|
2)
|
One
should not get too carried away when dealing with the lotto. So don't
waste your time as much as we do 😊. Do not spend your money at all (I also play very little). Unless
you really have a lot of money, enough to take a risk. Small money brings
nothing, but a big rod catches big fish. In this context, looking at the
weeks that have gone by and analyzing them is, in fact, nonsense.
Although statistics won't really apply to the lottery (assuming it's
random). Can it be used to reduce the number in a certain way? Here it
would be more useful to be familiar not with order, but perhaps more
accurately with disorder. How can one be😉? But still, series can be created, and cross-data analyses can be
done (i.e., tied/untied), empty weeks, hot/cold numbers, averages,
repeating numbers, most/least numbers, etc. I do a lot of such analysis
myself.
There
can be two approaches to playing the lottery. One, for those with money,
is to look at the combinations. The second, for those of us who are
broke, is to look at all the weeks and try to analyze them. Those with
money can pick a certain amount of numbers, no matter what the numbers
are (or maybe they can get help from the penniless like us and pick the
numbers accordingly). Depending on their money, they can choose to know
the 6 or to know 5, 4, 3, or 2 (guaranteed), which I think is smarter in
the short term. How many numbers you choose depends on your money and
your goal, of course. For this, we need to understand Table 1
(unfortunately, I could not complete it because my computer's capacity
and time were not enough).
For
example, you look at your money. It doesn't matter if it's a lotto with 6
numbers chosen from 49, 60, or 90, you say, I want to choose 14 numbers,
and I want to play with these numbers. You can play for a week, or you can
play for multiple weeks (weeks and weeks) until you run out of money. You
can always insist on the same numbers (14). Or you can change the numbers
every week. You can choose these 14 numbers randomly by using the
randombetween function in Excel, by combining your loved ones' favorite
lucky numbers, hot/cold numbers, odd/even ratios, odd/even ratios,
odd/even ratios, odd/odd ratios, or by randomly selecting them from the
top of your head, or you can do your own analysis and choose them
yourself. After all, you have somehow formed 14 numbers. In this case,
the column you need to play to know the lucky six numbers is C(14:6). That is, as many lotto columns as the number
to the left of 14 in Table 1 below (3003). If you had not picked 14 lucky
numbers but 37, you would have to play as many columns as the combination
C(37:6), i.e., the number to the left of 37 in
Table 1 (2324784). Such a choice would not make sense, of course. Because
first of all, it would drive you crazy to play so many columns, and
besides, it is one thing not to misspell and another thing to bet so many
columns, and besides, for example, for the super lotto, your odds of
getting 6 out of 60 numbers (50063860/2324784=21,53) is about 1/22, which
is 4.64%. Not even 5%, which is considered less likely. Especially if you
consider the cost of the columns: 20 TL*2324784 = 46495680 TL, which is
equivalent to the 6-pair jackpot that is usually given. So it doesn't
seem wise to try to find the 6 of a kind by picking a high number of
numbers. However, somehow choosing a reasonable number group that you
believe to be lucky, that you think will be lucky, is a good alternative
in the short term...
In
other words, if you say, my primary goal is not to know the 6; I will
play 5, 4, 3, or 2 guaranteed. In other words, if the numbers drawn that
week are within these 14 numbers that you have chosen, you should play 125
(also shown in this color in Table 1) columns (not 125 random columns,
but 125 selected special columns) as many as the number written to the right
of 14 in the 49(6:5) column by looking at Table 1. In other words, if you
play these 125 selected columns and the lucky numbers drawn that week are
within the 14 numbers you have selected, you will be guaranteed at least
one 5. And maybe you will get 4s and 3s. With a short calculation, you
will deposit 125*20 = 2500 TL and earn much more TL than that. Of course,
in the meantime (3003/125=24) you will also have a 1/24 probability of
knowing 6. So you can say that it is very difficult to choose 14 numbers
in 90, 60, or 49, and 6 of them are drawn numbers. Of course it is true.
But it is also possible to increase the number of numbers according to
your bankroll. Also, even if you play on the same 14 numbers for 4-5
weeks in the weeks when there are rolled-over jackpots, if you know the
5, you will get back the money you invested, not to mention the fact that
you have the chance to know six with that many columns every week. But it
is still a serious risk.
I think it is also necessary to make an explanation here: Instead
of randomly selecting 125 columns and playing those, do you want to
select and play 125 interdependent columns that provide 5 guarantees for
the 14 numbers you specify? Which one is better? The answer to this
question lies in your goal. And, of course, it is also important to
familiarize yourself with the concept of non-random and random. Whether
you play as in the first case (125 columns at random) or the other case
(125 columns with 5 guarantees), i.e., non-random, the probability of
knowing the 6 is the same. So what changes? The question is whether the
columns you play are interdependent and independent of each other. In
other words, if you play 125 columns (I will not give these 125 columns
because they will take up too much space, but I will give other examples
below) determined/associated with the selective method, and if the six
that come out are within the 14 numbers you have chosen, you will be
guaranteed to know at least one 5.
If you want to play 4 guarantees, you need to pay attention to the
column numbers written in column 49(6:4) of Table 1. For example, if you
choose 14 lucky numbers: If you play 3003 columns, you are guaranteed a
6. If you play the special 125 columns, you are guaranteed to know at
least one 5; if you play the special 18 columns, you are guaranteed to
know at least one 4; if you play the special 4 columns, you are
guaranteed to know at least one 3.
For example, to guarantee a 3 out of 17 numbers, you must play the
6
columns below, colored yellow, together. If you play the 6 columns of
your random choice (even if they consist of the 17 numbers you have set),
you will not be able to guarantee at least one 3. You must play the
following 6 columns adapted to your numbers. When playing these special 6
columns, you can either arrange your 17 numbers in order or randomize
their order; it's up to you. As long as you adapt your 17 numbers to the
formation below. Here is how you can do it: Number your 17 numbers from one
to 17 in any way you like. The first six of them (the first row below)
will form your first column. In this way, you will have 6 special or
dependent columns by consistently adapting the numbers below to the ones
you have chosen.
(1, 2, 3, 4,
5, 6)
(7, 8, 9, 10,
11, 12)
(1, 13, 14,
15, 16, 17)
(2, 3, 4, 5,
13, 14)
(2, 3, 6, 15,
16, 17)
(4, 5, 6, 15,
16, 17)
Another
example: To know 2 guarantees in 19 numbers, you must adapt the following
3 columns to your
19 numbers.
(1, 2, 3, 4, 5, 6)
(7, 8, 9, 10, 11,
12)
(1, 13, 14, 15,
16, 17)
Finally, let's give a simple example of 5
guarantees: To know at least one 5 guarantee in 8 numbers, you need to
adapt the following special 4 columns to your 8 numbers. In other
words, instead of playing 28 columns, if you adapt your numbers to the
following pattern and play 4 columns (if the lucky 6 that week is in your
8 numbers), you will know one 5 guarantee. Try and check if you like.
Write down 28 possible combinations of all 6s. Test each of them with
these 4 columns. You will not find any column where at least one of these
4 columns does not contain a 5.
(1, 2, 3, 4, 5, 6)
(1, 2, 3, 4, 7, 8)
(1, 2, 5, 6, 7, 8)
(1, 3, 4, 5,
6, 7)
|
Table 1
|
|
|
|
Comb.
|
no
|
49(6:5)
|
49(6:4)
|
49(6:3)
|
49(6:2)
|
|
7
|
7
|
1
|
1
|
1
|
1
|
|
28
|
8
|
4
|
1
|
1
|
1
|
|
84
|
9
|
9
|
3
|
1
|
1
|
|
210
|
10
|
15
|
3
|
2
|
1
|
|
462
|
11
|
29
|
5
|
2
|
2
|
|
924
|
12
|
46
|
6
|
2
|
2
|
|
1716
|
13
|
79
|
12
|
2
|
2
|
|
3003
|
14
|
125
|
18
|
4
|
2
|
|
5005
|
15
|
|
23
|
4
|
2
|
|
8008
|
16
|
|
31
|
5
|
3
|
|
12376
|
17
|
|
|
6
|
3
|
|
18564
|
18
|
|
|
10
|
3
|
|
27132
|
19
|
|
|
12
|
3
|
|
38760
|
20
|
|
|
14
|
3
|
|
54264
|
21
|
|
|
|
4
|
|
74613
|
22
|
|
|
|
4
|
|
100947
|
23
|
|
|
|
4
|
|
134596
|
24
|
|
|
|
4
|
|
177100
|
25
|
|
|
|
4
|
|
230230
|
26
|
|
|
|
5
|
|
296010
|
27
|
|
|
|
|
|
376740
|
28
|
|
|
|
|
|
475020
|
29
|
|
|
|
|
|
593775
|
30
|
|
|
|
|
|
736281
|
31
|
|
|
|
|
|
906192
|
32
|
|
|
|
|
|
1107568
|
33
|
|
|
|
|
|
1344904
|
34
|
|
|
|
|
|
1623160
|
35
|
|
|
|
|
|
1947792
|
36
|
|
|
|
|
|
2324784
|
37
|
|
|
|
|
|
2760681
|
38
|
|
|
|
|
|
3262623
|
39
|
|
|
|
|
|
3838380
|
40
|
|
|
|
|
|
4496388
|
41
|
|
|
|
|
|
5245786
|
42
|
|
|
|
|
|
6096454
|
43
|
|
|
|
|
|
7059052
|
44
|
|
|
|
|
|
8145060
|
45
|
|
|
|
|
|
9366819
|
46
|
|
|
|
|
|
10737573
|
47
|
|
|
|
|
|
12271512
|
48
|
|
|
|
|
|
13983816
|
49
|
|
|
|
|
…
|
