Advice from professionals. “Universal System” of Guessing Lottery Numbers Complete system 5 out of 36
“Universal System”
Guessing Lottery Numbers
Many people are interested in whether there is a “universal system” for guessing lottery numbers with which one could regularly win?
No, such a system does not exist.
As in any lottery, success is determined by one of the elements of probability theory - the factor of chance. The result of the draw depends entirely on the actions of the lottery machine. By randomly mixing the balls without any human influence, the lottery machine produces such incredible combinations that it is simply impossible to imagine. Sometimes the lottery machine will throw out several numbers in a row, and sometimes, on the contrary, it will scatter numbers across the entire playing field of the ticket. Therefore, winning is possible both in a systemic game and in an unsystematic game.
However, only constant participation in the lottery from draw to draw with a small number of tickets, and not a “universal system” at all, allows you to become the owner of a prize.
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What are the advantages of playing according to a system over playing without a system?
To be sure to guess 6 numbers in the lottery “6 out of 45″, “6 out of 49″ and 5 numbers in the lottery “5 out of 36″, “5 out of 40″ you need to fill in 8,145,060, 13,983,816 and 376,992, 658,008 combinations, respectively, which is almost impossible to do for one lottery participant, or for the whole team. Playing according to the system makes it possible to cover, within reasonable limits, a certain number of combinations made up of a group of numbers.
The system brings the possibility of winning closer: the more numbers covered by the system, the more likely the chance of winning.
And finally, in case of guessing, the system gives a large amount of winnings, since, as a rule, several combinations win.
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How do they play the system?
Let's show this using the example of the “7 numbers - 7 combinations” system for the “6 out of 45”, “6 out of 49” lotteries.
7 numbers in this system are arranged in 7 combinations so that none of them is repeated:
1 combination - 1, 2, 3, 4, 5, 6
2 combination.-1, 2, 3, 4, 5, 7
3 combination - 1, 2, 3, 4, 6, 7
4 combination - 1, 2, 3, 5, 6, 7
5 combination - 1, 2, 4, 5, 6, 7
6 combination - 1, 3, 4, 5, 6, 7
7 combination - 2, 3, 4, 5, 6, 7
From 45 (49) lottery numbers, choose any 7 numbers you like
For example: No. 4, No. 11, No. 21, No. 33, No. 37, No. 40 and No. 45. And substitute their numbers instead of the system numbers:
4, 11, 21, 33, 37, 40
4, 11, 21, 33, 37, 45
4, 11, 21, 33, 40, 45
4, 11, 21, 37, 40, 45
4, 11, 33, 37, 40, 45
4, 21, 33, 37, 40, 45
11, 21, 33, 37, 40, 45
Now let's check: any 6 numbers from numbers the selected 7 numbers are necessarily included among the system combinations.
The advantage of the system is that if you guess 6 numbers, you can win not only for these 6 numbers, but also six wins for 5 numbers. Consequently, not one, but several lottery tickets win at once.
The system “7 numbers - 7 combinations” given in the example is called a complete system, since it contains all possible combinations with the given seven numbers and provides the highest performance - sixes with six numbers guessed. A feature of complete systems is that the winnings of each winning group are precisely determined and calculated using the appropriate formulas.
In addition to complete systems, there are also incomplete or reduced systems. They are compiled on the principle of the possibility of winnings in the lower winning groups (for 3 and 4 numbers for lotteries with a numerical formula of 5 numbers out of n; for 4 and 5 numbers for lotteries with a numerical formula 6 numbers out of n) when guessing a certain number of numbers, and therefore are more economical and require less numbers combinations.
For example, the incomplete system “7 numbers - 5 combinations” for the lottery “6 out of 45″, “6 out of 49″ gives winnings for 4 guessed numbers, but no longer guarantees winnings for 6 numbers, like the complete system “7 numbers - 7 combinations” :
1 combination – 1, 2, 3, 4, 6, 7
2 combination – 1, 2, 3, 5, 6, 7
3 combination - 1, 2, 4, 5, 6, 7
4 combination – 1, 3, 4, 5, 6, 7
5 combination – 2, 3, 4, 5, 6, 7
There are a large number of incomplete systems in all types of lotteries. It is advisable to use them when individually participating in the lottery, since they make it possible to combine a large number of numbers with a small number of combinations.
A type of incomplete systems are systems with hard (constant) numbers. They are made up of a certain number of hard (permanent) numbers. Typically, for such systems, 1, 2 or 3 permanent numbers are taken, since with a larger content of permanent numbers, the efficiency of the system decreases.
For example: the “7 numbers - 4 combinations” system with three constant (hard) numbers looks like this:
1 combination - 1, 2, 3, 4, 5, 6
2 combination - 1, 2, 3, 4, 5, 7
3 combination - 1, 2, 3, 4, 6, 7
4 combination - 1, 2, 3, 5, 6, 7
1. “4+1” system.
Four numbers are crossed out equally in all combinations of the system. The role of the fifth number is alternately played by the remaining thirty-two numbers.
There are a total of 32 combinations in the complete system.
1, 2, 3, 4, 5
1, 2, 3, 4, 6
1, 2, 3, 4, 7
Full system features:
a) if the constant, basic part guesses 2 numbers, the winnings will be: 3 triples;
b) if the constant, basic part guesses 3 numbers, the winnings will be: 2 fours and 30 threes;
c) if the constant, basic part guesses 4 numbers, the winnings will be: 1 five and 31 fours.
2. “3+2” system.
Three numbers are selected and crossed out equally in all combinations. The remaining two numbers change in combinations. To do this, a complete system of pairs is compiled from the remaining 33 numbers.
There are a total of 528 combinations in the complete system.
1. 1, 2, 3, 4, 5
2. 1, 2, 3,4, 6
3. - – - – –
4. - – - – –
527. 1, 2, 3, 34, 36
528. 1, 2, 3, 35, 36
Full system features:
a) if 1 number is guessed with the constant, basic part, the winnings will be: 6 triplets;
b) if the constant, basic part guesses 2 numbers, the winnings will be: 3 fours and 90 threes;
c) if the constant, basic part guesses 3 numbers, the winnings will be: 1 five, 62 fours and 465 threes.
An incomplete system of seventeen combinations makes it possible to use all the additional thirty-three numbers.
To create pairs of numbers, you can use the “Statistics of pairwise number drops” (the most frequently played pairs), where each number corresponds to a pair of numbers.
3. “8+X” system.
The basic part of the system consists of eight permanent numbers. The additional variable number "X" within one single system is also a constant number.
It is assumed that several such systems will be used in one circulation, differing only in the “X” number.
In one system, two winning options are possible.
Option I. The winning numbers are completely included in the eight base numbers. The system will provide:
If 3 numbers are guessed - 1 triple;
With 4 guessed numbers - 4 threes or 1 four;
With 5 numbers guessed - 1 four and 6 threes.
Option II. One of the winning numbers is an additional one, and the rest are part of the eight basic numbers. The system will provide:
With 3 guessed numbers - 3 triplets;
With 4 numbers guessed - 1 four and 6 threes;
With 5 guessed numbers - 4 fours and 6 threes or 1 five and 12 threes.
– 1, 2, 3, 7, X
– 1, 2, 4, 6, X
– 1, 2, 5, 8, X
– 1, 3, 4, 8, X
– 1, 3, 5, 6, X
– 1, 4, 5, 7, X
– 1, 6, 7, 8, X
– 2, 3, 4, 5, X
– 2, 3, 6, 8, X
– 2, 4, 7, 8, X
– 2, 5, 6, 7, X
– 3, 4, 6, 7, X
– 3, 5, 7, 8, X
– 4, 5, 6, 8, X
This system is ideal for playing with increasing bets.
A full bet equal to twenty-eight systems gives winnings:
with two numbers guessed by the base part - 9 triplets;
with three - 2 fours and 38 threes;
with four - from 4 fours and 114 threes to 1 five, 27 fours, and 12 threes;
with five numbers guessed by the base part - 28 fours and 168 threes.
The option of playing with the “8+X” system is allowed, where “X” are arbitrary numbers in all combinations.
SYSTEMS FOR LOTTERY “6 numbers out of N”
1. “5+1” system.
Five numbers are crossed out equally in all combinations of the system. The role of the sixth number is alternately played by the remaining forty numbers.
There are 40 combinations in the complete system.
1, 2, 3, 4, 5, 6
1, 2, 3, 4, 5, 7
1, 2, 3, 4, 5, 8
Full system features:
a) if the constant part guesses 3 numbers: 3 fours and 37 threes;
b) if the constant part guesses 4 numbers: 2 fives and 38 fours;
c) if the constant part guesses 5 numbers: 1 six and 39 fives
2. “4+2″ system.
Four numbers are selected, which are crossed out equally in all combinations of the system. The remaining two numbers change in combinations. To do this, a complete system of pairs is compiled from the remaining 41 numbers.
There are 820 combinations in the complete system.
1. 1, 2, 3, 4, 5, 6
2. 1, 2, 3, 4, 5, 7
3. - – - – –
4. - – - – –
819. 1, 2, 3, 4, 43, 45
820. 1, 2, 3, 4, 44, 45
Full system features:
a) if the constant part guesses 2 numbers, guesses: 6 fours;
b) if the constant part guesses 3 numbers, guesses: 3 fives and 114 fours;
c) if the constant part guesses 4 numbers, guesses: 1 six, 78 fives and 741 fours.
Total: the system allows you to receive one or another win in 44.98% of cases.
3. System “8+X+U”.
The basic part of the system consists of eight permanent numbers. Variable numbers “X” and “Y” within one particular system are also permanent numbers.
It is assumed that several such systems will be used in one circulation, differing only in the numbers “X” and “Y”.
In one system, three winning options are possible.
Option I. The winning numbers were completely included in the eight base numbers. The system provides:
If 4 numbers are guessed - 1 four or no win;
With 5 guessed numbers - 1 four;
With 6 guessed numbers - 3 fours.
Option II. One of the winning numbers is among the additional ones, and the rest are included in the base numbers. The system provides:
With 4 guessed numbers - 1 four;
With 5 guessed numbers - 4 fours or 1 five;
With 6 numbers guessed - 1 five and 6 fours.
Option III. The two winning numbers are additional numbers, and the rest are included in the base numbers. The system provides:
With 4 guessed numbers - 3 fours;
With 5 numbers guessed - 1 five, 6 fours;
With 6 numbers guessed - 4 fives and 6 fours or 1 six and 12 fours.
– 1, 2, 3, 7, X, Y
– 1, 2, 4, 6, X, Y
– 1, 2, 5, 8, X, U
– 1, 3, 4, 8, X, U
– 1, 3, 5, 6, X, Y
– 1, 4, 5, 7, X, U
– 1, 6, 7, 8, X, U
– 2, 3, 4, 5, X, Y
– 2, 3, 6, 8, X, U
– 2, 4, 7, 8, X, U
– 2, 5, 6, 7, X, Y
– 3, 4, 6, 7, X, Y
– 3, 5, 7, 8, X, U
– 4, 5, 6, 8, X, U
This system is ideal for playing with increasing bets. Full bet in “6 out of 45” (Gosloto, etc.); is equal to 666, in “6 out of 49″ - 820, and in “6 out of 56″ - 1176 systems.
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Lotteries of this type are held in many countries around the world, mainly according to the “3 out of 10” formula: in Ukraine - “Loto Troika”, in New Zealand - “Play 3”, in the USA - “Daily 3” (California), “Pick 3” "(Florida), "CA$H 3" (Georgia), etc. Typically, to win these lotteries you must match three numbers from 0 to 9, and depending on the type of game you choose, the sequence may be important. Therefore, we present here one complete system and several incomplete ones for clarity. After substituting the numbers, do not forget to reduce all numbers of the resulting system by 1. In addition, the systems published in this category can serve as the basis for systems with fixed numbers for playing lotto using the formulas 5 out of N, 6 out of N, etc.
Lotteries with 4 numbers are various foreign versions of “Pick 4”, “Play 4”, “Win 4” (mainly USA), conducted according to the “4 out of 10” formula, as well as the recently launched Gosloto lottery “4 out of 20” (Stoloto, Russia). In this category, pay attention to the incomplete systems “4/8/14”, “4/13/13”, “4/16/20” and “4/10/30”, which are the so-called. Steiner systems, i.e. combinations of guaranteed “twos” or “threes” are not repeated in these systems (they occur only once).
Lottery classics - any self-respecting lottery operator has in his arsenal one or another lottery for 5 numbers: “5 out of 35”, “5 out of 36”, “5 out of 45”, “5 out of 50”, etc. Incomplete systems with a guarantee of 2, 3 and 4 from this category are quite compact and economical, and also well balanced. An example of good balance is the systems “5/11/66” and “5/17/68”, “5/21/21” and “5/25/30”, which are Steiner systems.
There are a lot of lotteries with 6 numbers in the version today in the world. The Soviet “Sportloto” also began with a lottery using the formula “6 out of 49”. The lottery formulas “6 out of 42”, “6 out of 45”, “6 out of 52” are also known and widely used. The category of game systems for these number lotteries is quite numerous. You can easily choose the system that suits you for playing lotto, based on the required guarantee and financial capabilities.
Rounding out the classic top three are systems for lotteries with 7 numbers. Lotteries of this type are less popular due to the very low probability of winning a super prize (Jackpot), but are held in some countries, for example: Gosloto “7 out of 49” in Russia. Usually, lottery organizers expand the lottery formula and conduct draws according to the scheme “6 out of 49 + 1”, “6 out of 46 + 1”, etc. Here, as in the categories of lottery systems “5 out of N” and “6 out of N”, there are also mostly incomplete systems with various guarantees.
KENO lotteries have been known since ancient times and are usually held according to the formulas “20 out of 80” or “20 out of 60”. Incomplete systems with guarantees for playing KENO are not always suitable, because... the prize is given for guessing 5 or more numbers, and systems with such guarantees are quite cumbersome and “catch” a lot of 2s, 3s and 4s that do not give a win. In this category you will find other systems, such as magic square systems.
Increases your chances of becoming a lottery winner and makes your bets systematic, thereby allowing you to get several winning options in one draw.
It has proven itself to be an effective means of generating permanent income.
The most positive results are shown in lotteries with a small range of numbers, such as “Gosloto 5 out of 36”. The ability to choose numbers yourself to generate variants (based on the frequency of occurrence or other criteria) is one of the advantages of this online program.
The "Fifteener" generator creates 12 options of 5 numbers each, from any 15 non-repeating numbers in the range of the lottery you have chosen.
It is 5 numbers that is the most popular combination of world lotteries.
Remember! The larger the lottery jackpot, the more difficult it is to guess the winning option. A constant small income is much more profitable than pipe dreams of multimillion-dollar winnings.
Information about lottery systems -
There are two large groups of number systems: complete and incomplete.
They are divided into systems with or without a key number.
Full system (Full wheel) - all possible combinations of numbers specified in the lottery. All combinations that can be made from lottery numbers will be a complete system. This system has a significant drawback - it is very expensive.
With key number- a system in which one or more numbers are repeated in each of the options. It can be either complete or incomplete. Gives great guarantees of winning, provided that the player guesses the key number.
The Steiner system is a mathematical model in which the number of matches (L) is always equal to one. It is interesting from the point of view of combinatorics, but it is not recommended to use such systems in games.
incomplete system(Abbreviated wheel) are several combinations of numbers that together provide a guaranteed win in a certain category of prizes under given conditions.
The incomplete system is designated by the letter “C”, from the English word “Covering”, which means “covering”.
Covering - provided by the system of matching a certain number of numbers under certain conditions.
Coverage is the guarantees that a system has. It is one of the main properties of the system.
Such systems are also called coating systems.
Example:
A coverage system consisting of 10 options for the 6 out of N lottery and guaranteeing a “three” when 3 numbers out of 10 are guessed,
has the following form: C(10,6,3,3,10).
The coverage in such a system is a guaranteed “three” when 3 numbers out of 10 are guessed in one of 10 options.
Traditionally, the following symbols are used in systems: C, S, v, k, t, m, L, b.
Each symbol represents a number, which, in turn, displays a specific system parameter.
The symbols indicate the following parameters:
C - Covering. Coating system;
S - Steiner. Steiner system;
V - the number of numbers included in the system;
K - number of numbers in combination;
T - guaranteed number of numbers that must match when drawing;
M is the required match among the selected numbers;
L is the guaranteed number of combinations that have a match;
B - number of combinations in the system;
In symbolic form, the system looks like this: C(v,k,t,m,L,b).
Example:
C(31,6,2,2,1,31) means:
The system includes v = 31 numbers,
Each combination of the system consists of k = 6 numbers,
In an L = 1 combination, at least t = 2 numbers are guaranteed to match if any m = 2 numbers are guessed;
The system consists of b = 31 combinations.
To determine the probability of winning when playing with several options,
it is necessary to divide the total number of combinations in a particular lottery by the number of selected options.
Example:
- Option 1 - probability is: 1 in 20.358.520
- Option 2 - the probability is: 2 in 20,358,520 or 1 in 10,179,260
- Option 3 - the probability is: 3 in 20,358,520 or 1 in 6,786,173
- Option 4 - the probability is: 4 in 20,358,520 or 1 in 5,089,630
- Option 5 - the probability is: 5 in 20,358,520 or 1 in 4,071,704
That is, when purchasing a second ticket (option), the probability of winning increases by 50%.
Further, with an increase in the number of combinations, the probability of winning increases, but not so seriously.
In the lottery 5 out of 36
PROBABLE NUMBER OF WINNINGS each class, from all possible combinations,is determined taking into account the probability coefficient of each win:
Winning for 5 correct numbers: (5x4x3x2x1) / (1x2x3x4x5) = 1 win
Winnings for 4 numbers matched: [(5x4x3x2) / (1x2x3x4)] x (31/1) = 155 winnings
Winnings for 3 correct numbers: [(5x4x3) / (1x2x3)] x [(31x30)/(1x2)] = 4,650 wins
Winnings for 2 numbers matched: [(5x4) / (1x2)] x [(31x30x29)/(1x2x3)] = 44,950 wins
PROBABILITY OF WINNING each class
is determined by the ratio of the probable number of wins to the total number of combinations:
Winnings for 5 matched numbers: 376.992 / 1 = 1 for 376.992 combinations
Winning for 4 matched numbers: 376.992 / 155 = 1 in 2.432 combinations
Winning for 3 correct numbers: 376.992 / 4650 = 1 in 81 combinations
Winning for 2 matched numbers: 376.992 / 44950 = 1 in 8 combinations
Note:
No system can guarantee a win in every draw, but it can reduce financial costs while increasing the chances of winning when several conditions are met.
Each system has a certain guarantee, which depends on the number of numbers included in the system, as well as on the number of combinations of the system itself.
The more numbers in the lottery range are included in the system and the smaller the number of combinations in such a system and the higher the minimum guarantee of winning, the better it is.
Controversial issues.
Some lottery participants claim:
If you purchase 10 lottery options, the probability of winning is 1 in 10,000,000
then the chance of winning will be 10/10,000,000 or 1 in 1,000,000.
However, their opponents claim that the chance will be 10,000,000 - 10 or 10 to 9,999,990.
The difference is in the error between the statements; some players talk about the probability of winning, while others talk about the chance of winning.
But it should be taken into account that “chance” and “probability” are not the same thing and mathematically they are not equal to each other.
Chance is the ratio of the probability that an event will occur to the probability that the event will not occur.
Probability is the possibility that one or more events will occur divided by the number of possible outcomes.
Example:
The game cube (dice) has six faces, each of which has its own number from 1 to 6.
Probability the loss of any face will be 1/6.
Chance that the selected edge will fall out will be 1/5, that is, 1 chance “for” and 5 “against” the drop.
The game cube contains 3 even and 3 odd numbers (2,4,6 and 1,3,5)
Probability that the even number 3/6 or 0.5 will be rolled.
Chance this event will be 3/3 or 1/1, in other words 1 chance for and 1 against.
In relation to the controversial statement described,
Probability to win with ten options will be 10:10,000,000
Chances there will be only 10 chances to win and 9,999,990 chances of not winning. Those. 10 "for" and 9,999,990 "against".
CHANCES can be translated into PROBABILITY.
If the chance is 10:9.999.990 then the probability of this event will be:
10 + 9.999.990 = 10.000.000
10/10.000.000 = 0,000001
The percentage probability will be: 100·0.000001= 0.0001%
Therefore:
The probability of winning when playing with 10 options will be 0.0001% versus 0.00001% when playing with one option.
If the probability is denoted as X, then the chance will be equal to X/(1-X).
Example:
If the probability of winning is 0.7, then the chance that this will happen will be equal to 0.7/(1-0.7) = 2.33.
