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How Do I......
Freeware Permutation Program
Apr 25, 2007, 9:32 pm - Raven62 - Lottery Systems Forum
Box Combinations
Maybe this Program will help:
https://www.lotterypost.com/search?q=permutation+freeware t=all
Apr 16, 2010, 2:24 pm - Raven62 - Lottery Systems Forum
Sedertree Matrix Wheeling System
Thank you all for the kind words of encouragement, it's a go then.I have begun work on the project; cleaning it up, updating some of the screens etc. etc. Before I release it you'll have to know that this originally was a work for hire. In essence I'm looking at code that I didn't write. So there are somethings that I don't know how to fix/improve upon. Just can't get my head around it.I can write VB, but I'm still just a novice and it is difficult to sort out someone else's logic. Even for
Aug 1, 2004, 5:17 pm - Sedertree - Lottery Systems Forum
ProFilter-Pick3 & more Freeware
Hi,
ProFilter-Pick3 is still available, you will find it here : <snip>
And for the 'Wheelers' there is also a great (I think it is ) tool called ' Dynamic Wheels'.
With this tool you can filter (Sums,Widths,Last-Digits, Draws filter) your lottery wheels (pick-6)... but that' s not the whole story ; e.g if you want the sums of the wheel combinations fall within the sum range 123 - 178 , fall within the width range 23 -44, and have no match 2,3,4,5 or 6 with the last x draw results
Feb 2, 2007, 4:24 pm - stoopendaal - Lottery Systems Forum
looking for some help ...please
Lottery Post Search Forums is Your Friend:
https://www.lotterypost.com/search/forums?q=permutation+freeware t=all
https://www.lotterypost.com/thread/155080/819858
0199 0919 0991 1099 1909 1990 9019 9091 9109 9190 9901 9910
Additional Information on Combinations Permutations:
https://www.lotterypost.com/thread/223397
Nov 19, 2010, 1:10 pm - Raven62 - Pick 4 Forum
The New Quantum Selection Algorithm test is available for testing
Everthing is moving along well.
The Unbounded test version of the algorithm can now Bounded to a non-repeating combination condition.
This means the Bounded algorithm will not produce repeat combinations and it is restricted to a play size of C(n, r), where n is the total numbers used and r is the pick size.
Factorial, n! = n (n - 1) (n - 2) 3 2 1 and 0! = 1
Permutation, P(n, r) = n! / (n - r)! where n is number of items taken r at a time
Combination, C(n, r) = P(n, r) / r! where
Feb 16, 2009, 9:01 am - JADELottery - Lottery Systems Forum
