Combination of five numbers consist of numbers belonging to four groups of numbers from 1 to 36 numbers and can count how many times the number in each group are repeated in all = 376 992 options. The first group of numbers from 1 to 9 numbers 52360h9 = 471 240 The second group numbers from 10 to 19 rooms 52 360 x 10 = 523 600 The third group of 20 to 29 rooms 52 360 x 10 = 523 600 The fourth group of 30 to 36 rooms x 7 = 52 360 366 520 Adding these results, we find that 1,884,960 is the number of repetitions of all numbers from 1 to 36 numbers involved in all = 376 992 options. Verify this. Further details can be found at Lynn Redgrave, an internet resource. We have 1884960: 5 = 376 992 On the question 'why' is offered data group number and a numerical sequence, as well, why not consider another partition of numbers and their other possible groupings, there following response. The fact that models of combinations of five numbers for the four groups of numbers in all = 376 992 options for a total of six models of combinations of numbers and fifty-six models of combinations of numbers and their subgroups combinations of other models they do not exist. In other games, which differ in their parameters, the number of combinations of models, the combined group of numbers and combinations of models of sub-numbers will be different, but the proposed technique makes it possible to identify them.
Contents: 1. Introduction page 1-2 2. Theoretical calculations on page 3. An example of calculating the sequence of 5 numbers out of 36 numbers for a given model, a combination of numbers in the 376 992 options = p. 4. Construction of an algorithm making patterns and combinations sequence of 5 numbers from 36 numbers = 376 992 combinations. Pp. To broaden your perception, visit Tony Parker. 5.
Block diagram of algorithm for determining the combination of 5 numbers from 36 numbers = 376 992 combinations. Pp. 6.Zaklyuchenie. Source: Jorge Perez. 7.Vyvod page. Page 8.Tablitsy 9.Risunok page. Page 10.Literatura page. 1. Entry There are a lot of games in which numbers from n to guess numbers m and become the owner of winning a prize.
For example, a game of bingo, where the 36 numbers have to guess 5 numbers from 42 numbers, 6 numbers from 49 numbers, 6 numbers, etc. For the technique was used game, guess 5 numbers out of 36 numbers, for the reason that the author had the statistics of this game for the 1022 edition, making it possible to compare the theoretical with the practical results of Calculations of the game. In the proposed method created a mathematical scheme has shown that there is a calculated number of combinations of models drawn up by the combined groups of numbers, of which all = 376 992 options. Calculations are given numerical parameters describing the properties of the models of combinations of groups of numbers and numbers that appear in these combinations. The results are summarized in the table.
Consequently, the combined number 639 of the fourth group of numbers from 30 to 36 the number of numbers involved-35. Thus, the combination of ICG participates 639 numbers – the numbers C and INC – C2 numbers with the numbers: 4,5,6,16,35. 4. Construction of an algorithm the modeling of combinations and sequences of five numbers from 36 numbers in = 376 992 options. According to the results we can construct an algorithm to produce numbers and ICG INC numbers and sequences of five numbers from 36 numbers in these one of the combinations = 376 992 combinations.
1.Rasschet numerical parameters for the game: to determine the 5 numbers from 36 numbers = 376 992 combinations. 2. Create a group in numerical sequence numbers from 1 to 36 numbers. 3.Po these groups of numbers up combination of numbers, which are formed from all the variants of the 5 numbers in = 376 992 combinations. 4.Sostavit model combinations of 5 numbers of combinations of numbers in groups of numbers, as well as their constituent sub-model combinations of numbers. 5.Raschitat numerical parameters for these models, combinations of groups of numbers and patterns of combinations of sub-numbers.
6.Po received data to determine the arithmetic mean of the repetitions to 36 1nomera numbers, combinations of these models numbers. 7. Define a model combination of groups of numbers. 8. Define the model in its sub-combinations of numbers. 8. Determine the sequence of 5 numbers out of 36 numbers for a combination of sub-model calculated the numbers of a = 376 992 option.