Here's how this works:
When you request a lottery number some bits are drawn from quantum divergences. Normally these bits might just aggregate out to nothing of consequence, but when amplified to a large-scale effect they will cause divergences of worldlines which would otherwise have just reconverged. More on this concept can be found in the Temporal Mechanics section of the Theory page of this site.
What this means is that while a normal "random" lottery ticket like you might get from the store may be "random" - the RNGs used are not quantum mechanical in nature, meaning for every worldline you drew that ticket on you got the SAME ticket. If it wins this is great, but the chances are it won't win. When you use a quantum random number generator for ticket generation you get precisely 1 copy of EVERY combination of numbers (assuming a 1:1 bit mapping, the algorithm here favors half of all possible combinations twice as much on average, but does include every possible combination with each generated ticket.)
Does this mean you're likely to win? Following the many worlds interpretation of quantum mechanics it means a version of you will absolutely win, but your chances of being that version of you are equally slim as a normal random ticket. The existence of that version of you may hovever make it easier to make your consciousness to it via morphological travel as described in the Theory page of this site.
As a word of caution: if you use this and get something crazy like 1,2,3,4,5+6 that is phenomenally unlikely, but you should still play the numbers for a proper mapping if you were planning to play the generated numbers beforehand because that is a combination guaranteed by the physics of the many worlds interpretation and each generated result must be played for this have complete coverage.
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