So if you play 2-4-6-8-10-12, expect that your advantage of winning the jackpot will come to every 100 draws. You pick the wrong composition and fail even before the draw begins.įor example, in a lotto 6/49 game, these combinatorial patterns have the following probabilities:Ī 6-even combination will give you the odds of 1 to 134,595 in favor of winning the jackpot, but this favorable advantage comes only once every 100 draws. Numbers are picked from only two groups (1’s group and 30’s group).ġ0’s group and 20’s group are not represented. The table below shows examples of how combinations may differ in characteristics. And combinatorial groups don’t have equal probability. 4, 5 Combinations that share the same composition can be put together into combinatorial groups. So while all combinations may have the same probability, you also have to look at the concept of combinatorial groups. Let me reinforce my point by explaining odds and probability from the context of combinatorial groups or patterns.Ī combination carries certain characteristics depending on its composition. And rest assured that you are not mathematically wrong most of the time. This is how we use math to make intelligent decisions.Īlways remember that a true mathematical strategy helps you calculate all the possibilities and make the right choice. Odds = advantage (you can choose a better ratio of success to failure) Probability = chance ( you cannot control this) But that doesn’t mean you have no control over your strategy because that’s exactly where odds come in handy.Īs a lotto player, you want to ensure a better advantage by choosing a better ratio of success to failure. In other words, the underlying probability never changes when we talk about our chance of winning. While the probability is a likelihood measurement, odds refer to the success ratio to failure. It shows that the lottery has no bias over certain numbers as lotto draws continue to get larger and larger. For example, the picture below describes the behavior of all the numbers in the Canada Lotto 6/49 game from 1982 to 2018. This probability concept has been proven over and over in the long history of the lottery. If we experiment many times, the results always accurately and precisely coincide with the calculation. In this article, I want to show you that building your playing strategy on the statistical frequency of each number is mathematically flawed.įor example, if you pick one ball from a bowl of 49 numbers, each number has a 1/49 probability of getting drawn. The very reason we rely on mathematical calculations is to guide us not to make the wrong choices. If you believe those numbers that occur more frequently are bound to happen more often in the future, then you’re not helping yourself. Meaning there are no “hot” or “cold” numbers. Numbers and Combinations Are Not The Same WordsĮach number is equally likely. Now let me give you a little bit of intro to how this mathematical duo works in the lottery. It calculates all the possible choices in a lotto game and finally separates the best and the worst group using the principle of combinatorics and probability theory. That’s exactly what the Lotterycodex calculator does for you. We know that a 5/70 game comprises 35 low and 35 high numbers.īased on our existing knowledge of the lotto game, any question is a probability and combinatorial problem to solve. For example, there are 19 even numbers and 20 odd numbers in the 5/39 Lotto game. In other words, a sample dataset is unnecessary in the lottery. When a finite quantity of numbers is involved, we have adequate knowledge of the composition of the whole population. Why? Because the lottery has a “ finite structure” that requires logical analysis rather than statistical. You don’t need statistics to determine the best lotto combinations. More often, the results proved inaccurate, especially when a sample set is not large enough to make any conclusive computation. We only apply statistics when something is unknown, so we use a sample set to make some calculations. I think this belief must be corrected once and for all. Why Use the Lotterycodex Calculator in the First Place?įor centuries, the lotto-playing public fumbled around this belief that statistical analysis could help because they thought the past results would give them a clue on what numbers to pick.Lotterycodex Calculator and the Advanced Combinatorial Design.Probability Calculation Applies to All Lottery Systems.The Probability Prediction and the Law of Large Numbers.A Lottery Calculator Should Generate a Balanced Odd and Even Numbers.A Lottery Calculator Must Generate Balanced Low and High Numbers.Odds And Probability Are Not Mathematically Equivalent.Numbers and Combinations Are Not The Same Words.
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