The flashy lights and smooth cocktails in the casino room may amaze you. However, you get there to win hard money. None of the glam makes winning easy for you. However, experts came up with a sure hack that is bound to help you big this summer!
Experts first say that you have to understand the bedrock of maths, on which every casino game stands. People who don’t understand that go by the wrong probabilities and keep losing. If you visit Slot Lords Casino, you will get a step-by-step gameplay guide that reduces your chances of losing.
But that is only for meager winnings and beginners! Several tactical minds have taken to the board to defeat the odds. They have used probability and game theory to make a profit!
Example #1
The American Physical Society called for a meeting in Vegas back in 1986. A group of local reporters covered the event. They headlined- “Physicists in Town, Lowest Casino Take Ever”. The story said the physicists had the ultimate winning strategy to outwit any casino game. The strategy is “not playing.”
However, we will avoid the pessimism this time and concentrate on leads that can improve your winning chances. At first, think of betting on red or black on the roulette board. Try playing on https://slotspeak.net/jack-hammer-demo/.
The easy interface and gameplay approach will help you place bets easily.
Here, you get an even payout when you bet on either color. It implies that you will win the same amount against a bet of $1. However, the odds turn against you when you lose. Once you are defeated, your $1 goes to vain!
To keep things simple, let’s assume you have a 50-50 chance of calling the right shots when choosing colors.
However, note that real roulette tables come with extra green pockets where you surely lose. Hence, the house always has a better vantage point. At the same time, we will also consider that there is no maximum bet on a roulette table.
Now Comes The Strategy
You start by betting $1 on any of the colors. When you lose, you must double the bet and come again. In this way, keep on doubling ($1 to $2… to $16 and so on).
For instance, if you lose on the initial two calls, you will win the third time when you call $4. The bottom line is that you lost $1 and $2 on two rounds, resulting in a net loss of $3. But then you win $4. So, after recouping the loss, the net winning is $1.
However, there is no assurance that you will win on the third call. You may also win when you are on your 4th bet. By ten, you have lost at least $7. But when you win, you come up with a winning of $1, no matter what turn it is.
Sure, $1 seems like a puny deal. However, you can accumulate bigger gains by repeating the same strategy game after game. Or you may take a slightly higher risk and start your first bet with an amount higher than $1.
For example, you can start with $1000 instead of $1. So when you win, you will make a net benefit of $1000.
The Exceptions To This Strategy
Readers may argue that they will only win if they eventually call out the right color in a roulette game. But that is contrary to the provision of assured gain with which I started the article.
Don’t be worried. You have missed one essential point here. The chances that your color will hit the right projection at some point in the game are 100%. In other words, the probability that you will lose all the bets in the game is 0. As the number of rounds keeps increasing, the odds of losing keep reducing, and simultaneously, the winning chances improve.
Is It Only a Theoretical Proposition?
It is a mathematical calculation, after all. However, the theory plays out true when you implement it in a practical game. In any realistic roulette table, this rule is supposed to work any day, even if the house has that vantage point we talked about.
How To Approach The Game?
The crux of the article is that you will certainly win at some point in the game. But does that mean that you will empty your purse? Unfortunately, no.
We call this strategy the Martingale Betting Strategy. It was widely used in the 18th century, mainly in Europe, but it is still highly relevant to the roulette tables of Vegas. However, there is also a flaw in the strategy that not many might have noticed.
Jacques Casanova de Seingalt, the noted gambler, said that he was following the Martingale, but was left without a single sequin at a point in time. So, what’s the flaw that we are talking about?
Example #2
Let’s say we have $7 in our pocket. Now we fix an aim of converting it to $8. We can easily bear the losses of the first three rounds ($1, $2, and $4). However, it is unlikely that we will lose all three times in a row. In this game, the probability is only 1 out of 8. So, it is likely that 12.5% of the time we will lose all $7 we had in our pocket.
The remaining 7 out of 8 times, you will surely win $1. However, when you look at the rule from a maths point of view, you find that the strategy is flawless. But how?
Example #3
⅛ multiplied by $7 + ⅞ = $0
This effect can scale up to any starting capital amount you choose. There is a high chance that you will gain a small amount of money each time. However, there is a small chance of losing all your money. Therefore, investing only a small part of your capital towards the Martingale gaming strategy when you are playing roulette is wiser.
The Final Take
The odd one out of all gamblers will lose all of his money. Since the forces balance out
(as shown in example 3), Gamblers usually rely on this strategy. Many incremental winnings and a one-time big loss usually average to $0. All of them hope they won’t have to face that rare turn this time.