digits 7 into 70-78-71-76-75-72 across the strings, these generation is inherent, you're not aware of it, the assumed setup is doing that.
Go ahead and reduce with 0
A: 7 8 1 6 5 2> 78-71-76-75-75-87-81-86-85-82
B:7 2 1 6 8 5> 72-71-76-78-75-27-21-26-28-25
Observe hits 75--82-28-72-27
This is simple approach to lottery games with a twist for each matrix.
P4>
set up> low 0, limit 9, combo matrix ratio 4/10(10000)
Generate four sets of sequence:
A:9 4 2 7 6 1 8 3 5 0
B:6 1 3 2 0 7 5 8 9 4
C:0 3 6 2 8 9 7 1 5 4
D:2 7 6 4 0 5 3 9 8 1
Process : observe the first quad of each sequence before any digit transition, any observed pattern is random
9427
6132
0362
2764
NB> You can generate as many strings for your workout, my suggestion is less is more handy.
GL
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Quote: Originally posted by adobea78 on Mar 3, 2018
The use of the word 'generate' is not free from restraint, is guided /influence by matrix and regulations of the game. For start, lets delve into the matrix and regulations, the matrix is 3/10 with digit replacement. What's your take on this statement 'the matrix is 3/10 with digit replacement'. Lets go further with regulation that states that 'each event/draw(set) starts with fixed combination', 100 sets for P2, what's your take on this statement 'each event/draw(set) starts with fixed combination'?.
Lets picture the draw process mechanically, you have two machines, each with 10 balls spinning, do you think the two digits 3 and 3 are related for outcome event 33? Lets just use one machine and apply the rule of 'digit replacement, meaning, when the first digit is drawn, it goes back to the machine (10 balls is constant) for the next. What is the inference here? The draws/event/ spinning is very very independent, preceding event has no bearing whatsoever on subsequent event ! . Are the digits related? obviously not, the digits are reference points for transitions within a generated string/pattern/base, you may assume the digit 3 and 3 been identical are the same forgetting the TIME factor !.
So how do you generate strings based on the matrix and game regulation:
- Find a good Random generator (Random.org is perfect)
- Your low and limit parameters, P 2 ( low 0, Limit 9)
- set max combo for game matrix 2/10 is 100
Points 2 and 3 is your assumption for ensuing structure of string/pattern/base, so lets start with P2.
A. Points 1,2,3 will give different shapes/structure of digit transitions, so run the generator 2 times (two different machines or digit with replacement is the rule.
B. Observe the first two digits of each string
C. Take the current draw digits , observe how they fit into each string.
I want you to step back and forget the draw digit history, I want you to focus only on digits!
For matrix like 5/39, set up is low 1, limit 39 and matrix combo 575757(is draw without replacement)
PA-2 Eve
68-62-61-69-49-94
FL-2 Eve
03-30-01-10-73-37-71-17
Ontario85-58-86-68-89-98-56-65-59-
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Quote: Originally posted by adobea78 on Mar 3, 2018
The use of the word 'generate' is not free from restraint, is guided /influence by matrix and regulations of the game. For start, lets delve into the matrix and regulations, the matrix is 3/10 with digit replacement. What's your take on this statement 'the matrix is 3/10 with digit replacement'. Lets go further with regulation that states that 'each event/draw(set) starts with fixed combination', 100 sets for P2, what's your take on this statement 'each event/draw(set) starts with fixed combination'?.
Lets picture the draw process mechanically, you have two machines, each with 10 balls spinning, do you think the two digits 3 and 3 are related for outcome event 33? Lets just use one machine and apply the rule of 'digit replacement, meaning, when the first digit is drawn, it goes back to the machine (10 balls is constant) for the next. What is the inference here? The draws/event/ spinning is very very independent, preceding event has no bearing whatsoever on subsequent event ! . Are the digits related? obviously not, the digits are reference points for transitions within a generated string/pattern/base, you may assume the digit 3 and 3 been identical are the same forgetting the TIME factor !.
So how do you generate strings based on the matrix and game regulation:
- Find a good Random generator (Random.org is perfect)
- Your low and limit parameters, P 2 ( low 0, Limit 9)
- set max combo for game matrix 2/10 is 100
Points 2 and 3 is your assumption for ensuing structure of string/pattern/base, so lets start with P2.
A. Points 1,2,3 will give different shapes/structure of digit transitions, so run the generator 2 times (two different machines or digit with replacement is the rule.
B. Observe the first two digits of each string
C. Take the current draw digits , observe how they fit into each string.
I want you to step back and forget the draw digit history, I want you to focus only on digits!
For matrix like 5/39, set up is low 1, limit 39 and matrix combo 575757(is draw without replacement)
Depending on the current pool structure, the combo of the matrix x/n will also differ.
Strings/sequence 0123456789 and 9841230675 has different combo structures .
Lets work on P3
Set up for random generator> low 0, limit 9, matrix ratio 1000, so we spin generators three times.
A:8 1 6 3 5 2 9 7 4 0
B:0 6 8 4 3 9 7 5 2 1
C:8 7 9 1 5 0 4 3 6 2
NB:Though A,B,C has 1000 Combos, the structures are different.
WI
Pick 3 Pick 4 Midday Evening Midday Evening Mon, Mar 5, 2018 8-3-1 0-5-3-4 Sun, Mar 4, 2018 9-3-8 8-5-0-8 Sat, Mar 3, 2018 4-3-3 7-7-4-6 Fri, Mar 2, 2018 4-8-1 5-2-6-7 Thu, Mar 1, 2018 9-9-4 9-3-5-7 Wed, Feb 28, 2018 8-2-2 9-3-4-8 Tue, Feb 27, 2018 5-6-3 9-6-8-6 Mon, Feb 26, 2018 9-4-5 0-7-1-4 Sun, Feb 25, 2018 6-8-2 6-8-3-2 Sat, Feb 24, 2018 0-7-9 1-0-8-0 Fri, Feb 23, 2018 4-5-1 1-6-3-9 Thu, Feb 22, 2018 8-3-6 1-0-8-8 Wed, Feb 21, 2018 2-3-1 3-9-7-2 Tue, Feb 20, 2018 9-2-5 2-1-1-2 Mon, Feb 19, 2018 9-3-9 0-4-8-9 Sun, Feb 18, 2018 0-4-3 3-3-7-1 Sat, Feb 17, 2018 8-1-6 5-0-7-0 Fri, Feb 16, 2018 8-0-3 6-0-7-7 Thu, Feb 15, 2018 6-4-0 1-3-4-7 Wed, Feb 14, 2018 7-4-1 3-8-6-5 Tue, Feb 13, 2018 8-9-6 0-8-3-0 Mon, Feb 12, 2018 4-6-4 5-2-9-4 Sun, Feb 11, 2018 5-0-6 2-3-8-3 Sat, Feb 10, 2018 2-7-2 3-6-1-5 Fri, Feb 9, 2018 7-2-1 9-5-9-8 Thu, Feb 8, 2018 4-2-9 1-8-8-1 Wed, Feb 7, 2018 6-3-1 3-7-7-6 Tue, Feb 6, 2018 4-1-3 3-5-8-9 Current draw 413, work with digit transitions 4 then 1 then 3Working with 4A:8 1 6 3 5 2 9 7 0
B:0 6 8 3 9 7 5 2 1
C:8 7 9 1 5 0 3 6 2
Let see the progression of A, B,C as far as combos is concerned:
A
Permutations with repetition (n=9, r=3)
Using Items: 8,1,6,3,5,2,9,7,0List has 729 entries.
{8,8,8} {8,8,1} {8,8,6} {8,8,3} {8,8,5} {8,8,2} {8,8,9} {8,8,7} {8,8,0} {8,1,8} {8,1,1} {8,1,6} {8,1,3} {8,1,5} {8,1,2} {8,1,9} {8,1,7} {8,1,0} {8,6,8} {8,6,1} {8,6,6} {8,6,3} {8,6,5} {8,6,2} {8,6,9} {8,6,7} {8,6,0} {8,3,8} {8,3,1} {8,3,6} {8,3,3} {8,3,5} {8,3,2} {8,3,9} {8,3,7} {8,3,0} {8,5,8} {8,5,1} {8,5,6} {8,5,3} {8,5,5} {8,5,2} {8,5,9} {8,5,7} {8,5,0} {8,2,8} {8,2,1} {8,2,6} {8,2,3} {8,2,5} {8,2,2} {8,2,9} {8,2,7} {8,2,0} {8,9,8} {8,9,1} {8,9,6} {8,9,3} {8,9,5} {8,9,2} {8,9,9} {8,9,7} {8,9,0} {8,7,8} {8,7,1} {8,7,6} {8,7,3} {8,7,5} {8,7,2} {8,7,9} {8,7,7} {8,7,0} {8,0,8} {8,0,1} {8,0,6} {8,0,3} {8,0,5} {8,0,2} {8,0,9} {8,0,7} {8,0,0} {1,8,8} {1,8,1} {1,8,6} {1,8,3} {1,8,5} {1,8,2} {1,8,9} {1,8,7} {1,8,0} {1,1,8} {1,1,1} {1,1,6} {1,1,3} {1,1,5} {1,1,2} {1,1,9} {1,1,7} {1,1,0} {1,6,8} {1,6,1} {1,6,6} {1,6,3} {1,6,5} {1,6,2} {1,6,9} {1,6,7} {1,6,0} {1,3,8} {1,3,1} {1,3,6} {1,3,3} {1,3,5} {1,3,2} {1,3,9} {1,3,7} {1,3,0} {1,5,8} {1,5,1} {1,5,6} {1,5,3} {1,5,5} {1,5,2} {1,5,9} {1,5,7} {1,5,0} {1,2,8} {1,2,1} {1,2,6} {1,2,3} {1,2,5} {1,2,2} {1,2,9} {1,2,7} {1,2,0} {1,9,8} {1,9,1} {1,9,6} {1,9,3} {1,9,5} {1,9,2} {1,9,9} {1,9,7} {1,9,0} {1,7,8} {1,7,1} {1,7,6} {1,7,3} {1,7,5} {1,7,2} {1,7,9} {1,7,7} {1,7,0} {1,0,8} {1,0,1} {1,0,6} {1,0,3} {1,0,5} {1,0,2} {1,0,9} {1,0,7} {1,0,0} {6,8,8} {6,8,1} {6,8,6} {6,8,3} {6,8,5} {6,8,2} {6,8,9} {6,8,7} {6,8,0} {6,1,8} {6,1,1} {6,1,6} {6,1,3} {6,1,5} {6,1,2} {6,1,9} {6,1,7} {6,1,0} {6,6,8} {6,6,1} {6,6,6} {6,6,3} {6,6,5} {6,6,2} {6,6,9} {6,6,7} {6,6,0} {6,3,8} {6,3,1} {6,3,6} {6,3,3} {6,3,5} {6,3,2} {6,3,9} {6,3,7} {6,3,0} {6,5,8} {6,5,1} {6,5,6} {6,5,3} {6,5,5} {6,5,2} {6,5,9} {6,5,7} {6,5,0} {6,2,8} {6,2,1} {6,2,6} {6,2,3} {6,2,5} {6,2,2} {6,2,9} {6,2,7} {6,2,0} {6,9,8} {6,9,1} {6,9,6} {6,9,3} {6,9,5} {6,9,2} {6,9,9} {6,9,7} {6,9,0} {6,7,8} {6,7,1} {6,7,6} {6,7,3} {6,7,5} {6,7,2} {6,7,9} {6,7,7} {6,7,0} {6,0,8} {6,0,1} {6,0,6} {6,0,3} {6,0,5} {6,0,2} {6,0,9} {6,0,7} {6,0,0} {3,8,8} {3,8,1} {3,8,6} {3,8,3} {3,8,5} {3,8,2} {3,8,9} {3,8,7} {3,8,0} {3,1,8} {3,1,1} {3,1,6} {3,1,3} {3,1,5} {3,1,2} {3,1,9} {3,1,7} {3,1,0} {3,6,8} {3,6,1} {3,6,6} {3,6,3} {3,6,5} {3,6,2} {3,6,9} {3,6,7} {3,6,0} {3,3,8} {3,3,1} {3,3,6} {3,3,3} {3,3,5} {3,3,2} {3,3,9} {3,3,7} {3,3,0} {3,5,8} {3,5,1} {3,5,6} {3,5,3} {3,5,5} {3,5,2} {3,5,9} {3,5,7} {3,5,0} {3,2,8} {3,2,1} {3,2,6} {3,2,3} {3,2,5} {3,2,2} {3,2,9} {3,2,7} {3,2,0} {3,9,8} {3,9,1} {3,9,6} {3,9,3} {3,9,5} {3,9,2} {3,9,9} {3,9,7} {3,9,0} {3,7,8} {3,7,1} {3,7,6} {3,7,3} {3,7,5} {3,7,2} {3,7,9} {3,7,7} {3,7,0} {3,0,8} {3,0,1} {3,0,6} {3,0,3} {3,0,5} {3,0,2} {3,0,9} {3,0,7} {3,0,0} {5,8,8} {5,8,1} {5,8,6} {5,8,3} {5,8,5} {5,8,2} {5,8,9} {5,8,7} {5,8,0} {5,1,8} {5,1,1} {5,1,6} {5,1,3} {5,1,5} {5,1,2} {5,1,9} {5,1,7} {5,1,0} {5,6,8} {5,6,1} {5,6,6} {5,6,3} {5,6,5} {5,6,2} {5,6,9} {5,6,7} {5,6,0} {5,3,8} {5,3,1} {5,3,6} {5,3,3} {5,3,5} {5,3,2} {5,3,9} {5,3,7} {5,3,0} {5,5,8} {5,5,1} {5,5,6} {5,5,3} {5,5,5} {5,5,2} {5,5,9} {5,5,7} {5,5,0} {5,2,8} {5,2,1} {5,2,6} {5,2,3} {5,2,5} {5,2,2} {5,2,9} {5,2,7} {5,2,0} {5,9,8} {5,9,1} {5,9,6} {5,9,3} {5,9,5} {5,9,2} {5,9,9} {5,9,7} {5,9,0} {5,7,8} {5,7,1} {5,7,6} {5,7,3} {5,7,5} {5,7,2} {5,7,9} {5,7,7} {5,7,0} {5,0,8} {5,0,1} {5,0,6} {5,0,3} {5,0,5} {5,0,2} {5,0,9} {5,0,7} {5,0,0} {2,8,8} {2,8,1} {2,8,6} {2,8,3} {2,8,5} {2,8,2} {2,8,9} {2,8,7} {2,8,0} {2,1,8} {2,1,1} {2,1,6} {2,1,3} {2,1,5} {2,1,2} {2,1,9} {2,1,7} {2,1,0} {2,6,8} {2,6,1} {2,6,6} {2,6,3} {2,6,5} {2,6,2} {2,6,9} {2,6,7} {2,6,0} {2,3,8} {2,3,1} {2,3,6} {2,3,3} {2,3,5} {2,3,2} {2,3,9} {2,3,7} {2,3,0} {2,5,8} {2,5,1} {2,5,6} {2,5,3} {2,5,5} {2,5,2} {2,5,9} {2,5,7} {2,5,0} {2,2,8} {2,2,1} {2,2,6} {2,2,3} {2,2,5} {2,2,2} {2,2,9} {2,2,7} {2,2,0} {2,9,8} {2,9,1} {2,9,6} {2,9,3} {2,9,5} {2,9,2} {2,9,9} {2,9,7} {2,9,0} {2,7,8} {2,7,1} {2,7,6} {2,7,3} {2,7,5} {2,7,2} {2,7,9} {2,7,7} {2,7,0} {2,0,8} {2,0,1} {2,0,6} {2,0,3} {2,0,5} {2,0,2} {2,0,9} {2,0,7} {2,0,0} {9,8,8} {9,8,1} {9,8,6} {9,8,3} {9,8,5} {9,8,2} {9,8,9} {9,8,7} {9,8,0} {9,1,8} {9,1,1} {9,1,6} {9,1,3} {9,1,5} {9,1,2} {9,1,9} {9,1,7} {9,1,0} {9,6,8} {9,6,1} {9,6,6} {9,6,3} {9,6,5} {9,6,2} {9,6,9} {9,6,7} {9,6,0} {9,3,8} {9,3,1} {9,3,6} {9,3,3} {9,3,5} {9,3,2} {9,3,9} {9,3,7} {9,3,0} {9,5,8} {9,5,1} {9,5,6} {9,5,3} {9,5,5} {9,5,2} {9,5,9} {9,5,7} {9,5,0} {9,2,8} {9,2,1} {9,2,6} {9,2,3} {9,2,5} {9,2,2} {9,2,9} {9,2,7} {9,2,0} {9,9,8} {9,9,1} {9,9,6} {9,9,3} {9,9,5} {9,9,2} {9,9,9} {9,9,7} {9,9,0} {9,7,8} {9,7,1} {9,7,6} {9,7,3} {9,7,5} {9,7,2} {9,7,9} {9,7,7} {9,7,0} {9,0,8} {9,0,1} {9,0,6} {9,0,3} {9,0,5} {9,0,2} {9,0,9} {9,0,7} {9,0,0} {7,8,8} {7,8,1} {7,8,6} {7,8,3} {7,8,5} {7,8,2} {7,8,9} {7,8,7} {7,8,0} {7,1,8} {7,1,1} {7,1,6} {7,1,3} {7,1,5} {7,1,2} {7,1,9} {7,1,7} {7,1,0} {7,6,8} {7,6,1} {7,6,6} {7,6,3} {7,6,5} {7,6,2} {7,6,9} {7,6,7} {7,6,0} {7,3,8} {7,3,1} {7,3,6} {7,3,3} {7,3,5} {7,3,2} {7,3,9} {7,3,7} {7,3,0} {7,5,8} {7,5,1} {7,5,6} {7,5,3} {7,5,5} {7,5,2} {7,5,9} {7,5,7} {7,5,0} {7,2,8} {7,2,1} {7,2,6} {7,2,3} {7,2,5} {7,2,2} {7,2,9} {7,2,7} {7,2,0} {7,9,8} {7,9,1} {7,9,6} {7,9,3} {7,9,5} {7,9,2} {7,9,9} {7,9,7} {7,9,0} {7,7,8} {7,7,1} {7,7,6} {7,7,3} {7,7,5} {7,7,2} {7,7,9} {7,7,7} {7,7,0} {7,0,8} {7,0,1} {7,0,6} {7,0,3} {7,0,5} {7,0,2} {7,0,9} {7,0,7} {7,0,0} {0,8,8} {0,8,1} {0,8,6} {0,8,3} {0,8,5} {0,8,2} {0,8,9} {0,8,7} {0,8,0} {0,1,8} {0,1,1} {0,1,6} {0,1,3} {0,1,5} {0,1,2} {0,1,9} {0,1,7} {0,1,0} {0,6,8} {0,6,1} {0,6,6} {0,6,3} {0,6,5} {0,6,2} {0,6,9} {0,6,7} {0,6,0} {0,3,8} {0,3,1} {0,3,6} {0,3,3} {0,3,5} {0,3,2} {0,3,9} {0,3,7} {0,3,0} {0,5,8} {0,5,1} {0,5,6} {0,5,3} {0,5,5} {0,5,2} {0,5,9} {0,5,7} {0,5,0} {0,2,8} {0,2,1} {0,2,6} {0,2,3} {0,2,5} {0,2,2} {0,2,9} {0,2,7} {0,2,0} {0,9,8} {0,9,1} {0,9,6} {0,9,3} {0,9,5} {0,9,2} {0,9,9} {0,9,7} {0,9,0} {0,7,8} {0,7,1} {0,7,6} {0,7,3} {0,7,5} {0,7,2} {0,7,9} {0,7,7} {0,7,0} {0,0,8} {0,0,1} {0,0,6} {0,0,3} {0,0,5} {0,0,2} {0,0,9} {0,0,7} {0,0,0}B
{0,0,0} {0,0,6} {0,0,8} {0,0,3} {0,0,9} {0,0,7} {0,0,5} {0,0,2} {0,0,1} {0,6,0} {0,6,6} {0,6,8} {0,6,3} {0,6,9} {0,6,7} {0,6,5} {0,6,2} {0,6,1} {0,8,0} {0,8,6} {0,8,8} {0,8,3} {0,8,9} {0,8,7} {0,8,5} {0,8,2} {0,8,1} {0,3,0} {0,3,6} {0,3,8} {0,3,3} {0,3,9} {0,3,7} {0,3,5} {0,3,2} {0,3,1} {0,9,0} {0,9,6} {0,9,8} {0,9,3} {0,9,9} {0,9,7} {0,9,5} {0,9,2} {0,9,1} {0,7,0} {0,7,6} {0,7,8} {0,7,3} {0,7,9} {0,7,7} {0,7,5} {0,7,2} {0,7,1} {0,5,0} {0,5,6} {0,5,8} {0,5,3} {0,5,9} {0,5,7} {0,5,5} {0,5,2} {0,5,1} {0,2,0} {0,2,6} {0,2,8} {0,2,3} {0,2,9} {0,2,7} {0,2,5} {0,2,2} {0,2,1} {0,1,0} {0,1,6} {0,1,8} {0,1,3} {0,1,9} {0,1,7} {0,1,5} {0,1,2} {0,1,1} {6,0,0} {6,0,6} {6,0,8} {6,0,3} {6,0,9} {6,0,7} {6,0,5} {6,0,2} {6,0,1} {6,6,0} {6,6,6} {6,6,8} {6,6,3} {6,6,9} {6,6,7} {6,6,5} {6,6,2} {6,6,1} {6,8,0} {6,8,6} {6,8,8} {6,8,3} {6,8,9} {6,8,7} {6,8,5} {6,8,2} {6,8,1} {6,3,0} {6,3,6} {6,3,8} {6,3,3} {6,3,9} {6,3,7} {6,3,5} {6,3,2} {6,3,1} {6,9,0} {6,9,6} {6,9,8} {6,9,3} {6,9,9} {6,9,7} {6,9,5} {6,9,2} {6,9,1} {6,7,0} {6,7,6} {6,7,8} {6,7,3} {6,7,9} {6,7,7} {6,7,5} {6,7,2} {6,7,1} {6,5,0} {6,5,6} {6,5,8} {6,5,3} {6,5,9} {6,5,7} {6,5,5} {6,5,2} {6,5,1} {6,2,0} {6,2,6} {6,2,8} {6,2,3} {6,2,9} {6,2,7} {6,2,5} {6,2,2} {6,2,1} {6,1,0} {6,1,6} {6,1,8} {6,1,3} {6,1,9} {6,1,7} {6,1,5} {6,1,2} {6,1,1} {8,0,0} {8,0,6} {8,0,8} {8,0,3} {8,0,9} {8,0,7} {8,0,5} {8,0,2} {8,0,1} {8,6,0} {8,6,6} {8,6,8} {8,6,3} {8,6,9} {8,6,7} {8,6,5} {8,6,2} {8,6,1} {8,8,0} {8,8,6} {8,8,8} {8,8,3} {8,8,9} {8,8,7} {8,8,5} {8,8,2} {8,8,1} {8,3,0} {8,3,6} {8,3,8} {8,3,3} {8,3,9} {8,3,7} {8,3,5} {8,3,2} {8,3,1} {8,9,0} {8,9,6} {8,9,8} {8,9,3} {8,9,9} {8,9,7} {8,9,5} {8,9,2} {8,9,1} {8,7,0} {8,7,6} {8,7,8} {8,7,3} {8,7,9} {8,7,7} {8,7,5} {8,7,2} {8,7,1} {8,5,0} {8,5,6} {8,5,8} {8,5,3} {8,5,9} {8,5,7} {8,5,5} {8,5,2} {8,5,1} {8,2,0} {8,2,6} {8,2,8} {8,2,3} {8,2,9} {8,2,7} {8,2,5} {8,2,2} {8,2,1} {8,1,0} {8,1,6} {8,1,8} {8,1,3} {8,1,9} {8,1,7} {8,1,5} {8,1,2} {8,1,1} {3,0,0} {3,0,6} {3,0,8} {3,0,3} {3,0,9} {3,0,7} {3,0,5} {3,0,2} {3,0,1} {3,6,0} {3,6,6} {3,6,8} {3,6,3} {3,6,9} {3,6,7} {3,6,5} {3,6,2} {3,6,1} {3,8,0} {3,8,6} {3,8,8} {3,8,3} {3,8,9} {3,8,7} {3,8,5} {3,8,2} {3,8,1} {3,3,0} {3,3,6} {3,3,8} {3,3,3} {3,3,9} {3,3,7} {3,3,5} {3,3,2} {3,3,1} {3,9,0} {3,9,6} {3,9,8} {3,9,3} {3,9,9} {3,9,7} {3,9,5} {3,9,2} {3,9,1} {3,7,0} {3,7,6} {3,7,8} {3,7,3} {3,7,9} {3,7,7} {3,7,5} {3,7,2} {3,7,1} {3,5,0} {3,5,6} {3,5,8} {3,5,3} {3,5,9} {3,5,7} {3,5,5} {3,5,2} {3,5,1} {3,2,0} {3,2,6} {3,2,8} {3,2,3} {3,2,9} {3,2,7} {3,2,5} {3,2,2} {3,2,1} {3,1,0} {3,1,6} {3,1,8} {3,1,3} {3,1,9} {3,1,7} {3,1,5} {3,1,2} {3,1,1} {9,0,0} {9,0,6} {9,0,8} {9,0,3} {9,0,9} {9,0,7} {9,0,5} {9,0,2} {9,0,1} {9,6,0} {9,6,6} {9,6,8} {9,6,3} {9,6,9} {9,6,7} {9,6,5} {9,6,2} {9,6,1} {9,8,0} {9,8,6} {9,8,8} {9,8,3} {9,8,9} {9,8,7} {9,8,5} {9,8,2} {9,8,1} {9,3,0} {9,3,6} {9,3,8} {9,3,3} {9,3,9} {9,3,7} {9,3,5} {9,3,2} {9,3,1} {9,9,0} {9,9,6} {9,9,8} {9,9,3} {9,9,9} {9,9,7} {9,9,5} {9,9,2} {9,9,1} {9,7,0} {9,7,6} {9,7,8} {9,7,3} {9,7,9} {9,7,7} {9,7,5} {9,7,2} {9,7,1} {9,5,0} {9,5,6} {9,5,8} {9,5,3} {9,5,9} {9,5,7} {9,5,5} {9,5,2} {9,5,1} {9,2,0} {9,2,6} {9,2,8} {9,2,3} {9,2,9} {9,2,7} {9,2,5} {9,2,2} {9,2,1} {9,1,0} {9,1,6} {9,1,8} {9,1,3} {9,1,9} {9,1,7} {9,1,5} {9,1,2} {9,1,1} {7,0,0} {7,0,6} {7,0,8} {7,0,3} {7,0,9} {7,0,7} {7,0,5} {7,0,2} {7,0,1} {7,6,0} {7,6,6} {7,6,8} {7,6,3} {7,6,9} {7,6,7} {7,6,5} {7,6,2} {7,6,1} {7,8,0} {7,8,6} {7,8,8} {7,8,3} {7,8,9} {7,8,7} {7,8,5} {7,8,2} {7,8,1} {7,3,0} {7,3,6} {7,3,8} {7,3,3} {7,3,9} {7,3,7} {7,3,5} {7,3,2} {7,3,1} {7,9,0} {7,9,6} {7,9,8} {7,9,3} {7,9,9} {7,9,7} {7,9,5} {7,9,2} {7,9,1} {7,7,0} {7,7,6} {7,7,8} {7,7,3} {7,7,9} {7,7,7} {7,7,5} {7,7,2} {7,7,1} {7,5,0} {7,5,6} {7,5,8} {7,5,3} {7,5,9} {7,5,7} {7,5,5} {7,5,2} {7,5,1} {7,2,0} {7,2,6} {7,2,8} {7,2,3} {7,2,9} {7,2,7} {7,2,5} {7,2,2} {7,2,1} {7,1,0} {7,1,6} {7,1,8} {7,1,3} {7,1,9} {7,1,7} {7,1,5} {7,1,2} {7,1,1} {5,0,0} {5,0,6} {5,0,8} {5,0,3} {5,0,9} {5,0,7} {5,0,5} {5,0,2} {5,0,1} {5,6,0} {5,6,6} {5,6,8} {5,6,3} {5,6,9} {5,6,7} {5,6,5} {5,6,2} {5,6,1} {5,8,0} {5,8,6} {5,8,8} {5,8,3} {5,8,9} {5,8,7} {5,8,5} {5,8,2} {5,8,1} {5,3,0} {5,3,6} {5,3,8} {5,3,3} {5,3,9} {5,3,7} {5,3,5} {5,3,2} {5,3,1} {5,9,0} {5,9,6} {5,9,8} {5,9,3} {5,9,9} {5,9,7} {5,9,5} {5,9,2} {5,9,1} {5,7,0} {5,7,6} {5,7,8} {5,7,3} {5,7,9} {5,7,7} {5,7,5} {5,7,2} {5,7,1} {5,5,0} {5,5,6} {5,5,8} {5,5,3} {5,5,9} {5,5,7} {5,5,5} {5,5,2} {5,5,1} {5,2,0} {5,2,6} {5,2,8} {5,2,3} {5,2,9} {5,2,7} {5,2,5} {5,2,2} {5,2,1} {5,1,0} {5,1,6} {5,1,8} {5,1,3} {5,1,9} {5,1,7} {5,1,5} {5,1,2} {5,1,1} {2,0,0} {2,0,6} {2,0,8} {2,0,3} {2,0,9} {2,0,7} {2,0,5} {2,0,2} {2,0,1} {2,6,0} {2,6,6} {2,6,8} {2,6,3} {2,6,9} {2,6,7} {2,6,5} {2,6,2} {2,6,1} {2,8,0} {2,8,6} {2,8,8} {2,8,3} {2,8,9} {2,8,7} {2,8,5} {2,8,2} {2,8,1} {2,3,0} {2,3,6} {2,3,8} {2,3,3} {2,3,9} {2,3,7} {2,3,5} {2,3,2} {2,3,1} {2,9,0} {2,9,6} {2,9,8} {2,9,3} {2,9,9} {2,9,7} {2,9,5} {2,9,2} {2,9,1} {2,7,0} {2,7,6} {2,7,8} {2,7,3} {2,7,9} {2,7,7} {2,7,5} {2,7,2} {2,7,1} {2,5,0} {2,5,6} {2,5,8} {2,5,3} {2,5,9} {2,5,7} {2,5,5} {2,5,2} {2,5,1} {2,2,0} {2,2,6} {2,2,8} {2,2,3} {2,2,9} {2,2,7} {2,2,5} {2,2,2} {2,2,1} {2,1,0} {2,1,6} {2,1,8} {2,1,3} {2,1,9} {2,1,7} {2,1,5} {2,1,2} {2,1,1} {1,0,0} {1,0,6} {1,0,8} {1,0,3} {1,0,9} {1,0,7} {1,0,5} {1,0,2} {1,0,1} {1,6,0} {1,6,6} {1,6,8} {1,6,3} {1,6,9} {1,6,7} {1,6,5} {1,6,2} {1,6,1} {1,8,0} {1,8,6} {1,8,8} {1,8,3} {1,8,9} {1,8,7} {1,8,5} {1,8,2} {1,8,1} {1,3,0} {1,3,6} {1,3,8} {1,3,3} {1,3,9} {1,3,7} {1,3,5} {1,3,2} {1,3,1} {1,9,0} {1,9,6} {1,9,8} {1,9,3} {1,9,9} {1,9,7} {1,9,5} {1,9,2} {1,9,1} {1,7,0} {1,7,6} {1,7,8} {1,7,3} {1,7,9} {1,7,7} {1,7,5} {1,7,2} {1,7,1} {1,5,0} {1,5,6} {1,5,8} {1,5,3} {1,5,9} {1,5,7} {1,5,5} {1,5,2} {1,5,1} {1,2,0} {1,2,6} {1,2,8} {1,2,3} {1,2,9} {1,2,7} {1,2,5} {1,2,2} {1,2,1} {1,1,0} {1,1,6} {1,1,8} {1,1,3} {1,1,9} {1,1,7} {1,1,5} {1,1,2} {1,1,1}
C
{8,8,8} {8,8,7} {8,8,9} {8,8,1} {8,8,5} {8,8,0} {8,8,3} {8,8,6} {8,8,2} {8,7,8} {8,7,7} {8,7,9} {8,7,1} {8,7,5} {8,7,0} {8,7,3} {8,7,6} {8,7,2} {8,9,8} {8,9,7} {8,9,9} {8,9,1} {8,9,5} {8,9,0} {8,9,3} {8,9,6} {8,9,2} {8,1,8} {8,1,7} {8,1,9} {8,1,1} {8,1,5} {8,1,0} {8,1,3} {8,1,6} {8,1,2} {8,5,8} {8,5,7} {8,5,9} {8,5,1} {8,5,5} {8,5,0} {8,5,3} {8,5,6} {8,5,2} {8,0,8} {8,0,7} {8,0,9} {8,0,1} {8,0,5} {8,0,0} {8,0,3} {8,0,6} {8,0,2} {8,3,8} {8,3,7} {8,3,9} {8,3,1} {8,3,5} {8,3,0} {8,3,3} {8,3,6} {8,3,2} {8,6,8} {8,6,7} {8,6,9} {8,6,1} {8,6,5} {8,6,0} {8,6,3} {8,6,6} {8,6,2} {8,2,8} {8,2,7} {8,2,9} {8,2,1} {8,2,5} {8,2,0} {8,2,3} {8,2,6} {8,2,2} {7,8,8} {7,8,7} {7,8,9} {7,8,1} {7,8,5} {7,8,0} {7,8,3} {7,8,6} {7,8,2} {7,7,8} {7,7,7} {7,7,9} {7,7,1} {7,7,5} {7,7,0} {7,7,3} {7,7,6} {7,7,2} {7,9,8} {7,9,7} {7,9,9} {7,9,1} {7,9,5} {7,9,0} {7,9,3} {7,9,6} {7,9,2} {7,1,8} {7,1,7} {7,1,9} {7,1,1} {7,1,5} {7,1,0} {7,1,3} {7,1,6} {7,1,2} {7,5,8} {7,5,7} {7,5,9} {7,5,1} {7,5,5} {7,5,0} {7,5,3} {7,5,6} {7,5,2} {7,0,8} {7,0,7} {7,0,9} {7,0,1} {7,0,5} {7,0,0} {7,0,3} {7,0,6} {7,0,2} {7,3,8} {7,3,7} {7,3,9} {7,3,1} {7,3,5} {7,3,0} {7,3,3} {7,3,6} {7,3,2} {7,6,8} {7,6,7} {7,6,9} {7,6,1} {7,6,5} {7,6,0} {7,6,3} {7,6,6} {7,6,2} {7,2,8} {7,2,7} {7,2,9} {7,2,1} {7,2,5} {7,2,0} {7,2,3} {7,2,6} {7,2,2} {9,8,8} {9,8,7} {9,8,9} {9,8,1} {9,8,5} {9,8,0} {9,8,3} {9,8,6} {9,8,2} {9,7,8} {9,7,7} {9,7,9} {9,7,1} {9,7,5} {9,7,0} {9,7,3} {9,7,6} {9,7,2} {9,9,8} {9,9,7} {9,9,9} {9,9,1} {9,9,5} {9,9,0} {9,9,3} {9,9,6} {9,9,2} {9,1,8} {9,1,7} {9,1,9} {9,1,1} {9,1,5} {9,1,0} {9,1,3} {9,1,6} {9,1,2} {9,5,8} {9,5,7} {9,5,9} {9,5,1} {9,5,5} {9,5,0} {9,5,3} {9,5,6} {9,5,2} {9,0,8} {9,0,7} {9,0,9} {9,0,1} {9,0,5} {9,0,0} {9,0,3} {9,0,6} {9,0,2} {9,3,8} {9,3,7} {9,3,9} {9,3,1} {9,3,5} {9,3,0} {9,3,3} {9,3,6} {9,3,2} {9,6,8} {9,6,7} {9,6,9} {9,6,1} {9,6,5} {9,6,0} {9,6,3} {9,6,6} {9,6,2} {9,2,8} {9,2,7} {9,2,9} {9,2,1} {9,2,5} {9,2,0} {9,2,3} {9,2,6} {9,2,2} {1,8,8} {1,8,7} {1,8,9} {1,8,1} {1,8,5} {1,8,0} {1,8,3} {1,8,6} {1,8,2} {1,7,8} {1,7,7} {1,7,9} {1,7,1} {1,7,5} {1,7,0} {1,7,3} {1,7,6} {1,7,2} {1,9,8} {1,9,7} {1,9,9} {1,9,1} {1,9,5} {1,9,0} {1,9,3} {1,9,6} {1,9,2} {1,1,8} {1,1,7} {1,1,9} {1,1,1} {1,1,5} {1,1,0} {1,1,3} {1,1,6} {1,1,2} {1,5,8} {1,5,7} {1,5,9} {1,5,1} {1,5,5} {1,5,0} {1,5,3} {1,5,6} {1,5,2} {1,0,8} {1,0,7} {1,0,9} {1,0,1} {1,0,5} {1,0,0} {1,0,3} {1,0,6} {1,0,2} {1,3,8} {1,3,7} {1,3,9} {1,3,1} {1,3,5} {1,3,0} {1,3,3} {1,3,6} {1,3,2} {1,6,8} {1,6,7} {1,6,9} {1,6,1} {1,6,5} {1,6,0} {1,6,3} {1,6,6} {1,6,2} {1,2,8} {1,2,7} {1,2,9} {1,2,1} {1,2,5} {1,2,0} {1,2,3} {1,2,6} {1,2,2} {5,8,8} {5,8,7} {5,8,9} {5,8,1} {5,8,5} {5,8,0} {5,8,3} {5,8,6} {5,8,2} {5,7,8} {5,7,7} {5,7,9} {5,7,1} {5,7,5} {5,7,0} {5,7,3} {5,7,6} {5,7,2} {5,9,8} {5,9,7} {5,9,9} {5,9,1} {5,9,5} {5,9,0} {5,9,3} {5,9,6} {5,9,2} {5,1,8} {5,1,7} {5,1,9} {5,1,1} {5,1,5} {5,1,0} {5,1,3} {5,1,6} {5,1,2} {5,5,8} {5,5,7} {5,5,9} {5,5,1} {5,5,5} {5,5,0} {5,5,3} {5,5,6} {5,5,2} {5,0,8} {5,0,7} {5,0,9} {5,0,1} {5,0,5} {5,0,0} {5,0,3} {5,0,6} {5,0,2} {5,3,8} {5,3,7} {5,3,9} {5,3,1} {5,3,5} {5,3,0} {5,3,3} {5,3,6} {5,3,2} {5,6,8} {5,6,7} {5,6,9} {5,6,1} {5,6,5} {5,6,0} {5,6,3} {5,6,6} {5,6,2} {5,2,8} {5,2,7} {5,2,9} {5,2,1} {5,2,5} {5,2,0} {5,2,3} {5,2,6} {5,2,2} {0,8,8} {0,8,7} {0,8,9} {0,8,1} {0,8,5} {0,8,0} {0,8,3} {0,8,6} {0,8,2} {0,7,8} {0,7,7} {0,7,9} {0,7,1} {0,7,5} {0,7,0} {0,7,3} {0,7,6} {0,7,2} {0,9,8} {0,9,7} {0,9,9} {0,9,1} {0,9,5} {0,9,0} {0,9,3} {0,9,6} {0,9,2} {0,1,8} {0,1,7} {0,1,9} {0,1,1} {0,1,5} {0,1,0} {0,1,3} {0,1,6} {0,1,2} {0,5,8} {0,5,7} {0,5,9} {0,5,1} {0,5,5} {0,5,0} {0,5,3} {0,5,6} {0,5,2} {0,0,8} {0,0,7} {0,0,9} {0,0,1} {0,0,5} {0,0,0} {0,0,3} {0,0,6} {0,0,2} {0,3,8} {0,3,7} {0,3,9} {0,3,1} {0,3,5} {0,3,0} {0,3,3} {0,3,6} {0,3,2} {0,6,8} {0,6,7} {0,6,9} {0,6,1} {0,6,5} {0,6,0} {0,6,3} {0,6,6} {0,6,2} {0,2,8} {0,2,7} {0,2,9} {0,2,1} {0,2,5} {0,2,0} {0,2,3} {0,2,6} {0,2,2} {3,8,8} {3,8,7} {3,8,9} {3,8,1} {3,8,5} {3,8,0} {3,8,3} {3,8,6} {3,8,2} {3,7,8} {3,7,7} {3,7,9} {3,7,1} {3,7,5} {3,7,0} {3,7,3} {3,7,6} {3,7,2} {3,9,8} {3,9,7} {3,9,9} {3,9,1} {3,9,5} {3,9,0} {3,9,3} {3,9,6} {3,9,2} {3,1,8} {3,1,7} {3,1,9} {3,1,1} {3,1,5} {3,1,0} {3,1,3} {3,1,6} {3,1,2} {3,5,8} {3,5,7} {3,5,9} {3,5,1} {3,5,5} {3,5,0} {3,5,3} {3,5,6} {3,5,2} {3,0,8} {3,0,7} {3,0,9} {3,0,1} {3,0,5} {3,0,0} {3,0,3} {3,0,6} {3,0,2} {3,3,8} {3,3,7} {3,3,9} {3,3,1} {3,3,5} {3,3,0} {3,3,3} {3,3,6} {3,3,2} {3,6,8} {3,6,7} {3,6,9} {3,6,1} {3,6,5} {3,6,0} {3,6,3} {3,6,6} {3,6,2} {3,2,8} {3,2,7} {3,2,9} {3,2,1} {3,2,5} {3,2,0} {3,2,3} {3,2,6} {3,2,2} {6,8,8} {6,8,7} {6,8,9} {6,8,1} {6,8,5} {6,8,0} {6,8,3} {6,8,6} {6,8,2} {6,7,8} {6,7,7} {6,7,9} {6,7,1} {6,7,5} {6,7,0} {6,7,3} {6,7,6} {6,7,2} {6,9,8} {6,9,7} {6,9,9} {6,9,1} {6,9,5} {6,9,0} {6,9,3} {6,9,6} {6,9,2} {6,1,8} {6,1,7} {6,1,9} {6,1,1} {6,1,5} {6,1,0} {6,1,3} {6,1,6} {6,1,2} {6,5,8} {6,5,7} {6,5,9} {6,5,1} {6,5,5} {6,5,0} {6,5,3} {6,5,6} {6,5,2} {6,0,8} {6,0,7} {6,0,9} {6,0,1} {6,0,5} {6,0,0} {6,0,3} {6,0,6} {6,0,2} {6,3,8} {6,3,7} {6,3,9} {6,3,1} {6,3,5} {6,3,0} {6,3,3} {6,3,6} {6,3,2} {6,6,8} {6,6,7} {6,6,9} {6,6,1} {6,6,5} {6,6,0} {6,6,3} {6,6,6} {6,6,2} {6,2,8} {6,2,7} {6,2,9} {6,2,1} {6,2,5} {6,2,0} {6,2,3} {6,2,6} {6,2,2} {2,8,8} {2,8,7} {2,8,9} {2,8,1} {2,8,5} {2,8,0} {2,8,3} {2,8,6} {2,8,2} {2,7,8} {2,7,7} {2,7,9} {2,7,1} {2,7,5} {2,7,0} {2,7,3} {2,7,6} {2,7,2} {2,9,8} {2,9,7} {2,9,9} {2,9,1} {2,9,5} {2,9,0} {2,9,3} {2,9,6} {2,9,2} {2,1,8} {2,1,7} {2,1,9} {2,1,1} {2,1,5} {2,1,0} {2,1,3} {2,1,6} {2,1,2} {2,5,8} {2,5,7} {2,5,9} {2,5,1} {2,5,5} {2,5,0} {2,5,3} {2,5,6} {2,5,2} {2,0,8} {2,0,7} {2,0,9} {2,0,1} {2,0,5} {2,0,0} {2,0,3} {2,0,6} {2,0,2} {2,3,8} {2,3,7} {2,3,9} {2,3,1} {2,3,5} {2,3,0} {2,3,3} {2,3,6} {2,3,2} {2,6,8} {2,6,7} {2,6,9} {2,6,1} {2,6,5} {2,6,0} {2,6,3} {2,6,6} {2,6,2} {2,2,8} {2,2,7} {2,2,9} {2,2,1} {2,2,5} {2,2,0} {2,2,3} {2,2,6} {2,2,2}
Observe first triad of each string combos:
A> 816> hits 896,803,836,682,822,831(check # of combos for digits 8,1,6)
B>068>hits 631,896,803,816,836,079,682 etc
I don't need to continue with string C, a summary of the strings is clear.
Good luck
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Quote: Originally posted by adobea78 on Mar 4, 2018
PA-2 Eve
68-62-61-69-49-94
FL-2 Eve
03-30-01-10-73-37-71-17
Ontario85-58-86-68-89-98-56-65-59-
PA> 61
ONTARIO> 58
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adobea78 can you please show us how you pick your numbers for pick 3 or pick 4
base on your system.
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when you say working with 4 you mean the first four digits A:816352970
not following what you mean by this.
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Quote: Originally posted by ddavis32 on Mar 6, 2018
adobea78 can you please show us how you pick your numbers for pick 3 or pick 4
base on your system.
Tell me what you do not understand and will gladly respond . Be mindful that an ideal is been discussed, is not a system. Understand the base ideal and form your own workout. I think most questions are ready answered in my intro.
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Quote: Originally posted by adobea78 on Mar 4, 2018
Lets use the 3 pointers and the statement ' each event is unique and starts with fixed combo ratio x/n'.
P2>
Parameters for random generator set up: Low 0, limit 9, combo ratio 2/10 (100)
Process: Assume two hoppers or one with digit replacement, so generate two sets at time.
Digit transition: The process gives you the assumed 'structure/shape' of the 10 digit string, so take any current draw digits to filter/adjust the structure(digit positions does not change much).
FL-2 day
ate Results Sun, Mar 4, 2018 8-8?Prize Payouts Sat, Mar 3, 2018 1-2?Prize Payouts Fri, Mar 2, 2018 4-6?Prize Payouts Thu, Mar 1, 2018 2-8?Prize Payouts Wed, Feb 28, 2018 3-3?Prize Payouts Tue, Feb 27, 2018 0-1?Prize Payouts Mon, Feb 26, 2018 9-4?Prize Payouts Sun, Feb 25, 2018 2-6?Prize Payouts Sat, Feb 24, 2018 9-8?Prize Payouts Fri, Feb 23, 2018 7-4?Prize Payouts Thu, Feb 22, 2018 6-5?Prize Payouts Wed, Feb 21, 2018 9-1?Prize Payouts Tue, Feb 20, 2018 1-5?Prize Payouts Mon, Feb 19, 2018 4-6?Prize Payouts Sun, Feb 18, 2018 3-3?Prize Payouts Sat, Feb 17, 2018 9-6?Prize Payouts Fri, Feb 16, 2018 0-0?Prize Payouts Thu, Feb 15, 2018 8-3?Prize Payouts Wed, Feb 14, 2018 2-7?Prize Payouts Tue, Feb 13, 2018 7-6?Prize Payouts Mon, Feb 12, 2018 6-5?Prize Payouts Sun, Feb 11, 2018 0-0?Prize Payouts Sat, Feb 10, 2018 5-2?Prize Payouts Fri, Feb 9, 2018 6-1?Prize Payouts Thu, Feb 8, 2018 4-1?Prize Payouts Wed, Feb 7, 2018 8-9?Prize Payouts Tue, Feb 6, 2018 7-5?Prize Payouts Mon, Feb 5, 2018 7-0?Prize Payouts Sun, Feb 4, 2018 3-1?Prize Payouts Sat, Feb 3, 2018 7-4?Prize Payouts Fri, Feb 2, 2018 4-4?Prize Payouts Thu, Feb 1, 2018 5-3?Prize Payouts Wed, Jan 31, 2018 8-3?Prize Payouts Tue, Jan 30, 2018 8-0?Prize Payouts Mon, Jan 29, 2018 9-4?Prize Payouts Sun, Jan 28, 2018 2-3?Prize Payouts Sat, Jan 27, 2018 0-6?Prize Payouts Fri, Jan 26, 2018 2-6?Prize Payouts Thu, Jan 25, 2018 3-0?Prize Payouts Wed, Jan 24, 2018 4-9?Prize Payouts Random sequence based on setup:
A:0 3 7 8 1 6 5 4 9 2
B:7 0 2 1 3 6 8 9 4 5
Say your current draw is 4 and 9, delete 4 then 9
A:0 3 7 8 1 6 5 2
B:7 0 2 1 3 6 8 5
Lets consider the first pair of the string for just observation:
03-07-08-01-06-05-02-30-37-38-31-36-35-32
70-72-71-73-76-78-75-07-02-01-03-06-08-05
Hits>30-03-06-06-23(32)-80(08-08)-31-70-(07-07)-75-76-
Lets observe some generated patterns within and across the strings
03-07-08-01-06-05-02-30-37-38-31-36-35-32>>>>within 03-30-
70-72-71-73-76-78-75-07-02-01-03-06-08-05>>within 70-07
Across> 03-07--08-01-06-05-02> summary 03-30-70-07 are picks generated.
What if we reduced the string further by a digit at time with 3 then 0
A:0 7 8 1 6 5 2> 07-08-01-06-05-02-70-78-71-76-75-72
B:7 0 2 1 6 8 5> 70-72-71-76-78-75-07-02-01-06-08-05
Observation>notice the transitions of digits 7 into 70-78-71-76-75-72 across the strings, these generation is inherent, you're not aware of it, the assumed setup is doing that.
Go ahead and reduce with 0
A: 7 8 1 6 5 2> 78-71-76-75-75-87-81-86-85-82
B:7 2 1 6 8 5> 72-71-76-78-75-27-21-26-28-25
Observe hits 75--82-28-72-27
This is simple approach to lottery games with a twist for each matrix.
P4>
set up> low 0, limit 9, combo matrix ratio 4/10(10000)
Generate four sets of sequence:
A:9 4 2 7 6 1 8 3 5 0
B:6 1 3 2 0 7 5 8 9 4
C:0 3 6 2 8 9 7 1 5 4
D:2 7 6 4 0 5 3 9 8 1
Process : observe the first quad of each sequence before any digit transition, any observed pattern is random
9427
6132
0362
2764
NB> You can generate as many strings for your workout, my suggestion is less is more handy.
GL
P4
Setup: low 0, limit 9, Matrix ratio 4/10 (10000)
4 Generators
A:9 2 6 7 3 0 4 1 5 8
B:9 7 4 6 0 5 2 1 8 3
C:6 2 8 1 7 0 9 3 5 4
D:1 5 0 7 6 2 4 8 9 3
Lets make some observations and infer from these random strings :
- Observe the first quad digit transitions across the strings
- Each string has different combination structure with same matrix ratio
- 1,2 is your filter,
Lets any State, eg OREGON.
Drawing Date Pick 4 1 pm 4 pm 7 pm 10 pm Wed, Mar 7, 2018 1-9-5-2 1-8-3-5 Tue, Mar 6, 2018 7-4-1-7 5-2-6-2 7-1-7-3 3-6-5-1 Mon, Mar 5, 2018 7-7-0-6 4-8-9-2 5-6-9-2 2-8-1-3 Sun, Mar 4, 2018 8-2-4-3 0-7-7-9 3-3-9-0 7-7-3-2 Sat, Mar 3, 2018 8-2-8-9 2-5-6-8 0-7-6-2 1-3-9-5 Fri, Mar 2, 2018 4-3-9-4 9-9-6-2 0-3-3-7 4-7-3-7 Thu, Mar 1, 2018 4-7-2-8 8-3-4-5 7-5-9-4 7-5-9-4 Wed, Feb 28, 2018 0-7-6-4 0-9-9-2 9-8-3-1 8-7-9-1 Tue, Feb 27, 2018 2-5-3-7 2-5-1-9 5-6-4-0 8-5-8-4 Mon, Feb 26, 2018 3-7-9-3 8-3-3-2 6-3-0-7 0-0-9-5 Sun, Feb 25, 2018 0-1-3-8 7-5-8-3 7-8-9-9 7-0-5-5 Sat, Feb 24, 2018 3-9-5-1 4-1-3-9 1-5-1-2 8-2-0-0 Fri, Feb 23, 2018 6-2-0-2 4-9-5-7 7-5-8-5 5-5-6-6 Thu, Feb 22, 2018 4-7-1-5 2-9-9-1 7-9-3-7 6-2-6-6 Wed, Feb 21, 2018 5-1-9-4 9-9-9-1 3-6-4-5 2-3-6-2 Tue, Feb 20, 2018 2-4-0-9 2-9-1-8 5-9-2-3 9-3-2-7 Mon, Feb 19, 2018 1-9-2-6 8-3-8-0 5-0-3-1 8-1-6-4 Sun, Feb 18, 2018 7-6-4-1 5-2-5-3 8-4-9-9 4-9-5-8 Sat, Feb 17, 2018 4-7-8-1 1-7-9-6 7-5-2-1 7-6-2-2 Fri, Feb 16, 2018 1-6-9-6 5-6-8-5 1-2-8-9 4-4-4-7 Thu, Feb 15, 2018 1-8-3-7 0-8-5-5 0-7-6-8 0-5-2-4 Wed, Feb 14, 2018 1-3-9-2 3-6-3-3 3-5-6-7 8-9-0-8 Tue, Feb 13, 2018 5-5-1-8 9-5-5-7 1-5-5-5 4-4-9-8 Mon, Feb 12, 2018 7-7-2-0 9-9-0-3 6-4-1-6 0-2-9-0 Sun, Feb 11, 2018 3-7-9-6 1-8-4-0 9-6-5-7 1-6-1-8 Sat, Feb 10, 2018 6-3-7-0 1-7-5-2 9-3-0-9 2-3-7-6 Fri, Feb 9, 2018 6-2-3-1 3-0-6-8 8-6-9-3 1-4-5-5 Thu, Feb 8, 2018 5-3-9-1 7-6-9-3 6-8-5-1 2-8-4-2 Start with 1PM draws
Current draw is 5391, lets work on transitions of digits 5 then 3 then 9 then 1.
Digit 5 transition
A:9 2 6 7 3 0 4 1 8
B:9 7 4 6 0 2 1 8 3
C:6 2 8 1 7 0 9 3 4
D:1 0 7 6 2 4 8 9 3
Lets pause here and observe the first quads A,B,C,D
9267
9746
6281
1076
Inference 3/4 is good waging strategy for subsequent draws 6321(6281),6370(1076), 3796(
9746,9267, these patterns are not after event , the random setup generates that. See how close
you're with digit positions 63,62.
Digit transition 3
A:9 2 6 7 0 4 1 8
B:9 7 4 6 0 2 1 8
C:6 2 8 1 7 0 9 4
D:1 0 7 6 2 4 8 9
Pause for first quad>>> Same as 5 transition
Digit transition 9
A:2 6 7 0 4 1 8
B: 7 4 6 0 2 1 8
C:6 2 8 1 7 0 4
D:1 0 7 6 2 4 8
Inference for 3/4 for subsequent draws 6231(6281),6370(7460,1076, 2670), 7641(7460,1076)... 0764.
See the digits 6,7 progression for subsequent draws. You finish with digit 1 transition for 2670,7460,6287,
0762.
Lets observe string combos for the digit transitions
Digit 5
{9,9,9,9} {9,9,9,2} {9,9,9,6} {9,9,9,7} {9,9,9,3} {9,9,9,0} {9,9,9,4} {9,9,9,1} {9,9,9,8} {9,9,2,9} {9,9,2,2} {9,9,2,6} {9,9,2,7} {9,9,2,3} {9,9,2,0} {9,9,2,4} {9,9,2,1} {9,9,2,8} {9,9,6,9} {9,9,6,2} {9,9,6,6} {9,9,6,7} {9,9,6,3} {9,9,6,0} {9,9,6,4} {9,9,6,1} {9,9,6,8} {9,9,7,9} {9,9,7,2} {9,9,7,6} {9,9,7,7} {9,9,7,3} {9,9,7,0} {9,9,7,4} {9,9,7,1} {9,9,7,8} {9,9,3,9} {9,9,3,2} {9,9,3,6} {9,9,3,7} {9,9,3,3} {9,9,3,0} {9,9,3,4} {9,9,3,1} {9,9,3,8} {9,9,0,9} {9,9,0,2} {9,9,0,6} {9,9,0,7} {9,9,0,3} {9,9,0,0} {9,9,0,4} {9,9,0,1} {9,9,0,8} {9,9,4,9} {9,9,4,2} {9,9,4,6} {9,9,4,7} {9,9,4,3} {9,9,4,0} {9,9,4,4} {9,9,4,1} {9,9,4,8} {9,9,1,9} {9,9,1,2} {9,9,1,6} {9,9,1,7} {9,9,1,3} {9,9,1,0} {9,9,1,4} {9,9,1,1} {9,9,1,8} {9,9,8,9} {9,9,8,2} {9,9,8,6} {9,9,8,7} {9,9,8,3} {9,9,8,0} {9,9,8,4} {9,9,8,1} {9,9,8,8} {9,2,9,9} {9,2,9,2} {9,2,9,6} {9,2,9,7} {9,2,9,3} {9,2,9,0} {9,2,9,4} {9,2,9,1} {9,2,9,8} {9,2,2,9} {9,2,2,2} {9,2,2,6} {9,2,2,7} {9,2,2,3} {9,2,2,0} {9,2,2,4} {9,2,2,1} {9,2,2,8} {9,2,6,9} {9,2,6,2} {9,2,6,6} {9,2,6,7} {9,2,6,3} {9,2,6,0} {9,2,6,4} {9,2,6,1} {9,2,6,8} {9,2,7,9} {9,2,7,2} {9,2,7,6} {9,2,7,7} {9,2,7,3} {9,2,7,0} {9,2,7,4} {9,2,7,1} {9,2,7,8} {9,2,3,9} {9,2,3,2} {9,2,3,6} {9,2,3,7} {9,2,3,3} {9,2,3,0} {9,2,3,4} {9,2,3,1} {9,2,3,8} {9,2,0,9} {9,2,0,2} {9,2,0,6} {9,2,0,7} {9,2,0,3} {9,2,0,0} {9,2,0,4} {9,2,0,1} {9,2,0,8} {9,2,4,9} {9,2,4,2} {9,2,4,6} {9,2,4,7} {9,2,4,3} {9,2,4,0} {9,2,4,4} {9,2,4,1} {9,2,4,8} {9,2,1,9} {9,2,1,2} {9,2,1,6} {9,2,1,7} {9,2,1,3} {9,2,1,0} {9,2,1,4} {9,2,1,1} {9,2,1,8} {9,2,8,9} {9,2,8,2} {9,2,8,6} {9,2,8,7} {9,2,8,3} {9,2,8,0} {9,2,8,4} {9,2,8,1} {9,2,8,8} {9,6,9,9} {9,6,9,2} {9,6,9,6} {9,6,9,7} {9,6,9,3} {9,6,9,0} {9,6,9,4} {9,6,9,1} {9,6,9,8} {9,6,2,9} {9,6,2,2} {9,6,2,6} {9,6,2,7} {9,6,2,3} {9,6,2,0} {9,6,2,4} {9,6,2,1} {9,6,2,8} {9,6,6,9} {9,6,6,2} {9,6,6,6} {9,6,6,7} {9,6,6,3} {9,6,6,0} {9,6,6,4} {9,6,6,1} {9,6,6,8} {9,6,7,9} {9,6,7,2} {9,6,7,6} {9,6,7,7} {9,6,7,3} {9,6,7,0} {9,6,7,4} {9,6,7,1} {9,6,7,8} {9,6,3,9} {9,6,3,2} {9,6,3,6} {9,6,3,7} {9,6,3,3} {9,6,3,0} {9,6,3,4} {9,6,3,1} {9,6,3,8} {9,6,0,9} {9,6,0,2} {9,6,0,6} {9,6,0,7} {9,6,0,3} {9,6,0,0} {9,6,0,4} {9,6,0,1} {9,6,0,8} {9,6,4,9} {9,6,4,2} {9,6,4,6} {9,6,4,7} {9,6,4,3} {9,6,4,0} {9,6,4,4} {9,6,4,1} {9,6,4,8} {9,6,1,9} {9,6,1,2} {9,6,1,6} {9,6,1,7} {9,6,1,3} {9,6,1,0} {9,6,1,4} {9,6,1,1} {9,6,1,8} {9,6,8,9} {9,6,8,2} {9,6,8,6} {9,6,8,7} {9,6,8,3} {9,6,8,0} {9,6,8,4} {9,6,8,1} {9,6,8,8} {9,7,9,9} {9,7,9,2} {9,7,9,6} {9,7,9,7} {9,7,9,3} {9,7,9,0} {9,7,9,4} {9,7,9,1} {9,7,9,8} {9,7,2,9} {9,7,2,2} {9,7,2,6} {9,7,2,7} {9,7,2,3} {9,7,2,0} {9,7,2,4} {9,7,2,1} {9,7,2,8} {9,7,6,9} {9,7,6,2} {9,7,6,6} {9,7,6,7} {9,7,6,3} {9,7,6,0} {9,7,6,4} {9,7,6,1} {9,7,6,8} {9,7,7,9} {9,7,7,2} {9,7,7,6} {9,7,7,7} {9,7,7,3} {9,7,7,0} {9,7,7,4} {9,7,7,1} {9,7,7,8} {9,7,3,9} {9,7,3,2} {9,7,3,6} {9,7,3,7} {9,7,3,3} {9,7,3,0} {9,7,3,4} {9,7,3,1} {9,7,3,8} {9,7,0,9} {9,7,0,2} {9,7,0,6} {9,7,0,7} {9,7,0,3} {9,7,0,0} {9,7,0,4} {9,7,0,1} {9,7,0,8} {9,7,4,9} {9,7,4,2} {9,7,4,6} {9,7,4,7} {9,7,4,3} {9,7,4,0} {9,7,4,4} {9,7,4,1} {9,7,4,8} {9,7,1,9} {9,7,1,2} {9,7,1,6} {9,7,1,7} {9,7,1,3} {9,7,1,0} {9,7,1,4} {9,7,1,1} {9,7,1,8} {9,7,8,9} {9,7,8,2} {9,7,8,6} {9,7,8,7} {9,7,8,3} {9,7,8,0} {9,7,8,4} {9,7,8,1} {9,7,8,8} {9,3,9,9} {9,3,9,2} {9,3,9,6} {9,3,9,7} {9,3,9,3} {9,3,9,0} {9,3,9,4} {9,3,9,1} {9,3,9,8} {9,3,2,9} {9,3,2,2} {9,3,2,6} {9,3,2,7} {9,3,2,3} {9,3,2,0} {9,3,2,4} {9,3,2,1} {9,3,2,8} {9,3,6,9} {9,3,6,2} {9,3,6,6} {9,3,6,7} {9,3,6,3} {9,3,6,0} {9,3,6,4} {9,3,6,1} {9,3,6,8} {9,3,7,9} {9,3,7,2} {9,3,7,6} {9,3,7,7} {9,3,7,3} {9,3,7,0} {9,3,7,4} {9,3,7,1} {9,3,7,8} {9,3,3,9} {9,3,3,2} {9,3,3,6} {9,3,3,7} {9,3,3,3} {9,3,3,0} {9,3,3,4} {9,3,3,1} {9,3,3,8} {9,3,0,9} {9,3,0,2} {9,3,0,6} {9,3,0,7} {9,3,0,3} {9,3,0,0} {9,3,0,4} {9,3,0,1} {9,3,0,8} {9,3,4,9} {9,3,4,2} {9,3,4,6} {9,3,4,7} {9,3,4,3} {9,3,4,0} {9,3,4,4} {9,3,4,1} {9,3,4,8} {9,3,1,9} {9,3,1,2} {9,3,1,6} {9,3,1,7} {9,3,1,3} {9,3,1,0} {9,3,1,4} {9,3,1,1} {9,3,1,8} {9,3,8,9} {9,3,8,2} {9,3,8,6} {9,3,8,7} {9,3,8,3} {9,3,8,0} {9,3,8,4} {9,3,8,1} {9,3,8,8} {9,0,9,9} {9,0,9,2} {9,0,9,6} {9,0,9,7} {9,0,9,3} {9,0,9,0} {9,0,9,4} {9,0,9,1} {9,0,9,8} {9,0,2,9} {9,0,2,2} {9,0,2,6} {9,0,2,7} {9,0,2,3} {9,0,2,0} {9,0,2,4} {9,0,2,1} {9,0,2,8} {9,0,6,9} {9,0,6,2} {9,0,6,6} {9,0,6,7} {9,0,6,3} {9,0,6,0} {9,0,6,4} {9,0,6,1} {9,0,6,8} {9,0,7,9} {9,0,7,2} {9,0,7,6} {9,0,7,7} {9,0,7,3} {9,0,7,0} {9,0,7,4} {9,0,7,1} {9,0,7,8} {9,0,3,9} {9,0,3,2} {9,0,3,6} {9,0,3,7} {9,0,3,3} {9,0,3,0} {9,0,3,4} {9,0,3,1} {9,0,3,8} {9,0,0,9} {9,0,0,2} {9,0,0,6} {9,0,0,7} {9,0,0,3} {9,0,0,0} {9,0,0,4} {9,0,0,1} {9,0,0,8} {9,0,4,9} {9,0,4,2} {9,0,4,6} {9,0,4,7} {9,0,4,3} {9,0,4,0} {9,0,4,4} {9,0,4,1} {9,0,4,8} {9,0,1,9} {9,0,1,2} {9,0,1,6} {9,0,1,7} {9,0,1,3} {9,0,1,0} {9,0,1,4} {9,0,1,1} {9,0,1,8} {9,0,8,9} {9,0,8,2} {9,0,8,6} {9,0,8,7} {9,0,8,3} {9,0,8,0} {9,0,8,4} {9,0,8,1} {9,0,8,8} {9,4,9,9} {9,4,9,2} {9,4,9,6} {9,4,9,7} {9,4,9,3} {9,4,9,0} {9,4,9,4} {9,4,9,1} {9,4,9,8} {9,4,2,9} {9,4,2,2} {9,4,2,6} {9,4,2,7} {9,4,2,3} {9,4,2,0} {9,4,2,4} {9,4,2,1} {9,4,2,8} {9,4,6,9} {9,4,6,2} {9,4,6,6} {9,4,6,7} {9,4,6,3} {9,4,6,0} {9,4,6,4} {9,4,6,1} {9,4,6,8} {9,4,7,9} {9,4,7,2} {9,4,7,6} {9,4,7,7} {9,4,7,3} {9,4,7,0} {9,4,7,4} {9,4,7,1} {9,4,7,8} {9,4,3,9} {9,4,3,2} {9,4,3,6} {9,4,3,7} {9,4,3,3} {9,4,3,0} {9,4,3,4} {9,4,3,1} {9,4,3,8} {9,4,0,9} {9,4,0,2} {9,4,0,6} {9,4,0,7} {9,4,0,3} {9,4,0,0} {9,4,0,4} {9,4,0,1} {9,4,0,8} {9,4,4,9} {9,4,4,2} {9,4,4,6} {9,4,4,7} {9,4,4,3} {9,4,4,0} {9,4,4,4} {9,4,4,1} {9,4,4,8} {9,4,1,9} {9,4,1,2} {9,4,1,6} {9,4,1,7} {9,4,1,3} {9,4,1,0} {9,4,1,4} {9,4,1,1} {9,4,1,8} {9,4,8,9} {9,4,8,2} {9,4,8,6} {9,4,8,7} {9,4,8,3} {9,4,8,0} {9,4,8,4} {9,4,8,1} {9,4,8,8} {9,1,9,9} {9,1,9,2} {9,1,9,6} {9,1,9,7} {9,1,9,3} {9,1,9,0} {9,1,9,4} {9,1,9,1} {9,1,9,8} {9,1,2,9} {9,1,2,2} {9,1,2,6} {9,1,2,7} {9,1,2,3} {9,1,2,0} {9,1,2,4} {9,1,2,1} {9,1,2,8} {9,1,6,9} {9,1,6,2} {9,1,6,6} {9,1,6,7} {9,1,6,3} {9,1,6,0} {9,1,6,4} {9,1,6,1} {9,1,6,8} {9,1,7,9} {9,1,7,2} {9,1,7,6} {9,1,7,7} {9,1,7,3} {9,1,7,0} {9,1,7,4} {9,1,7,1} {9,1,7,8} {9,1,3,9} {9,1,3,2} {9,1,3,6} {9,1,3,7} {9,1,3,3} {9,1,3,0} {9,1,3,4} {9,1,3,1} {9,1,3,8} {9,1,0,9} {9,1,0,2} {9,1,0,6} {9,1,0,7} {9,1,0,3} {9,1,0,0} {9,1,0,4} {9,1,0,1} {9,1,0,8} {9,1,4,9} {9,1,4,2} {9,1,4,6} {9,1,4,7} {9,1,4,3} {9,1,4,0} {9,1,4,4} {9,1,4,1} {9,1,4,8} {9,1,1,9} {9,1,1,2} {9,1,1,6} {9,1,1,7} {9,1,1,3} {9,1,1,0} {9,1,1,4} {9,1,1,1} {9,1,1,8} {9,1,8,9} {9,1,8,2} {9,1,8,6} {9,1,8,7} {9,1,8,3} {9,1,8,0} {9,1,8,4} {9,1,8,1} {9,1,8,8} {9,8,9,9} {9,8,9,2} {9,8,9,6} {9,8,9,7} {9,8,9,3} {9,8,9,0} {9,8,9,4} {9,8,9,1} {9,8,9,8} {9,8,2,9} {9,8,2,2} {9,8,2,6} {9,8,2,7} {9,8,2,3} {9,8,2,0} {9,8,2,4} {9,8,2,1} {9,8,2,8} {9,8,6,9} {9,8,6,2} {9,8,6,6} {9,8,6,7} {9,8,6,3} {9,8,6,0} {9,8,6,4} {9,8,6,1} {9,8,6,8} {9,8,7,9} {9,8,7,2} {9,8,7,6} {9,8,7,7} {9,8,7,3} {9,8,7,0} {9,8,7,4} {9,8,7,1} {9,8,7,8} {9,8,3,9} {9,8,3,2} {9,8,3,6} {9,8,3,7} {9,8,3,3} {9,8,3,0} {9,8,3,4} {9,8,3,1} {9,8,3,8} {9,8,0,9} {9,8,0,2} {9,8,0,6} {9,8,0,7} {9,8,0,3} {9,8,0,0} {9,8,0,4} {9,8,0,1} {9,8,0,8} {9,8,4,9} {9,8,4,2} {9,8,4,6} {9,8,4,7} {9,8,4,3} {9,8,4,0} {9,8,4,4} {9,8,4,1} {9,8,4,8} {9,8,1,9} {9,8,1,2} {9,8,1,6} {9,8,1,7} {9,8,1,3} {9,8,1,0} {9,8,1,4} {9,8,1,1} {9,8,1,8} {9,8,8,9} {9,8,8,2} {9,8,8,6} {9,8,8,7} {9,8,8,3} {9,8,8,0} {9,8,8,4} {9,8,8,1} {9,8,8,8} {2,9,9,9} {2,9,9,2} {2,9,9,6} {2,9,9,7} {2,9,9,3} {2,9,9,0} {2,9,9,4} {2,9,9,1} {2,9,9,8} {2,9,2,9} {2,9,2,2} {2,9,2,6} {2,9,2,7} {2,9,2,3} {2,9,2,0} {2,9,2,4} {2,9,2,1} {2,9,2,8} {2,9,6,9} {2,9,6,2} {2,9,6,6} {2,9,6,7} {2,9,6,3} {2,9,6,0} {2,9,6,4} {2,9,6,1} {2,9,6,8} {2,9,7,9} {2,9,7,2} {2,9,7,6} {2,9,7,7} {2,9,7,3} {2,9,7,0} {2,9,7,4} {2,9,7,1} {2,9,7,8} {2,9,3,9} {2,9,3,2} {2,9,3,6} {2,9,3,7} {2,9,3,3} {2,9,3,0} {2,9,3,4} {2,9,3,1} {2,9,3,8} {2,9,0,9} {2,9,0,2} {2,9,0,6} {2,9,0,7} {2,9,0,3} {2,9,0,0} {2,9,0,4} {2,9,0,1} {2,9,0,8} {2,9,4,9} {2,9,4,2} {2,9,4,6} {2,9,4,7} {2,9,4,3} {2,9,4,0} {2,9,4,4} {2,9,4,1} {2,9,4,8} {2,9,1,9} {2,9,1,2} {2,9,1,6} {2,9,1,7} {2,9,1,3} {2,9,1,0} {2,9,1,4} {2,9,1,1} {2,9,1,8} {2,9,8,9} {2,9,8,2} {2,9,8,6} {2,9,8,7} {2,9,8,3} {2,9,8,0} {2,9,8,4} {2,9,8,1} {2,9,8,8} {2,2,9,9} {2,2,9,2} {2,2,9,6} {2,2,9,7} {2,2,9,3} {2,2,9,0} {2,2,9,4} {2,2,9,1} {2,2,9,8} {2,2,2,9} {2,2,2,2} {2,2,2,6} {2,2,2,7} {2,2,2,3} {2,2,2,0} {2,2,2,4} {2,2,2,1} {2,2,2,8} {2,2,6,9} {2,2,6,2} {2,2,6,6} {2,2,6,7} {2,2,6,3} {2,2,6,0} {2,2,6,4} {2,2,6,1} {2,2,6,8} {2,2,7,9} {2,2,7,2} {2,2,7,6} {2,2,7,7} {2,2,7,3} {2,2,7,0} {2,2,7,4} {2,2,7,1} {2,2,7,8} {2,2,3,9} {2,2,3,2} {2,2,3,6} {2,2,3,7} {2,2,3,3} {2,2,3,0} {2,2,3,4} {2,2,3,1} {2,2,3,8} {2,2,0,9} {2,2,0,2} {2,2,0,6} {2,2,0,7} {2,2,0,3} {2,2,0,0} {2,2,0,4} {2,2,0,1} {2,2,0,8} {2,2,4,9} {2,2,4,2} {2,2,4,6} {2,2,4,7} {2,2,4,3} {2,2,4,0} {2,2,4,4} {2,2,4,1} {2,2,4,8} {2,2,1,9} {2,2,1,2} {2,2,1,6} {2,2,1,7} {2,2,1,3} {2,2,1,0} {2,2,1,4} {2,2,1,1} {2,2,1,8} {2,2,8,9} {2,2,8,2} {2,2,8,6} {2,2,8,7} {2,2,8,3} {2,2,8,0} {2,2,8,4} {2,2,8,1} {2,2,8,8} {2,6,9,9} {2,6,9,2} {2,6,9,6} {2,6,9,7} {2,6,9,3} {2,6,9,0} {2,6,9,4} {2,6,9,1} {2,6,9,8} {2,6,2,9} {2,6,2,2} {2,6,2,6} {2,6,2,7} {2,6,2,3} {2,6,2,0} {2,6,2,4} {2,6,2,1} {2,6,2,8} {2,6,6,9} {2,6,6,2} {2,6,6,6} {2,6,6,7} {2,6,6,3} {2,6,6,0} {2,6,6,4} {2,6,6,1} {2,6,6,8} {2,6,7,9} {2,6,7,2} {2,6,7,6} {2,6,7,7} {2,6,7,3} {2,6,7,0} {2,6,7,4} {2,6,7,1} {2,6,7,8} {2,6,3,9} {2,6,3,2} {2,6,3,6} {2,6,3,7} {2,6,3,3} {2,6,3,0} {2,6,3,4} {2,6,3,1} {2,6,3,8} {2,6,0,9} {2,6,0,2} {2,6,0,6} {2,6,0,7} {2,6,0,3} {2,6,0,0} {2,6,0,4} {2,6,0,1} {2,6,0,8} {2,6,4,9} {2,6,4,2} {2,6,4,6} {2,6,4,7} {2,6,4,3} {2,6,4,0} {2,6,4,4} {2,6,4,1} {2,6,4,8} {2,6,1,9} {2,6,1,2} {2,6,1,6} {2,6,1,7} {2,6,1,3} {2,6,1,0} {2,6,1,4} {2,6,1,1} {2,6,1,8} {2,6,8,9} {2,6,8,2} {2,6,8,6} {2,6,8,7} {2,6,8,3} {2,6,8,0} {2,6,8,4} {2,6,8,1} {2,6,8,8} {2,7,9,9} {2,7,9,2} {2,7,9,6} {2,7,9,7} {2,7,9,3} {2,7,9,0} {2,7,9,4} {2,7,9,1} {2,7,9,8} {2,7,2,9} {2,7,2,2} {2,7,2,6} {2,7,2,7} {2,7,2,3} {2,7,2,0} {2,7,2,4} {2,7,2,1} {2,7,2,8} {2,7,6,9} {2,7,6,2} {2,7,6,6} {2,7,6,7} {2,7,6,3} {2,7,6,0} {2,7,6,4} {2,7,6,1} {2,7,6,8} {2,7,7,9} {2,7,7,2} {2,7,7,6} {2,7,7,7} {2,7,7,3} {2,7,7,0} {2,7,7,4} {2,7,7,1} {2,7,7,8} {2,7,3,9} {2,7,3,2} {2,7,3,6} {2,7,3,7} {2,7,3,3} {2,7,3,0} {2,7,3,4} {2,7,3,1} {2,7,3,8} {2,7,0,9} {2,7,0,2} {2,7,0,6} {2,7,0,7} {2,7,0,3} {2,7,0,0} {2,7,0,4} {2,7,0,1} {2,7,0,8} {2,7,4,9} {2,7,4,2} {2,7,4,6} {2,7,4,7} {2,7,4,3} {2,7,4,0} {2,7,4,4} {2,7,4,1} {2,7,4,8} {2,7,1,9} {2,7,1,2} {2,7,1,6} {2,7,1,7} {2,7,1,3} {2,7,1,0} {2,7,1,4} {2,7,1,1} {2,7,1,8} {2,7,8,9} {2,7,8,2} {2,7,8,6} {2,7,8,7} {2,7,8,3} {2,7,8,0} {2,7,8,4} {2,7,8,1} {2,7,8,8} {2,3,9,9} {2,3,9,2} {2,3,9,6} {2,3,9,7} {2,3,9,3} {2,3,9,0} {2,3,9,4} {2,3,9,1} {2,3,9,8} {2,3,2,9} {2,3,2,2} {2,3,2,6} {2,3,2,7} {2,3,2,3} {2,3,2,0} {2,3,2,4} {2,3,2,1} {2,3,2,8} {2,3,6,9} {2,3,6,2} {2,3,6,6} {2,3,6,7} {2,3,6,3} {2,3,6,0} {2,3,6,4} {2,3,6,1} {2,3,6,8} {2,3,7,9} {2,3,7,2} {2,3,7,6} {2,3,7,7} {2,3,7,3} {2,3,7,0} {2,3,7,4} {2,3,7,1} {2,3,7,8} {2,3,3,9} {2,3,3,2} {2,3,3,6} {2,3,3,7} {2,3,3,3} {2,3,3,0} {2,3,3,4} {2,3,3,1} {2,3,3,8} {2,3,0,9} {2,3,0,2} {2,3,0,6} {2,3,0,7} {2,3,0,3} {2,3,0,0} {2,3,0,4} {2,3,0,1} {2,3,0,8} {2,3,4,9} {2,3,4,2} {2,3,4,6} {2,3,4,7} {2,3,4,3} {2,3,4,0} {2,3,4,4} {2,3,4,1} {2,3,4,8} {2,3,1,9} {2,3,1,2} {2,3,1,6} {2,3,1,7} {2,3,1,3} {2,3,1,0} {2,3,1,4} {2,3,1,1} {2,3,1,8} {2,3,8,9} {2,3,8,2} {2,3,8,6} {2,3,8,7} {2,3,8,3} {2,3,8,0} {2,3,8,4} {2,3,8,1} {2,3,8,8} {2,0,9,9} {2,0,9,2} {2,0,9,6} {2,0,9,7} {2,0,9,3} {2,0,9,0} {2,0,9,4} {2,0,9,1} {2,0,9,8} {2,0,2,9} {2,0,2,2} {2,0,2,6} {2,0,2,7} {2,0,2,3} {2,0,2,0} {2,0,2,4} {2,0,2,1} {2,0,2,8} {2,0,6,9} {2,0,6,2} {2,0,6,6} {2,0,6,7} {2,0,6,3} {2,0,6,0} {2,0,6,4} {2,0,6,1} {2,0,6,8} {2,0,7,9} {2,0,7,2} {2,0,7,6} {2,0,7,7} {2,0,7,3} {2,0,7,0} {2,0,7,4} {2,0,7,1} {2,0,7,8} {2,0,3,9} {2,0,3,2} {2,0,3,6} {2,0,3,7} {2,0,3,3} {2,0,3,0} {2,0,3,4} {2,0,3,1} {2,0,3,8} {2,0,0,9} {2,0,0,2} {2,0,0,6} {2,0,0,7} {2,0,0,3} {2,0,0,0} {2,0,0,4} {2,0,0,1} {2,0,0,8} {2,0,4,9} {2,0,4,2} {2,0,4,6} {2,0,4,7} {2,0,4,3} {2,0,4,0} {2,0,4,4} {2,0,4,1} {2,0,4,8} {2,0,1,9} {2,0,1,2} {2,0,1,6} {2,0,1,7} {2,0,1,3} {2,0,1,0} {2,0,1,4} {2,0,1,1} {2,0,1,8} {2,0,8,9} {2,0,8,2} {2,0,8,6} {2,0,8,7} {2,0,8,3} {2,0,8,0} {2,0,8,4} {2,0,8,1} {2,0,8,8} {2,4,9,9} {2,4,9,2} {2,4,9,6} {2,4,9,7} {2,4,9,3} {2,4,9,0} {2,4,9,4} {2,4,9,1} {2,4,9,8} {2,4,2,9} {2,4,2,2} {2,4,2,6} {2,4,2,7} {2,4,2,3} {2,4,2,0} {2,4,2,4} {2,4,2,1} {2,4,2,8} {2,4,6,9} {2,4,6,2} {2,4,6,6} {2,4,6,7} {2,4,6,3} {2,4,6,0} {2,4,6,4} {2,4,6,1} {2,4,6,8} {2,4,7,9} {2,4,7,2} {2,4,7,6} {2,4,7,7} {2,4,7,3} {2,4,7,0} {2,4,7,4} {2,4,7,1} {2,4,7,8} {2,4,3,9} {2,4,3,2} {2,4,3,6} {2,4,3,7} {2,4,3,3} {2,4,3,0} {2,4,3,4} {2,4,3,1} {2,4,3,8} {2,4,0,9} {2,4,0,2} {2,4,0,6} {2,4,0,7} {2,4,0,3} {2,4,0,0} {2,4,0,4} {2,4,0,1} {2,4,0,8} {2,4,4,9} {2,4,4,2} {2,4,4,6} {2,4,4,7} {2,4,4,3} {2,4,4,0} {2,4,4,4} {2,4,4,1} {2,4,4,8} {2,4,1,9} {2,4,1,2} {2,4,1,6} {2,4,1,7} {2,4,1,3} {2,4,1,0} {2,4,1,4} {2,4,1,1} {2,4,1,8} {2,4,8,9} {2,4,8,2} {2,4,8,6} {2,4,8,7} {2,4,8,3} {2,4,8,0} {2,4,8,4} {2,4,8,1} {2,4,8,8} {2,1,9,9} {2,1,9,2} {2,1,9,6} {2,1,9,7} {2,1,9,3} {2,1,9,0} {2,1,9,4} {2,1,9,1} {2,1,9,8} {2,1,2,9} {2,1,2,2} {2,1,2,6} {2,1,2,7} {2,1,2,3} {2,1,2,0} {2,1,2,4} {2,1,2,1} {2,1,2,8} {2,1,6,9} {2,1,6,2} {2,1,6,6} {2,1,6,7} {2,1,6,3} {2,1,6,0} {2,1,6,4} {2,1,6,1} {2,1,6,8} {2,1,7,9} {2,1,7,2} {2,1,7,6} {2,1,7,7} {2,1,7,3} {2,1,7,0} {2,1,7,4} {2,1,7,1} {2,1,7,8} {2,1,3,9} {2,1,3,2} {2,1,3,6} {2,1,3,7} {2,1,3,3} {2,1,3,0} {2,1,3,4} {2,1,3,1} {2,1,3,8} {2,1,0,9} {2,1,0,2} {2,1,0,6} {2,1,0,7} {2,1,0,3} {2,1,0,0} {2,1,0,4} {2,1,0,1} {2,1,0,8} {2,1,4,9} {2,1,4,2} {2,1,4,6} {2,1,4,7} {2,1,4,3} {2,1,4,0} {2,1,4,4} {2,1,4,1} {2,1,4,8} {2,1,1,9} {2,1,1,2} {2,1,1,6} {2,1,1,7} {2,1,1,3} {2,1,1,0} {2,1,1,4} {2,1,1,1} {2,1,1,8} {2,1,8,9} {2,1,8,2} {2,1,8,6} {2,1,8,7} {2,1,8,3} {2,1,8,0} {2,1,8,4} {2,1,8,1} {2,1,8,8} {2,8,9,9} {2,8,9,2} {2,8,9,6} {2,8,9,7} {2,8,9,3} {2,8,9,0} {2,8,9,4} {2,8,9,1} {2,8,9,8} {2,8,2,9} {2,8,2,2} {2,8,2,6} {2,8,2,7} {2,8,2,3} {2,8,2,0} {2,8,2,4} {2,8,2,1} {2,8,2,8} {2,8,6,9} {2,8,6,2} {2,8,6,6} {2,8,6,7} {2,8,6,3} {2,8,6,0} {2,8,6,4} {2,8,6,1} {2,8,6,8} {2,8,7,9} {2,8,7,2} {2,8,7,6} {2,8,7,7} {2,8,7,3} {2,8,7,0} {2,8,7,4} {2,8,7,1} {2,8,7,8} {2,8,3,9} {2,8,3,2} {2,8,3,6} {2,8,3,7} {2,8,3,3} {2,8,3,0} {2,8,3,4} {2,8,3,1} {2,8,3,8} {2,8,0,9} {2,8,0,2} {2,8,0,6} {2,8,0,7} {2,8,0,3} {2,8,0,0} {2,8,0,4} {2,8,0,1} {2,8,0,8} {2,8,4,9} {2,8,4,2} {2,8,4,6} {2,8,4,7} {2,8,4,3} {2,8,4,0} {2,8,4,4} {2,8,4,1} {2,8,4,8} {2,8,1,9} {2,8,1,2} {2,8,1,6} {2,8,1,7} {2,8,1,3} {2,8,1,0} {2,8,1,4} {2,8,1,1} {2,8,1,8} {2,8,8,9} {2,8,8,2} {2,8,8,6} {2,8,8,7} {2,8,8,3} {2,8,8,0} {2,8,8,4} {2,8,8,1} {2,8,8,8} {6,9,9,9} {6,9,9,2} {6,9,9,6} {6,9,9,7} {6,9,9,3} {6,9,9,0} {6,9,9,4} {6,9,9,1} {6,9,9,8} {6,9,2,9} {6,9,2,2} {6,9,2,6} {6,9,2,7} {6,9,2,3} {6,9,2,0} {6,9,2,4} {6,9,2,1} {6,9,2,8} {6,9,6,9} {6,9,6,2} {6,9,6,6} {6,9,6,7} {6,9,6,3} {6,9,6,0} {6,9,6,4} {6,9,6,1} {6,9,6,8} {6,9,7,9} {6,9,7,2} {6,9,7,6} {6,9,7,7} {6,9,7,3} {6,9,7,0} {6,9,7,4} {6,9,7,1} {6,9,7,8} {6,9,3,9} {6,9,3,2} {6,9,3,6} {6,9,3,7} {6,9,3,3} {6,9,3,0} {6,9,3,4} {6,9,3,1} {6,9,3,8} {6,9,0,9} {6,9,0,2} {6,9,0,6} {6,9,0,7} {6,9,0,3} {6,9,0,0} {6,9,0,4} {6,9,0,1} {6,9,0,8} {6,9,4,9} {6,9,4,2} {6,9,4,6} {6,9,4,7} {6,9,4,3} {6,9,4,0} {6,9,4,4} {6,9,4,1} {6,9,4,8} {6,9,1,9} {6,9,1,2} {6,9,1,6} {6,9,1,7} {6,9,1,3} {6,9,1,0} {6,9,1,4} {6,9,1,1} {6,9,1,8} {6,9,8,9} {6,9,8,2} {6,9,8,6} {6,9,8,7} {6,9,8,3} {6,9,8,0} {6,9,8,4} {6,9,8,1} {6,9,8,8} {6,2,9,9} {6,2,9,2} {6,2,9,6} {6,2,9,7} {6,2,9,3} {6,2,9,0} {6,2,9,4} {6,2,9,1} {6,2,9,8} {6,2,2,9} {6,2,2,2} {6,2,2,6} {6,2,2,7} {6,2,2,3} {6,2,2,0} {6,2,2,4} {6,2,2,1} {6,2,2,8} {6,2,6,9} {6,2,6,2} {6,2,6,6} {6,2,6,7} {6,2,6,3} {6,2,6,0} {6,2,6,4} {6,2,6,1} {6,2,6,8} {6,2,7,9} {6,2,7,2} {6,2,7,6} {6,2,7,7} {6,2,7,3} {6,2,7,0} {6,2,7,4} {6,2,7,1} {6,2,7,8} {6,2,3,9} {6,2,3,2} {6,2,3,6} {6,2,3,7} {6,2,3,3} {6,2,3,0} {6,2,3,4} {6,2,3,1} {6,2,3,8} {6,2,0,9} {6,2,0,2} {6,2,0,6} {6,2,0,7} {6,2,0,3} {6,2,0,0} {6,2,0,4} {6,2,0,1} {6,2,0,8} {6,2,4,9} {6,2,4,2} {6,2,4,6} {6,2,4,7} {6,2,4,3} {6,2,4,0} {6,2,4,4} {6,2,4,1} {6,2,4,8} {6,2,1,9} {6,2,1,2} {6,2,1,6} {6,2,1,7} {6,2,1,3} {6,2,1,0} {6,2,1,4} {6,2,1,1} {6,2,1,8} {6,2,8,9} {6,2,8,2} {6,2,8,6} {6,2,8,7} {6,2,8,3} {6,2,8,0} {6,2,8,4} {6,2,8,1} {6,2,8,8} {6,6,9,9} {6,6,9,2} {6,6,9,6} {6,6,9,7} {6,6,9,3} {6,6,9,0} {6,6,9,4} {6,6,9,1} {6,6,9,8} {6,6,2,9} {6,6,2,2} {6,6,2,6} {6,6,2,7} {6,6,2,3} {6,6,2,0} {6,6,2,4} {6,6,2,1} {6,6,2,8} {6,6,6,9} {6,6,6,2} {6,6,6,6} {6,6,6,7} {6,6,6,3} {6,6,6,0} {6,6,6,4} {6,6,6,1} {6,6,6,8} {6,6,7,9} {6,6,7,2} {6,6,7,6} {6,6,7,7} {6,6,7,3} {6,6,7,0} {6,6,7,4} {6,6,7,1} {6,6,7,8} {6,6,3,9} {6,6,3,2} {6,6,3,6} {6,6,3,7} {6,6,3,3} {6,6,3,0} {6,6,3,4} {6,6,3,1} {6,6,3,8} {6,6,0,9} {6,6,0,2} {6,6,0,6} {6,6,0,7} {6,6,0,3} {6,6,0,0} {6,6,0,4} {6,6,0,1} {6,6,0,8} {6,6,4,9} {6,6,4,2} {6,6,4,6} {6,6,4,7} {6,6,4,3} {6,6,4,0} {6,6,4,4} {6,6,4,1} {6,6,4,8} {6,6,1,9} {6,6,1,2} {6,6,1,6} {6,6,1,7} {6,6,1,3} {6,6,1,0} {6,6,1,4} {6,6,1,1} {6,6,1,8} {6,6,8,9} {6,6,8,2} {6,6,8,6} {6,6,8,7} {6,6,8,3} {6,6,8,0} {6,6,8,4} {6,6,8,1} {6,6,8,8} {6,7,9,9} {6,7,9,2} {6,7,9,6} {6,7,9,7} {6,7,9,3} {6,7,9,0} {6,7,9,4} {6,7,9,1} {6,7,9,8} {6,7,2,9} {6,7,2,2} {6,7,2,6} {6,7,2,7} {6,7,2,3} {6,7,2,0} {6,7,2,4} {6,7,2,1} {6,7,2,8} {6,7,6,9} {6,7,6,2} {6,7,6,6} {6,7,6,7} {6,7,6,3} {6,7,6,0} {6,7,6,4} {6,7,6,1} {6,7,6,8} {6,7,7,9} {6,7,7,2} {6,7,7,6} {6,7,7,7} {6,7,7,3} {6,7,7,0} {6,7,7,4} {6,7,7,1} {6,7,7,8} {6,7,3,9} {6,7,3,2} {6,7,3,6} {6,7,3,7} {6,7,3,3} {6,7,3,0} {6,7,3,4} {6,7,3,1} {6,7,3,8} {6,7,0,9} {6,7,0,2} {6,7,0,6} {6,7,0,7} {6,7,0,3} {6,7,0,0} {6,7,0,4} {6,7,0,1} {6,7,0,8} {6,7,4,9} {6,7,4,2} {6,7,4,6} {6,7,4,7} {6,7,4,3} {6,7,4,0} {6,7,4,4} {6,7,4,1} {6,7,4,8} {6,7,1,9} {6,7,1,2} {6,7,1,6} {6,7,1,7} {6,7,1,3} {6,7,1,0} {6,7,1,4} {6,7,1,1} {6,7,1,8} {6,7,8,9} {6,7,8,2} {6,7,8,6} {6,7,8,7} {6,7,8,3} {6,7,8,0} {6,7,8,4} {6,7,8,1} {6,7,8,8} {6,3,9,9} {6,3,9,2} {6,3,9,6} {6,3,9,7} {6,3,9,3} {6,3,9,0} {6,3,9,4} {6,3,9,1} {6,3,9,8} {6,3,2,9} {6,3,2,2} {6,3,2,6} {6,3,2,7} {6,3,2,3} {6,3,2,0} {6,3,2,4} {6,3,2,1} {6,3,2,8} {6,3,6,9} {6,3,6,2} {6,3,6,6} {6,3,6,7} {6,3,6,3} {6,3,6,0} {6,3,6,4} {6,3,6,1} {6,3,6,8} {6,3,7,9} {6,3,7,2} {6,3,7,6} {6,3,7,7} {6,3,7,3} {6,3,7,0} {6,3,7,4} {6,3,7,1} {6,3,7,8} {6,3,3,9} {6,3,3,2} {6,3,3,6} {6,3,3,7} {6,3,3,3} {6,3,3,0} {6,3,3,4} {6,3,3,1} {6,3,3,8} {6,3,0,9} {6,3,0,2} {6,3,0,6} {6,3,0,7} {6,3,0,3} {6,3,0,0} {6,3,0,4} {6,3,0,1} {6,3,0,8} {6,3,4,9} {6,3,4,2} {6,3,4,6} {6,3,4,7} {6,3,4,3} {6,3,4,0} {6,3,4,4} {6,3,4,1} {6,3,4,8} {6,3,1,9} {6,3,1,2} {6,3,1,6} {6,3,1,7} {6,3,1,3} {6,3,1,0} {6,3,1,4} {6,3,1,1} {6,3,1,8} {6,3,8,9} {6,3,8,2} {6,3,8,6} {6,3,8,7} {6,3,8,3} {6,3,8,0} {6,3,8,4} {6,3,8,1} {6,3,8,8} {6,0,9,9} {6,0,9,2} {6,0,9,6} {6,0,9,7} {6,0,9,3} {6,0,9,0} {6,0,9,4} {6,0,9,1} {6,0,9,8} {6,0,2,9} {6,0,2,2} {6,0,2,6} {6,0,2,7} {6,0,2,3} {6,0,2,0} {6,0,2,4} {6,0,2,1} {6,0,2,8} {6,0,6,9} {6,0,6,2} {6,0,6,6} {6,0,6,7} {6,0,6,3} {6,0,6,0} {6,0,6,4} {6,0,6,1} {6,0,6,8} {6,0,7,9} {6,0,7,2} {6,0,7,6} {6,0,7,7} {6,0,7,3} {6,0,7,0} {6,0,7,4} {6,0,7,1} {6,0,7,8} {6,0,3,9} {6,0,3,2} {6,0,3,6} {6,0,3,7} {6,0,3,3} {6,0,3,0} {6,0,3,4} {6,0,3,1} {6,0,3,8} {6,0,0,9} {6,0,0,2} {6,0,0,6} {6,0,0,7} {6,0,0,3} {6,0,0,0} {6,0,0,4} {6,0,0,1} {6,0,0,8} {6,0,4,9} {6,0,4,2} {6,0,4,6} {6,0,4,7} {6,0,4,3} {6,0,4,0} {6,0,4,4} {6,0,4,1} {6,0,4,8} {6,0,1,9} {6,0,1,2} {6,0,1,6} {6,0,1,7} {6,0,1,3} {6,0,1,0} {6,0,1,4} {6,0,1,1} {6,0,1,8} {6,0,8,9} {6,0,8,2} {6,0,8,6} {6,0,8,7} {6,0,8,3} {6,0,8,0} {6,0,8,4} {6,0,8,1} {6,0,8,8} {6,4,9,9} {6,4,9,2} {6,4,9,6} {6,4,9,7} {6,4,9,3} {6,4,9,0} {6,4,9,4} {6,4,9,1} {6,4,9,8} {6,4,2,9} {6,4,2,2} {6,4,2,6} {6,4,2,7} {6,4,2,3} {6,4,2,0} {6,4,2,4} {6,4,2,1} {6,4,2,8} {6,4,6,9} {6,4,6,2} {6,4,6,6} {6,4,6,7} {6,4,6,3} {6,4,6,0} {6,4,6,4} {6,4,6,1} {6,4,6,8} {6,4,7,9} {6,4,7,2} {6,4,7,6} {6,4,7,7} {6,4,7,3} {6,4,7,0} {6,4,7,4} {6,4,7,1} {6,4,7,8} {6,4,3,9} {6,4,3,2} {6,4,3,6} {6,4,3,7} {6,4,3,3} {6,4,3,0} {6,4,3,4} {6,4,3,1} {6,4,3,8} {6,4,0,9} {6,4,0,2} {6,4,0,6} {6,4,0,7} {6,4,0,3} {6,4,0,0} {6,4,0,4} {6,4,0,1} {6,4,0,8} {6,4,4,9} {6,4,4,2} {6,4,4,6} {6,4,4,7} {6,4,4,3} {6,4,4,0} {6,4,4,4} {6,4,4,1} {6,4,4,8} {6,4,1,9} {6,4,1,2} {6,4,1,6} {6,4,1,7} {6,4,1,3} {6,4,1,0} {6,4,1,4} {6,4,1,1} {6,4,1,8} {6,4,8,9} {6,4,8,2} {6,4,8,6} {6,4,8,7} {6,4,8,3} {6,4,8,0} {6,4,8,4} {6,4,8,1} {6,4,8,8} {6,1,9,9} {6,1,9,2} {6,1,9,6} {6,1,9,7} {6,1,9,3} {6,1,9,0} {6,1,9,4} {6,1,9,1} {6,1,9,8} {6,1,2,9} {6,1,2,2} {6,1,2,6} {6,1,2,7} {6,1,2,3} {6,1,2,0} {6,1,2,4} {6,1,2,1} {6,1,2,8} {6,1,6,9} {6,1,6,2} {6,1,6,6} {6,1,6,7} {6,1,6,3} {6,1,6,0} {6,1,6,4} {6,1,6,1} {6,1,6,8} {6,1,7,9} {6,1,7,2} {6,1,7,6} {6,1,7,7} {6,1,7,3} {6,1,7,0} {6,1,7,4} {6,1,7,1} {6,1,7,8} {6,1,3,9} {6,1,3,2} {6,1,3,6} {6,1,3,7} {6,1,3,3} {6,1,3,0} {6,1,3,4} {6,1,3,1} {6,1,3,8} {6,1,0,9} {6,1,0,2} {6,1,0,6} {6,1,0,7} {6,1,0,3} {6,1,0,0} {6,1,0,4} {6,1,0,1} {6,1,0,8} {6,1,4,9} {6,1,4,2} {6,1,4,6} {6,1,4,7} {6,1,4,3} {6,1,4,0} {6,1,4,4} {6,1,4,1} {6,1,4,8} {6,1,1,9} {6,1,1,2} {6,1,1,6} {6,1,1,7} {6,1,1,3} {6,1,1,0} {6,1,1,4} {6,1,1,1} {6,1,1,8} {6,1,8,9} {6,1,8,2} {6,1,8,6} {6,1,8,7} {6,1,8,3} {6,1,8,0} {6,1,8,4} {6,1,8,1} {6,1,8,8} {6,8,9,9} {6,8,9,2} {6,8,9,6} {6,8,9,7} {6,8,9,3} {6,8,9,0} {6,8,9,4} {6,8,9,1} {6,8,9,8} {6,8,2,9} {6,8,2,2} {6,8,2,6} {6,8,2,7} {6,8,2,3} {6,8,2,0} {6,8,2,4} {6,8,2,1} {6,8,2,8} {6,8,6,9} {6,8,6,2} {6,8,6,6} {6,8,6,7} {6,8,6,3} {6,8,6,0} {6,8,6,4} {6,8,6,1} {6,8,6,8} {6,8,7,9} {6,8,7,2} {6,8,7,6} {6,8,7,7} {6,8,7,3} {6,8,7,0} {6,8,7,4} {6,8,7,1} {6,8,7,8} {6,8,3,9} {6,8,3,2} {6,8,3,6} {6,8,3,7} {6,8,3,3} {6,8,3,0} {6,8,3,4} {6,8,3,1} {6,8,3,8} {6,8,0,9} {6,8,0,2} {6,8,0,6} {6,8,0,7} {6,8,0,3} {6,8,0,0} {6,8,0,4} {6,8,0,1} {6,8,0,8} {6,8,4,9} {6,8,4,2} {6,8,4,6} {6,8,4,7} {6,8,4,3} {6,8,4,0} {6,8,4,4} {6,8,4,1} {6,8,4,8} {6,8,1,9} {6,8,1,2} {6,8,1,6} {6,8,1,7} {6,8,1,3} {6,8,1,0} {6,8,1,4} {6,8,1,1} {6,8,1,8} {6,8,8,9} {6,8,8,2} {6,8,8,6} {6,8,8,7} {6,8,8,3} {6,8,8,0} {6,8,8,4} {6,8,8,1} {6,8,8,8} {7,9,9,9} {7,9,9,2} {7,9,9,6} {7,9,9,7} {7,9,9,3} {7,9,9,0} {7,9,9,4} {7,9,9,1} {7,9,9,8} {7,9,2,9} {7,9,2,2} {7,9,2,6} {7,9,2,7} {7,9,2,3} {7,9,2,0} {7,9,2,4} {7,9,2,1} {7,9,2,8} {7,9,6,9} {7,9,6,2} {7,9,6,6} {7,9,6,7} {7,9,6,3} {7,9,6,0} {7,9,6,4} {7,9,6,1} {7,9,6,8} {7,9,7,9} {7,9,7,2} {7,9,7,6} {7,9,7,7} {7,9,7,3} {7,9,7,0} {7,9,7,4} {7,9,7,1} {7,9,7,8} {7,9,3,9} {7,9,3,2} {7,9,3,6} {7,9,3,7} {7,9,3,3} {7,9,3,0} {7,9,3,4} {7,9,3,1} {7,9,3,8} {7,9,0,9} {7,9,0,2} {7,9,0,6} {7,9,0,7} {7,9,0,3} {7,9,0,0} {7,9,0,4} {7,9,0,1} {7,9,0,8} {7,9,4,9} {7,9,4,2} {7,9,4,6} {7,9,4,7} {7,9,4,3} {7,9,4,0} {7,9,4,4} {7,9,4,1} {7,9,4,8} {7,9,1,9} {7,9,1,2} {7,9,1,6} {7,9,1,7} {7,9,1,3} {7,9,1,0} {7,9,1,4} {7,9,1,1} {7,9,1,8} {7,9,8,9} {7,9,8,2} {7,9,8,6} {7,9,8,7} {7,9,8,3} {7,9,8,0} {7,9,8,4} {7,9,8,1} {7,9,8,8} {7,2,9,9} {7,2,9,2} {7,2,9,6} {7,2,9,7} {7,2,9,3} {7,2,9,0} {7,2,9,4} {7,2,9,1} {7,2,9,8} {7,2,2,9} {7,2,2,2} {7,2,2,6} {7,2,2,7} {7,2,2,3} {7,2,2,0} {7,2,2,4} {7,2,2,1} {7,2,2,8} {7,2,6,9} {7,2,6,2} {7,2,6,6} {7,2,6,7} {7,2,6,3} {7,2,6,0} {7,2,6,4} {7,2,6,1} {7,2,6,8} {7,2,7,9} {7,2,7,2} {7,2,7,6} {7,2,7,7} {7,2,7,3} {7,2,7,0} {7,2,7,4} {7,2,7,1} {7,2,7,8} {7,2,3,9} {7,2,3,2} {7,2,3,6} {7,2,3,7} {7,2,3,3} {7,2,3,0} {7,2,3,4} {7,2,3,1} {7,2,3,8} {7,2,0,9} {7,2,0,2} {7,2,0,6} {7,2,0,7} {7,2,0,3} {7,2,0,0} {7,2,0,4} {7,2,0,1} {7,2,0,8} {7,2,4,9} {7,2,4,2} {7,2,4,6} {7,2,4,7} {7,2,4,3} {7,2,4,0} {7,2,4,4} {7,2,4,1} {7,2,4,8} {7,2,1,9} {7,2,1,2} {7,2,1,6} {7,2,1,7} {7,2,1,3} {7,2,1,0} {7,2,1,4} {7,2,1,1} {7,2,1,8} {7,2,8,9} {7,2,8,2} {7,2,8,6} {7,2,8,7} {7,2,8,3} {7,2,8,0} {7,2,8,4} {7,2,8,1} {7,2,8,8} {7,6,9,9} {7,6,9,2} {7,6,9,6} {7,6,9,7} {7,6,9,3} {7,6,9,0} {7,6,9,4} {7,6,9,1} {7,6,9,8} {7,6,2,9} {7,6,2,2} {7,6,2,6} {7,6,2,7} {7,6,2,3} {7,6,2,0} {7,6,2,4} {7,6,2,1} {7,6,2,8} {7,6,6,9} {7,6,6,2} {7,6,6,6} {7,6,6,7} {7,6,6,3} {7,6,6,0} {7,6,6,4} {7,6,6,1} {7,6,6,8} {7,6,7,9} {7,6,7,2} {7,6,7,6} {7,6,7,7} {7,6,7,3} {7,6,7,0} {7,6,7,4} {7,6,7,1} {7,6,7,8} {7,6,3,9} {7,6,3,2} {7,6,3,6} {7,6,3,7} {7,6,3,3} {7,6,3,0} {7,6,3,4} {7,6,3,1} {7,6,3,8} {7,6,0,9} {7,6,0,2} {7,6,0,6} {7,6,0,7} {7,6,0,3} {7,6,0,0} {7,6,0,4} {7,6,0,1} {7,6,0,8} {7,6,4,9} {7,6,4,2} {7,6,4,6} {7,6,4,7} {7,6,4,3} {7,6,4,0} {7,6,4,4} {7,6,4,1} {7,6,4,8} {7,6,1,9} {7,6,1,2} {7,6,1,6} {7,6,1,7} {7,6,1,3} {7,6,1,0} {7,6,1,4} {7,6,1,1} {7,6,1,8} {7,6,8,9} {7,6,8,2} {7,6,8,6} {7,6,8,7} {7,6,8,3} {7,6,8,0} {7,6,8,4} {7,6,8,1} {7,6,8,8} {7,7,9,9} {7,7,9,2} {7,7,9,6} {7,7,9,7} {7,7,9,3} {7,7,9,0} {7,7,9,4} {7,7,9,1} {7,7,9,8} {7,7,2,9} {7,7,2,2} {7,7,2,6} {7,7,2,7} {7,7,2,3} {7,7,2,0} {7,7,2,4} {7,7,2,1} {7,7,2,8} {7,7,6,9} {7,7,6,2} {7,7,6,6} {7,7,6,7} {7,7,6,3} {7,7,6,0} {7,7,6,4} {7,7,6,1} {7,7,6,8} {7,7,7,9} {7,7,7,2} {7,7,7,6} {7,7,7,7} {7,7,7,3} {7,7,7,0} {7,7,7,4} {7,7,7,1} {7,7,7,8} {7,7,3,9} {7,7,3,2} {7,7,3,6} {7,7,3,7} {7,7,3,3} {7,7,3,0} {7,7,3,4} {7,7,3,1} {7,7,3,8} {7,7,0,9} {7,7,0,2} {7,7,0,6} {7,7,0,7} {7,7,0,3} {7,7,0,0} {7,7,0,4} {7,7,0,1} {7,7,0,8} {7,7,4,9} {7,7,4,2} {7,7,4,6} {7,7,4,7} {7,7,4,3} {7,7,4,0} {7,7,4,4} {7,7,4,1} {7,7,4,8} {7,7,1,9} {7,7,1,2} {7,7,1,6} {7,7,1,7} {7,7,1,3} {7,7,1,0} {7,7,1,4} {7,7,1,1} {7,7,1,8} {7,7,8,9} {7,7,8,2} {7,7,8,6} {7,7,8,7} {7,7,8,3} {7,7,8,0} {7,7,8,4} {7,7,8,1} {7,7,8,8} {7,3,9,9} {7,3,9,2} {7,3,9,6} {7,3,9,7} {7,3,9,3} {7,3,9,0} {7,3,9,4} {7,3,9,1} {7,3,9,8} {7,3,2,9} {7,3,2,2} {7,3,2,6} {7,3,2,7} {7,3,2,3} {7,3,2,0} {7,3,2,4} {7,3,2,1} {7,3,2,8} {7,3,6,9} {7,3,6,2} {7,3,6,6} {7,3,6,7} {7,3,6,3} {7,3,6,0} {7,3,6,4} {7,3,6,1} {7,3,6,8} {7,3,7,9} {7,3,7,2} {7,3,7,6} {7,3,7,7} {7,3,7,3} {7,3,7,0} {7,3,7,4} {7,3,7,1} {7,3,7,8} {7,3,3,9} {7,3,3,2} {7,3,3,6} {7,3,3,7} {7,3,3,3} {7,3,3,0} {7,3,3,4} {7,3,3,1} {7,3,3,8} {7,3,0,9} {7,3,0,2} {7,3,0,6} {7,3,0,7} {7,3,0,3} {7,3,0,0} {7,3,0,4} {7,3,0,1} {7,3,0,8} {7,3,4,9} {7,3,4,2} {7,3,4,6} {7,3,4,7} {7,3,4,3} {7,3,4,0} {7,3,4,4} {7,3,4,1} {7,3,4,8} {7,3,1,9} {7,3,1,2} {7,3,1,6} {7,3,1,7} {7,3,1,3} {7,3,1,0} {7,3,1,4} {7,3,1,1} {7,3,1,8} {7,3,8,9} {7,3,8,2} {7,3,8,6} {7,3,8,7} {7,3,8,3} {7,3,8,0} {7,3,8,4} {7,3,8,1} {7,3,8,8} {7,0,9,9} {7,0,9,2} {7,0,9,6} {7,0,9,7} {7,0,9,3} {7,0,9,0} {7,0,9,4} {7,0,9,1} {7,0,9,8} {7,0,2,9} {7,0,2,2} {7,0,2,6} {7,0,2,7} {7,0,2,3} {7,0,2,0} {7,0,2,4} {7,0,2,1} {7,0,2,8} {7,0,6,9} {7,0,6,2} {7,0,6,6} {7,0,6,7} {7,0,6,3} {7,0,6,0} {7,0,6,4} {7,0,6,1} {7,0,6,8} {7,0,7,9} {7,0,7,2} {7,0,7,6} {7,0,7,7} {7,0,7,3} {7,0,7,0} {7,0,7,4} {7,0,7,1} {7,0,7,8} {7,0,3,9} {7,0,3,2} {7,0,3,6} {7,0,3,7} {7,0,3,3} {7,0,3,0} {7,0,3,4} {7,0,3,1} {7,0,3,8} {7,0,0,9} {7,0,0,2} {7,0,0,6} {7,0,0,7} {7,0,0,3} {7,0,0,0} {7,0,0,4} {7,0,0,1} {7,0,0,8} {7,0,4,9} {7,0,4,2} {7,0,4,6} {7,0,4,7} {7,0,4,3} {7,0,4,0} {7,0,4,4} {7,0,4,1} {7,0,4,8} {7,0,1,9} {7,0,1,2} {7,0,1,6} {7,0,1,7} {7,0,1,3} {7,0,1,0} {7,0,1,4} {7,0,1,1} {7,0,1,8} {7,0,8,9} {7,0,8,2} {7,0,8,6} {7,0,8,7} {7,0,8,3} {7,0,8,0} {7,0,8,4} {7,0,8,1} {7,0,8,8} {7,4,9,9} {7,4,9,2} {7,4,9,6} {7,4,9,7} {7,4,9,3} {7,4,9,0} {7,4,9,4} {7,4,9,1} {7,4,9,8} {7,4,2,9} {7,4,2,2} {7,4,2,6} {7,4,2,7} {7,4,2,3} {7,4,2,0} {7,4,2,4} {7,4,2,1} {7,4,2,8} {7,4,6,9} {7,4,6,2} {7,4,6,6} {7,4,6,7} {7,4,6,3} {7,4,6,0} {7,4,6,4} {7,4,6,1} {7,4,6,8} {7,4,7,9} {7,4,7,2} {7,4,7,6} {7,4,7,7} {7,4,7,3} {7,4,7,0} {7,4,7,4} {7,4,7,1} {7,4,7,8} {7,4,3,9} {7,4,3,2} {7,4,3,6} {7,4,3,7} {7,4,3,3} {7,4,3,0} {7,4,3,4} {7,4,3,1} {7,4,3,8} {7,4,0,9} {7,4,0,2} {7,4,0,6} {7,4,0,7} {7,4,0,3} {7,4,0,0} {7,4,0,4} {7,4,0,1} {7,4,0,8} {7,4,4,9} {7,4,4,2} {7,4,4,6} {7,4,4,7} {7,4,4,3} {7,4,4,0} {7,4,4,4} {7,4,4,1} {7,4,4,8} {7,4,1,9} {7,4,1,2} {7,4,1,6} {7,4,1,7} {7,4,1,3} {7,4,1,0} {7,4,1,4} {7,4,1,1} {7,4,1,8} {7,4,8,9} {7,4,8,2} {7,4,8,6} {7,4,8,7} {7,4,8,3} {7,4,8,0} {7,4,8,4} {7,4,8,1} {7,4,8,8} {7,1,9,9} {7,1,9,2} {7,1,9,6} {7,1,9,7} {7,1,9,3} {7,1,9,0} {7,1,9,4} {7,1,9,1} {7,1,9,8} {7,1,2,9} {7,1,2,2} {7,1,2,6} {7,1,2,7} {7,1,2,3} {7,1,2,0} {7,1,2,4} {7,1,2,1} {7,1,2,8} {7,1,6,9} {7,1,6,2} {7,1,6,6} {7,1,6,7} {7,1,6,3} {7,1,6,0} {7,1,6,4} {7,1,6,1} {7,1,6,8} {7,1,7,9} {7,1,7,2} {7,1,7,6} {7,1,7,7} {7,1,7,3} {7,1,7,0} {7,1,7,4} {7,1,7,1} {7,1,7,8} {7,1,3,9} {7,1,3,2} {7,1,3,6} {7,1,3,7} {7,1,3,3} {7,1,3,0} {7,1,3,4} {7,1,3,1} {7,1,3,8} {7,1,0,9} {7,1,0,2} {7,1,0,6} {7,1,0,7} {7,1,0,3} {7,1,0,0} {7,1,0,4} {7,1,0,1} {7,1,0,8} {7,1,4,9} {7,1,4,2} {7,1,4,6} {7,1,4,7} {7,1,4,3} {7,1,4,0} {7,1,4,4} {7,1,4,1} {7,1,4,8} {7,1,1,9} {7,1,1,2} {7,1,1,6} {7,1,1,7} {7,1,1,3} {7,1,1,0} {7,1,1,4} {7,1,1,1} {7,1,1,8} {7,1,8,9} {7,1,8,2} {7,1,8,6} {7,1,8,7} {7,1,8,3} {7,1,8,0} {7,1,8,4} {7,1,8,1} {7,1,8,8} {7,8,9,9} {7,8,9,2} {7,8,9,6} {7,8,9,7} {7,8,9,3} {7,8,9,0} {7,8,9,4} {7,8,9,1} {7,8,9,8} {7,8,2,9} {7,8,2,2} {7,8,2,6} {7,8,2,7} {7,8,2,3} {7,8,2,0} {7,8,2,4} {7,8,2,1} {7,8,2,8} {7,8,6,9} {7,8,6,2} {7,8,6,6} {7,8,6,7} {7,8,6,3} {7,8,6,0} {7,8,6,4} {7,8,6,1} {7,8,6,8} {7,8,7,9} {7,8,7,2} {7,8,7,6} {7,8,7,7} {7,8,7,3} {7,8,7,0} {7,8,7,4} {7,8,7,1} {7,8,7,8} {7,8,3,9} {7,8,3,2} {7,8,3,6} {7,8,3,7} {7,8,3,3} {7,8,3,0} {7,8,3,4} {7,8,3,1} {7,8,3,8} {7,8,0,9} {7,8,0,2} {7,8,0,6} {7,8,0,7} {7,8,0,3} {7,8,0,0} {7,8,0,4} {7,8,0,1} {7,8,0,8} {7,8,4,9} {7,8,4,2} {7,8,4,6} {7,8,4,7} {7,8,4,3} {7,8,4,0} {7,8,4,4} {7,8,4,1} {7,8,4,8} {7,8,1,9} {7,8,1,2} {7,8,1,6} {7,8,1,7} {7,8,1,3} {7,8,1,0} {7,8,1,4} {7,8,1,1} {7,8,1,8} {7,8,8,9} {7,8,8,2 straight} {7,8,8,6} {7,8,8,7} {7,8,8,3},8,8,0} {7,8,8,4} {7,8,8,1} {7,8,8,8}Reduced quads had approx 2928 lines which is not good with 8 exact hits for 30 draws. It was done to illustrate the progression of early digits of the sequence, this information is huge filter.
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Quote: Originally posted by adobea78 on Mar 4, 2018
PA-2 Eve
68-62-61-69-49-94
FL-2 Eve
03-30-01-10-73-37-71-17
Ontario85-58-86-68-89-98-56-65-59-
FL> 01
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Quote: Originally posted by adobea78 on Mar 3, 2018
The use of the word 'generate' is not free from restraint, is guided /influence by matrix and regulations of the game. For start, lets delve into the matrix and regulations, the matrix is 3/10 with digit replacement. What's your take on this statement 'the matrix is 3/10 with digit replacement'. Lets go further with regulation that states that 'each event/draw(set) starts with fixed combination', 100 sets for P2, what's your take on this statement 'each event/draw(set) starts with fixed combination'?.
Lets picture the draw process mechanically, you have two machines, each with 10 balls spinning, do you think the two digits 3 and 3 are related for outcome event 33? Lets just use one machine and apply the rule of 'digit replacement, meaning, when the first digit is drawn, it goes back to the machine (10 balls is constant) for the next. What is the inference here? The draws/event/ spinning is very very independent, preceding event has no bearing whatsoever on subsequent event ! . Are the digits related? obviously not, the digits are reference points for transitions within a generated string/pattern/base, you may assume the digit 3 and 3 been identical are the same forgetting the TIME factor !.
So how do you generate strings based on the matrix and game regulation:
- Find a good Random generator (Random.org is perfect)
- Your low and limit parameters, P 2 ( low 0, Limit 9)
- set max combo for game matrix 2/10 is 100
Points 2 and 3 is your assumption for ensuing structure of string/pattern/base, so lets start with P2.
A. Points 1,2,3 will give different shapes/structure of digit transitions, so run the generator 2 times (two different machines or digit with replacement is the rule.
B. Observe the first two digits of each string
C. Take the current draw digits , observe how they fit into each string.
I want you to step back and forget the draw digit history, I want you to focus only on digits!
For matrix like 5/39, set up is low 1, limit 39 and matrix combo 575757(is draw without replacement)
P4> Using the 3 pointers based on the premise of the game, lets do few predictions for eve draws.
Time frame: 10 draws> cost$ 140.
ARK>
0132-0135-0362-0365-0162-0165-01367345-7341-7425-7421-7325-7321-7342
CAL>0812-0816-0132-0136-0832-0836-0813
9346-9348-9426-9428-9326-9328-9342
CT>8139-8135-8369-8365-8169-8165-8136
9735-9734-9325-9324-9725-9724-9732
FL>0139-0134-0369-0364-0169-0164-0136
9730-9738-9340-9348-9740-9748-9734
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Quote: Originally posted by adobea78 on Mar 13, 2018
P4> Using the 3 pointers based on the premise of the game, lets do few predictions for eve draws.
Time frame: 10 draws> cost$ 140.
ARK>
0132-0135-0362-0365-0162-0165-01367345-7341-7425-7421-7325-7321-7342
CAL>0812-0816-0132-0136-0832-0836-0813
9346-9348-9426-9428-9326-9328-9342
CT>8139-8135-8369-8365-8169-8165-8136
9735-9734-9325-9324-9725-9724-9732
FL>0139-0134-0369-0364-0169-0164-0136
9730-9738-9340-9348-9740-9748-9734
P4> Using the 3 pointers based on the premise of the game, lets do few predictions for eve draws.
Time frame: 10 draws> cost$ 140.
WI>
8207-8209-8057-8059-8257-8259-8205
7520-7529-7280-7289-7580-7589-7528
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Quote: Originally posted by adobea78 on Mar 13, 2018
P4> Using the 3 pointers based on the premise of the game, lets do few predictions for eve draws.
Time frame: 10 draws> cost$ 140.
WI>
8207-8209-8057-8059-8257-8259-8205
7520-7529-7280-7289-7580-7589-7528
Eve draws
Ky
4237-4239-4387-4389-4287-4289-4238
8367-8369-8627-8629-8327-8329-8362
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Eve draws
LA>
4519-4518-4109-4108-4509-4508-4510
7519-7510-7149-7140-7549-7540-7514
MO>
0463-0469-0653-0659-0453-0459-0465
2503-2509-2043-2049-2543-2549-2504
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Quote: Originally posted by adobea78 on Mar 3, 2018
The use of the word 'generate' is not free from restraint, is guided /influence by matrix and regulations of the game. For start, lets delve into the matrix and regulations, the matrix is 3/10 with digit replacement. What's your take on this statement 'the matrix is 3/10 with digit replacement'. Lets go further with regulation that states that 'each event/draw(set) starts with fixed combination', 100 sets for P2, what's your take on this statement 'each event/draw(set) starts with fixed combination'?.
Lets picture the draw process mechanically, you have two machines, each with 10 balls spinning, do you think the two digits 3 and 3 are related for outcome event 33? Lets just use one machine and apply the rule of 'digit replacement, meaning, when the first digit is drawn, it goes back to the machine (10 balls is constant) for the next. What is the inference here? The draws/event/ spinning is very very independent, preceding event has no bearing whatsoever on subsequent event ! . Are the digits related? obviously not, the digits are reference points for transitions within a generated string/pattern/base, you may assume the digit 3 and 3 been identical are the same forgetting the TIME factor !.
So how do you generate strings based on the matrix and game regulation:
- Find a good Random generator (Random.org is perfect)
- Your low and limit parameters, P 2 ( low 0, Limit 9)
- set max combo for game matrix 2/10 is 100
Points 2 and 3 is your assumption for ensuing structure of string/pattern/base, so lets start with P2.
A. Points 1,2,3 will give different shapes/structure of digit transitions, so run the generator 2 times (two different machines or digit with replacement is the rule.
B. Observe the first two digits of each string
C. Take the current draw digits , observe how they fit into each string.
I want you to step back and forget the draw digit history, I want you to focus only on digits!
For matrix like 5/39, set up is low 1, limit 39 and matrix combo 575757(is draw without replacement)
P3 predictions based on 3 pointers , the premise is the event is random!
Arizona> 427-429-426-437-439-436-423-237-239-236
CT>
396-397-306-307-906-907-390-393-330
Indiana
610-614-690-694-190-194-619-661-669