Hi all
I wanted to ask if anyone has tried this idea for P-5, P-6 games. I suppose it would work for the bonus
games also with the exception of the bonus ball. Working with filters over the years I have found a few
that converge every so often. Let's say that I have 6 filters that are history based which when all set
to single values they produce 1 line. These filters are calculated in such a way that the line generated
will be different game to game because each new draw added to the database changes the variables
for the next line generated. Lets say that all the filter values converge to the there most logical values
a few times each year or around 2 or 3 times out of 350 games. There are no user settings and all a
person has to do is keep the database updated. One click generates one line. The user has to play the
one line every game and expect to loose around 347 out of every 350 games played but on the bright
side it should produce 2 or 3 JP's a year. Such a method could not be released to the masses because
the set generated would be the same for everyone playing that game. If 50 people were using this to play
the same game then you will have to split the JP between 50 people which kind of defeats the purpose.
Each variable has a 1 in 10 chance of showing in the next draw but using the historical data to assign
probabilities to each and then select the most probable for each filter. As you might think most days the values
that hit are all over the place some from the low end and some from the high end of the pool so to say. We
play for the game where all the most favorable all converge on the the same line or game. When they do
we have the winning set. Such a system is very easy to back-test using real draws and I would think that
if it hits 2 or 3 times out of every 350 drawings going back a few years then it should also hit 2 or 3 times in
the next 350 games. One time would be enough for most people but I am sure no one would refuse a second
or third. It would require playing every day because we have no clue when the drawing will converge to the
most probable values all showing at the same time.
RL