Roulette Strategy 2018
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The All-in Roulette strategy is extremely volatile and risky, but can yield huge wins if you are lucky enough. Read more about this strategy, get to know the statistics and discover how likely you are to increase your bankroll more than 1,000 times in just a few Roulette spins. Test your roulette strategy here. Free games, Get a 350% bonus with your first deposit. The goal of this post is to offer you the best roulette strategy ever. I read somewhere that roulette is the 3rd most popular table game in the USA. In Europe, roulette is THE most popular table game. I recently took a look at the roulette survey at Wizard of Vegas, and as near as I can. The casino roulette wheel can be your best friend (or worst enemy) Here are some other basic roulette strategies players often use: Numbers. A favorite of many, players choose one, or several of the 38 numbers on the wheel. Roulette Strategy Tutorial November 7, 2018 Infocasinobonus When you search online for the best roulette strategies, you will discover a lot of websites that are advertising guaranteed success with their strategies. I have a ’ strategy’ that partially works, but only at the auto 910p) roulette of evolution gaming. What i do is look at previous numbers and check if a finale came in. Like 2, 22 or 21 11. If the wheel starts to drop in some finale bets. I usually give it a try. For example what i do is if zero comes in.
*Best Roulette Strategy 2018
*Roulette Strategy 2019
*Winning Roulette Strategy 2018
*Roulette Strategy 2018
*Roulette Winning Strategy 2018
Quote from a Las Vegas gambler: “I hope I break even this week. I need the money.”
A roulette wheel is divided into 38 sections, numbered from 1 to 36, 0 and 00. 18 of the sections numbered from 1 to 36 are black and 18 are red. The sections 0 and 00 are green.
You can bet on individual numbers, combinations of numbers, or colors, before the wheel is spun, by placing chips in appropriate sections on the betting layout
The wheel is spun by a casino employee, who then spins a ball along the wheel in the opposite direction. The ball comes to rest in one of the 38 sections, which then becomes the winning section. Players who bet on the winning section are paid off accordingly. For example, a winning bet on #17 pays 35 to 1 odds. A winning bet on red sections pays 1 to 1 odds, or “even money.”
What happens to the roulette gambler in repeated play?
Since the chance is 18 in 38 that the winning section will be red, the “law of averages” states that in repeated play red will come up an average of 18 times in 38 spins. Similarly, #17 will come up, on average, once in 38 spins. So if you repeatedly bet $1 on red, on average, you will win 18 times and lose 20 times in every 38 bets, for an average net loss of $2 per 38 spins = $2/38 = $.053 (5.3 cents) per bet. Likewise, since the chance is 1 in 38 that #17 will be a winning section, the law of averages states that in repeated play, #17 will come up about once every 38 spins. So if you repeatedly bet $1 on #17, on the average you will win once and lose 37 times in every 38 bets, for an average net loss (taking into account the payoff odds) of 35x$1 – 1x$37 per 38 spins, or $2/38 = $.053 per bet.
For bets like this, the player will eventually lose at the rate of 5.3% of all money bet and casino will make a 5.3% profit.
Are there any strategies that circumvent the casino’s 5.3% profit margin (sometimes called the “House Edge”). Consider the “double-down” strategy:
*On the first bet, wager $1 on red. If red comes up, you win $1. Quit.
*On the 2nd bet (if red didn’t come up on the first bet): Double your bet and bet $2 on red. If red comes up, you win $2, covering your $1 loss on the first bet and leaving you a $1 profit. Quit.
*On the 3rd bet (if red didn’t come up on the first two bets): Double your bet and bet $4 on red. If red comes up, you win $4, covering your previous $1 and $2 losses and leaving you a $1 profit. Quit.
*Etc
By the laws of chance, eventually red has to come up, at which point you quit a winner!!!
Is there anything wrong with this strategy?
Unfortunately:
All casino games have a house limit. If you encounter an unlucky streak of losses, the amount you need to bet may exceed this limit, thus causing you to not cover your losses.
Most people have a limit. If you encounter an unlucky streak of losses, the amount you need to bet may exceed this limit, also causing you to not cover your losses.
Although unlikely, if red fails to come up 15 times in a row, on the 16th bet, you must wager $32,768 in an attempt to come out $1 ahead. Most casinos will not allow such a bet.
Alas, it turns out that the double-down strategy, although deceptively appealing, is no different from other roulette bets: In the long run, the gambler will still lose at the rate of $.053 per dollar bet.
It should be noted that the double-down strategy says to quit as soon as you win. What does it mean to quit? Does it mean that as soon as you win your dollar you never come back to the roulette table again? Or does it mean to go have a drink and then start over? For most gamblers, it means the latter. Sadly, if you quit forever, you wouldn’t be a gambler anymore.Introduction
The Gambler’s Fallacy is the mistaken belief that if an independent event has not happened in a long time, then it becomes overdue and more likely. It is also equally incorrect that if an outcome has happened a disproportionate number of times lately, compared to statistical expectations, then it becomes overheated and less likely to occur the next time. An example of this fallacious thinking might be that if the number 23 hasn’t been drawn in a 6-49 lottery the last 100 games, then it becomes more likely to be drawn during the next drawing.
Many worthless betting strategies and systems are based on belief in the Gambler’s Fallacy. I got the idea for writing about this after reading an 888 online roulette article by Frank Scoblete entitled How to Take Advantage of Roulette Hot Spots. In that article, Scoblete recommends taking a count of each outcome for 3,700 spins in single-zero roulette and 3,800 spins in double-zero roulette in the hunt for ’hot numbers.’ Never mind that this would take about 100 hours to make this many observations, assuming the industry standard of 38 spins per hour.
Before going further, let me say that I strongly believe modern roulette wheels made by top brands like Cammegh are extremely precise and any bias would be minuscule compared to the house advantage. Thus, testing a modern roulette for bias would be a total waste of time. Now, testing a 30-year-old hand-me-down wheel in a banana republic might be another story. However, you’re on your own if you win a lot of money from said casino and try to leave with it.
That said, if you track 3,800 outcomes in single-zero roulette, the average number of times any number will hit is 3800/38=100. I ran a simulation of over 1.3 trillion spins, counting how many times each number was hit, sorting the outcomes to find the most frequent number and how many times it was observed, and keeping a count of how many times the most frequent number in each simulation was seen. Hottest Number in 3,800 Spins of Double-Zero RouletteBest Roulette Strategy 2018
As a former actuary, I hate to use a layman’s term like the ’hottest number,’ but that is how gamblers talk so will go with that. That said, following are the results of the count of the hottest number in millions of 3800-spin simulations. Count of the Hottest Number in 3,800 Spins on Double-Zero WheelStatisticValue Mean 122.02 Median 121 Mode 120 90th Percentile 128 95th Percentile 131 99th Percentile 136 99.9th Percentile 142
Here is what the table above means in plain simple English.
*The mean, or average, count of the hottest number is 122.02.
*The median count of the most frequent number is 121. This means that over 50% of time the most frequent number appeared 121 times or less, as well as 121 times or more. This is possible because the probability of 121 observations is in both groups.
*The mode, or most count of the hottest number is 120, which happens 8.29% of the time.
*The 90th percentile is the smallest number such that the probability the count of the hottest number is at least 90% .
*The 95th percentile is the smallest number such that the probability the count of the hottest number is at least 95%.
*The 99th percentile is the smallest number such that the probability the count of the hottest number is at least 99%.
*The 99.9th percentile is the smallest number such that the probability the count of the hottest number is at least 99.9%. Hottest Number in 3,700 Spins of Single-Zero Roulette
The results are very similar with 3,700 spins tracked on a single-zero wheel. Following is a summary of the results. Count of the Hottest Number in 3,700 Spins on Single-Zero WheelStatisticValue Mean 121.90 Median 121 Mode 120 90th Percentile 128 95th Percentile 131 99th Percentile 136 99.9th Percentile 142
The following table shows the full results of the simulation on both wheels. The two commulative columns show the probability that the count of the hottest number is the number on the left column or more. For example, the probability the hottest number in 3,700 spins of single-zero roulette is 130 or more is 0.072044. Summary of the Count of the Hottest Number in 3,700 Spins of Single-Zero Roulette and 3,800 spins of Double-Zero RouletteCountProbability
Single ZeroCummulative
Single ZeroProbability
Double ZeroCummulative
Double Zero 160 or More 0.000001 0.000001 0.000001 0.000001 159 0.000000 0.000001 0.000000 0.000001 158 0.000001 0.000001 0.000001 0.000001 157 0.000001 0.000002 0.000001 0.000002 156 0.000001 0.000003 0.000001 0.000003 155 0.000002 0.000005 0.000002 0.000005 154 0.000003 0.000009 0.000003 0.000008 153 0.000005 0.000013 0.000005 0.000013 152 0.000007 0.000020 0.000008 0.000021 151 0.000012 0.000032 0.000012 0.000033 150 0.000017 0.000049 0.000018 0.000051 149 0.000026 0.000075 0.000027 0.000077 148 0.000038 0.000114 0.000041 0.000118 147 0.000060 0.000174 0.000062 0.000180 146 0.000091 0.000265 0.000092 0.000273 145 0.000132 0.000397 0.000137 0.000409 144 0.000195 0.000592 0.000199 0.000608 143 0.000282 0.000874 0.000289 0.000898 142 0.000409 0.001283 0.000421 0.001319 141 0.000580 0.001863 0.000606 0.001925 140 0.000833 0.002696 0.000860 0.002784 139 0.001186 0.003882 0.001215 0.003999 138 0.001652 0.005534 0.001704 0.005703 137 0.002315 0.007849 0.002374 0.008077 136 0.003175 0.011023 0.003286 0.011363 135 0.004355 0.015378 0.004489 0.015852 134 0.005916 0.021295 0.006088 0.021940 133 0.007939 0.029233 0.008196 0.030136 132 0.010601 0.039834 0.010908 0.041044 131 0.013991 0.053824 0.014384 0.055428 130 0.018220 0.072044 0.018757 0.074185 129 0.023498 0.095542 0.024114 0.098299 128 0.029866 0.125408 0.030603 0.128901 127 0.037288 0.162696 0.038228 0.167130 126 0.045771 0.208467 0.046898 0.214027 125 0.055165 0.263632 0.056310 0.270337 124 0.064853 0.328485 0.066020 0.336357 123 0.074178 0.402662 0.075236 0.411593 122 0.081929 0.484591 0.082885 0.494479 121 0.087158 0.571750 0.087696 0.582174 120 0.088520 0.660269 0.088559 0.670734 119 0.084982 0.745252 0.084406 0.755140 118 0.076454 0.821705 0.075245 0.830385 117 0.063606 0.885312 0.061851 0.892236 116 0.048069 0.933381 0.046111 0.938347 115 0.032432 0.965813 0.030604 0.968952 114 0.019117 0.984930 0.017664 0.986616 113 0.009567 0.994496 0.008614 0.995230 112 0.003894 0.998390 0.003420 0.998650 111 0.001257 0.999647 0.001065 0.999715 110 0.000297 0.999944 0.000243 0.999958 109 0.000050 0.999994 0.000038 0.999996 108 or Less 0.000006 1.000000 0.000004 1.000000 Count of the Hottest Numbers in 300 Spins in Double-Zero Roulette
What if you don’t want to spend 100 hours gathering data on a single wheel? Some casinos are kind enough to give you, on a silver platter, the number of times in the last 300 spins the four ’hottest’ and ’coolest’ numbers occurred. The image at the top of the page shows an example taken on a double-zero wheel at the Venetian.
In 300 spins, the average number of wins on a double-zero wheel for any number is 300/38=7.9. As you can see from the image above, the four hottest numbers were 20, 5, 29, and 2, which occurred 15, 14, 13, and 12 times respectively. Is this unusual? No. In a simulation of over 80 billion spins, the most frequent number, in 300-spin experiments, appeared most frequently at 14 times with a probability of 27.4%. The most likely total of the second, third, and fourth most frequent numbers was 13, 12, and 12 times respectively, with probabilities of 37.9%, 46.5%, and 45.8%. So the results of the ’hottest’ numbers in the image above were a little more flat than average.
The following table shows the probabilities of the four hottest numbers in 300 spins of double-zero roulette. For example, the probability the third most frequent number happens 15 times is 0.009210. Count of the Hottest Four Numbers in 300 Spins on a Double-Zero WheelObservationsProbability
Most FrequentProbability Second
Most FrequentProbability Third
Most FrequentProbability Fourth
Most Frequent 25 or More 0.000022 0.000000 0.000000 0.000000 24 0.000051 0.000000 0.000000 0.000000 23 0.000166 0.000000 0.000000 0.000000 22 0.000509 0.000000 0.000000 0.000000 21 0.001494 0.000001 0.000000 0.000000 20 0.004120 0.000009 0.000000 0.000000 19 0.010806 0.000075 0.000000 0.000000 18 0.026599 0.000532 0.000003 0.000000 17 0.060526 0.003263 0.000060 0.000001 16 0.123564 0.016988 0.000852 0.000020 15 0.212699 0.071262 0.009210 0.000598 14 0.274118 0.215025 0.068242 0.011476 13 0.212781 0.379097 0.283768 0.117786 12 0.067913 0.270747 0.464748 0.457655 11 0.004615 0.042552 0.168285 0.383900 10 0.000017 0.000448 0.004830 0.028544 9 0.000000 0.000000 0.000001 0.000020 Total 1.000000 1.000000 1.000000 1.000000 Roulette Strategy 2019
Hank azaria poker tournament. The next table shows the mean, median, and mode for the count of the first, second, third, and fourth hottest numbers in millions of 300-spin simulations of double-zero roulette. Summary of the Count of the Four Most Frequent Numbers in 300 Spins of Double-Zero WheelOrderMeanMedianMode First 14.48 14 14 Second 13.07 13 13 Third 12.27 12 12 Fourth 11.70 12 12 Count of the Coolest Numbers in 300 Spins in Double-Zero Roulette
The next table shows the probability of each count of the four collest numbers in 300 spins of double-zero roulette. Count of the Coolest Four Numbers in 300 Spins on a Double-Zero WheelObservationsProbability Least
FrequentProbability Second
Least FrequentProbability Third
Least FrequentProbability Fourth
Least Frequent 0 0.012679 0.000063 0.000000 0.000000 1 0.098030 0.005175 0.000135 0.000002 2 0.315884 0.088509 0.012041 0.001006 3 0.416254 0.420491 0.205303 0.063065 4 0.150220 0.432638 0.595139 0.522489 5 0.006924 0.052945 0.185505 0.401903 6 0.000008 0.000180 0.001878 0.011534 Total 1.000000 1.000000 1.000000 1.000000
The next table shows the mean, median, and mode for the count of the first, second, third, and fourth coolest numbers in the 300-spin simulations of double-zero roulette. Summary of the count of the Four Least Frequent Numbers on a Double-Zero WheelOrderMeanMedianMode Least 2.61 3 3 Second Least 3.44 3 4 Third Least 3.96 4 4 Fourth Least 4.36 4 4 Count of the Hottest Numbers in 300 Spins of Single-Zero Roulette
In 300 spins, the average number of wins on a single-zero wheel for any number is 300/37=8.11. The next table shows the probability of each count of the four coolest numbers in 300 spins of double-zero roulette. For example, the probability the third most frequent number happens 15 times is 0.015727. Count of the Hottest Four Numbers in 300 Spins on a Single-Zero WheelObservationsProbability
Most FrequentProbability Second
Most FrequentProbability Third
Most FrequentProbability Fourth
Most Frequent 25 or More 0.000034 0.000000 0.000000 0.000000 24 0.000078 0.000000 0.000000 0.000000 23 0.000245 0.000000 0.000000 0.000000 22 0.000728 0.000000 0.000000 0.000000 21 0.002069 0.000002 0.000000 0.000000 20 0.005570 0.000018 0.000000 0.000000 19 0.014191 0.000135 0.000000 0.000000 18 0.033833 0.000905 0.000008 0.000000 17 0.074235 0.005202 0.000125 0.000001 16 0.144490 0.025286 0.001624 0.000050 15 0.232429 0.097046 0.015727 0.001286 14 0.269735 0.259360 0.101259 0.021054 13 0.177216 0.382432 0.347102 0.175177 12 0.043266 0.208137 0.429715 0.508292 11 0.001879 0.021373 0.102979 0.283088 10 0.000003 0.000103 0.001461 0.011049 9 0.000000 0.000000 0.000000 0.000002 Total 1.000000 1.000000 1.000000 1.000000 Winning Roulette Strategy 2018
The next table shows the mean, median, and mode for the count of the first, second, third, and fourth hottest numbers in millions of 300-spin simulations of double-zero roulette. Summary — Count of the Four Hottest Numbers — Double-Zero WheelOrderMeanMedianMode First 14.74 15 14 Second 13.30 13 13 Third 12.50 12 12 Fourth 11.92 12 12 Count of the Coolest Numbers in 300 Spins in Single-Zero Roulette
The next table shows the probability of each count of the four coolest numbers in 300 spins of double-zero roulette. For example, the probability the third coolest numbers will be observed five times is 0.287435. Count of the Coolest Four Numbers in 300 Spins on a Double-Zero WheelObservationsProbability Least
FrequentProbability Second
Least FrequentProbability Third
Least FrequentProbability Fourth
Least Frequent 0 0.009926 0.000038 0.000000 0.000000 1 0.079654 0.003324 0.000068 0.000001 2 0.275226 0.062392 0.006791 0.000448 3 0.419384 0.350408 0.140173 0.034850 4 0.200196 0.484357 0.557907 0.406702 5 0.015563 0.098547 0.287435 0.521238 6 0.000050 0.000933 0.007626 0.036748 7 0.000000 0.000000 0.000001 0.000013 Total 1.000000 1.000000 1.000000 1.000000
The next table shows the mean, median, and mode for the count of the first, second, third, and fourth coolest numbers in the 300-spin simulations of single-zero roulette. Summary of the count of the Four Least Frequent Numbers on a Single-Zero WheelOrderMeanMedianMode Least 2.77 3 3 Second Least 3.62 4 4 Third Least 4.15 4 4 Fourth Least 4.56 5 5
The least I hope you have learned from this article is it is to be expected that certain numbers will come up more than others. To put it in other words, it is natural that some numbers will be ’hot’ and some ’cool.’ I
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The All-in Roulette strategy is extremely volatile and risky, but can yield huge wins if you are lucky enough. Read more about this strategy, get to know the statistics and discover how likely you are to increase your bankroll more than 1,000 times in just a few Roulette spins. Test your roulette strategy here. Free games, Get a 350% bonus with your first deposit. The goal of this post is to offer you the best roulette strategy ever. I read somewhere that roulette is the 3rd most popular table game in the USA. In Europe, roulette is THE most popular table game. I recently took a look at the roulette survey at Wizard of Vegas, and as near as I can. The casino roulette wheel can be your best friend (or worst enemy) Here are some other basic roulette strategies players often use: Numbers. A favorite of many, players choose one, or several of the 38 numbers on the wheel. Roulette Strategy Tutorial November 7, 2018 Infocasinobonus When you search online for the best roulette strategies, you will discover a lot of websites that are advertising guaranteed success with their strategies. I have a ’ strategy’ that partially works, but only at the auto 910p) roulette of evolution gaming. What i do is look at previous numbers and check if a finale came in. Like 2, 22 or 21 11. If the wheel starts to drop in some finale bets. I usually give it a try. For example what i do is if zero comes in.
*Best Roulette Strategy 2018
*Roulette Strategy 2019
*Winning Roulette Strategy 2018
*Roulette Strategy 2018
*Roulette Winning Strategy 2018
Quote from a Las Vegas gambler: “I hope I break even this week. I need the money.”
A roulette wheel is divided into 38 sections, numbered from 1 to 36, 0 and 00. 18 of the sections numbered from 1 to 36 are black and 18 are red. The sections 0 and 00 are green.
You can bet on individual numbers, combinations of numbers, or colors, before the wheel is spun, by placing chips in appropriate sections on the betting layout
The wheel is spun by a casino employee, who then spins a ball along the wheel in the opposite direction. The ball comes to rest in one of the 38 sections, which then becomes the winning section. Players who bet on the winning section are paid off accordingly. For example, a winning bet on #17 pays 35 to 1 odds. A winning bet on red sections pays 1 to 1 odds, or “even money.”
What happens to the roulette gambler in repeated play?
Since the chance is 18 in 38 that the winning section will be red, the “law of averages” states that in repeated play red will come up an average of 18 times in 38 spins. Similarly, #17 will come up, on average, once in 38 spins. So if you repeatedly bet $1 on red, on average, you will win 18 times and lose 20 times in every 38 bets, for an average net loss of $2 per 38 spins = $2/38 = $.053 (5.3 cents) per bet. Likewise, since the chance is 1 in 38 that #17 will be a winning section, the law of averages states that in repeated play, #17 will come up about once every 38 spins. So if you repeatedly bet $1 on #17, on the average you will win once and lose 37 times in every 38 bets, for an average net loss (taking into account the payoff odds) of 35x$1 – 1x$37 per 38 spins, or $2/38 = $.053 per bet.
For bets like this, the player will eventually lose at the rate of 5.3% of all money bet and casino will make a 5.3% profit.
Are there any strategies that circumvent the casino’s 5.3% profit margin (sometimes called the “House Edge”). Consider the “double-down” strategy:
*On the first bet, wager $1 on red. If red comes up, you win $1. Quit.
*On the 2nd bet (if red didn’t come up on the first bet): Double your bet and bet $2 on red. If red comes up, you win $2, covering your $1 loss on the first bet and leaving you a $1 profit. Quit.
*On the 3rd bet (if red didn’t come up on the first two bets): Double your bet and bet $4 on red. If red comes up, you win $4, covering your previous $1 and $2 losses and leaving you a $1 profit. Quit.
*Etc
By the laws of chance, eventually red has to come up, at which point you quit a winner!!!
Is there anything wrong with this strategy?
Unfortunately:
All casino games have a house limit. If you encounter an unlucky streak of losses, the amount you need to bet may exceed this limit, thus causing you to not cover your losses.
Most people have a limit. If you encounter an unlucky streak of losses, the amount you need to bet may exceed this limit, also causing you to not cover your losses.
Although unlikely, if red fails to come up 15 times in a row, on the 16th bet, you must wager $32,768 in an attempt to come out $1 ahead. Most casinos will not allow such a bet.
Alas, it turns out that the double-down strategy, although deceptively appealing, is no different from other roulette bets: In the long run, the gambler will still lose at the rate of $.053 per dollar bet.
It should be noted that the double-down strategy says to quit as soon as you win. What does it mean to quit? Does it mean that as soon as you win your dollar you never come back to the roulette table again? Or does it mean to go have a drink and then start over? For most gamblers, it means the latter. Sadly, if you quit forever, you wouldn’t be a gambler anymore.Introduction
The Gambler’s Fallacy is the mistaken belief that if an independent event has not happened in a long time, then it becomes overdue and more likely. It is also equally incorrect that if an outcome has happened a disproportionate number of times lately, compared to statistical expectations, then it becomes overheated and less likely to occur the next time. An example of this fallacious thinking might be that if the number 23 hasn’t been drawn in a 6-49 lottery the last 100 games, then it becomes more likely to be drawn during the next drawing.
Many worthless betting strategies and systems are based on belief in the Gambler’s Fallacy. I got the idea for writing about this after reading an 888 online roulette article by Frank Scoblete entitled How to Take Advantage of Roulette Hot Spots. In that article, Scoblete recommends taking a count of each outcome for 3,700 spins in single-zero roulette and 3,800 spins in double-zero roulette in the hunt for ’hot numbers.’ Never mind that this would take about 100 hours to make this many observations, assuming the industry standard of 38 spins per hour.
Before going further, let me say that I strongly believe modern roulette wheels made by top brands like Cammegh are extremely precise and any bias would be minuscule compared to the house advantage. Thus, testing a modern roulette for bias would be a total waste of time. Now, testing a 30-year-old hand-me-down wheel in a banana republic might be another story. However, you’re on your own if you win a lot of money from said casino and try to leave with it.
That said, if you track 3,800 outcomes in single-zero roulette, the average number of times any number will hit is 3800/38=100. I ran a simulation of over 1.3 trillion spins, counting how many times each number was hit, sorting the outcomes to find the most frequent number and how many times it was observed, and keeping a count of how many times the most frequent number in each simulation was seen. Hottest Number in 3,800 Spins of Double-Zero RouletteBest Roulette Strategy 2018
As a former actuary, I hate to use a layman’s term like the ’hottest number,’ but that is how gamblers talk so will go with that. That said, following are the results of the count of the hottest number in millions of 3800-spin simulations. Count of the Hottest Number in 3,800 Spins on Double-Zero WheelStatisticValue Mean 122.02 Median 121 Mode 120 90th Percentile 128 95th Percentile 131 99th Percentile 136 99.9th Percentile 142
Here is what the table above means in plain simple English.
*The mean, or average, count of the hottest number is 122.02.
*The median count of the most frequent number is 121. This means that over 50% of time the most frequent number appeared 121 times or less, as well as 121 times or more. This is possible because the probability of 121 observations is in both groups.
*The mode, or most count of the hottest number is 120, which happens 8.29% of the time.
*The 90th percentile is the smallest number such that the probability the count of the hottest number is at least 90% .
*The 95th percentile is the smallest number such that the probability the count of the hottest number is at least 95%.
*The 99th percentile is the smallest number such that the probability the count of the hottest number is at least 99%.
*The 99.9th percentile is the smallest number such that the probability the count of the hottest number is at least 99.9%. Hottest Number in 3,700 Spins of Single-Zero Roulette
The results are very similar with 3,700 spins tracked on a single-zero wheel. Following is a summary of the results. Count of the Hottest Number in 3,700 Spins on Single-Zero WheelStatisticValue Mean 121.90 Median 121 Mode 120 90th Percentile 128 95th Percentile 131 99th Percentile 136 99.9th Percentile 142
The following table shows the full results of the simulation on both wheels. The two commulative columns show the probability that the count of the hottest number is the number on the left column or more. For example, the probability the hottest number in 3,700 spins of single-zero roulette is 130 or more is 0.072044. Summary of the Count of the Hottest Number in 3,700 Spins of Single-Zero Roulette and 3,800 spins of Double-Zero RouletteCountProbability
Single ZeroCummulative
Single ZeroProbability
Double ZeroCummulative
Double Zero 160 or More 0.000001 0.000001 0.000001 0.000001 159 0.000000 0.000001 0.000000 0.000001 158 0.000001 0.000001 0.000001 0.000001 157 0.000001 0.000002 0.000001 0.000002 156 0.000001 0.000003 0.000001 0.000003 155 0.000002 0.000005 0.000002 0.000005 154 0.000003 0.000009 0.000003 0.000008 153 0.000005 0.000013 0.000005 0.000013 152 0.000007 0.000020 0.000008 0.000021 151 0.000012 0.000032 0.000012 0.000033 150 0.000017 0.000049 0.000018 0.000051 149 0.000026 0.000075 0.000027 0.000077 148 0.000038 0.000114 0.000041 0.000118 147 0.000060 0.000174 0.000062 0.000180 146 0.000091 0.000265 0.000092 0.000273 145 0.000132 0.000397 0.000137 0.000409 144 0.000195 0.000592 0.000199 0.000608 143 0.000282 0.000874 0.000289 0.000898 142 0.000409 0.001283 0.000421 0.001319 141 0.000580 0.001863 0.000606 0.001925 140 0.000833 0.002696 0.000860 0.002784 139 0.001186 0.003882 0.001215 0.003999 138 0.001652 0.005534 0.001704 0.005703 137 0.002315 0.007849 0.002374 0.008077 136 0.003175 0.011023 0.003286 0.011363 135 0.004355 0.015378 0.004489 0.015852 134 0.005916 0.021295 0.006088 0.021940 133 0.007939 0.029233 0.008196 0.030136 132 0.010601 0.039834 0.010908 0.041044 131 0.013991 0.053824 0.014384 0.055428 130 0.018220 0.072044 0.018757 0.074185 129 0.023498 0.095542 0.024114 0.098299 128 0.029866 0.125408 0.030603 0.128901 127 0.037288 0.162696 0.038228 0.167130 126 0.045771 0.208467 0.046898 0.214027 125 0.055165 0.263632 0.056310 0.270337 124 0.064853 0.328485 0.066020 0.336357 123 0.074178 0.402662 0.075236 0.411593 122 0.081929 0.484591 0.082885 0.494479 121 0.087158 0.571750 0.087696 0.582174 120 0.088520 0.660269 0.088559 0.670734 119 0.084982 0.745252 0.084406 0.755140 118 0.076454 0.821705 0.075245 0.830385 117 0.063606 0.885312 0.061851 0.892236 116 0.048069 0.933381 0.046111 0.938347 115 0.032432 0.965813 0.030604 0.968952 114 0.019117 0.984930 0.017664 0.986616 113 0.009567 0.994496 0.008614 0.995230 112 0.003894 0.998390 0.003420 0.998650 111 0.001257 0.999647 0.001065 0.999715 110 0.000297 0.999944 0.000243 0.999958 109 0.000050 0.999994 0.000038 0.999996 108 or Less 0.000006 1.000000 0.000004 1.000000 Count of the Hottest Numbers in 300 Spins in Double-Zero Roulette
What if you don’t want to spend 100 hours gathering data on a single wheel? Some casinos are kind enough to give you, on a silver platter, the number of times in the last 300 spins the four ’hottest’ and ’coolest’ numbers occurred. The image at the top of the page shows an example taken on a double-zero wheel at the Venetian.
In 300 spins, the average number of wins on a double-zero wheel for any number is 300/38=7.9. As you can see from the image above, the four hottest numbers were 20, 5, 29, and 2, which occurred 15, 14, 13, and 12 times respectively. Is this unusual? No. In a simulation of over 80 billion spins, the most frequent number, in 300-spin experiments, appeared most frequently at 14 times with a probability of 27.4%. The most likely total of the second, third, and fourth most frequent numbers was 13, 12, and 12 times respectively, with probabilities of 37.9%, 46.5%, and 45.8%. So the results of the ’hottest’ numbers in the image above were a little more flat than average.
The following table shows the probabilities of the four hottest numbers in 300 spins of double-zero roulette. For example, the probability the third most frequent number happens 15 times is 0.009210. Count of the Hottest Four Numbers in 300 Spins on a Double-Zero WheelObservationsProbability
Most FrequentProbability Second
Most FrequentProbability Third
Most FrequentProbability Fourth
Most Frequent 25 or More 0.000022 0.000000 0.000000 0.000000 24 0.000051 0.000000 0.000000 0.000000 23 0.000166 0.000000 0.000000 0.000000 22 0.000509 0.000000 0.000000 0.000000 21 0.001494 0.000001 0.000000 0.000000 20 0.004120 0.000009 0.000000 0.000000 19 0.010806 0.000075 0.000000 0.000000 18 0.026599 0.000532 0.000003 0.000000 17 0.060526 0.003263 0.000060 0.000001 16 0.123564 0.016988 0.000852 0.000020 15 0.212699 0.071262 0.009210 0.000598 14 0.274118 0.215025 0.068242 0.011476 13 0.212781 0.379097 0.283768 0.117786 12 0.067913 0.270747 0.464748 0.457655 11 0.004615 0.042552 0.168285 0.383900 10 0.000017 0.000448 0.004830 0.028544 9 0.000000 0.000000 0.000001 0.000020 Total 1.000000 1.000000 1.000000 1.000000 Roulette Strategy 2019
Hank azaria poker tournament. The next table shows the mean, median, and mode for the count of the first, second, third, and fourth hottest numbers in millions of 300-spin simulations of double-zero roulette. Summary of the Count of the Four Most Frequent Numbers in 300 Spins of Double-Zero WheelOrderMeanMedianMode First 14.48 14 14 Second 13.07 13 13 Third 12.27 12 12 Fourth 11.70 12 12 Count of the Coolest Numbers in 300 Spins in Double-Zero Roulette
The next table shows the probability of each count of the four collest numbers in 300 spins of double-zero roulette. Count of the Coolest Four Numbers in 300 Spins on a Double-Zero WheelObservationsProbability Least
FrequentProbability Second
Least FrequentProbability Third
Least FrequentProbability Fourth
Least Frequent 0 0.012679 0.000063 0.000000 0.000000 1 0.098030 0.005175 0.000135 0.000002 2 0.315884 0.088509 0.012041 0.001006 3 0.416254 0.420491 0.205303 0.063065 4 0.150220 0.432638 0.595139 0.522489 5 0.006924 0.052945 0.185505 0.401903 6 0.000008 0.000180 0.001878 0.011534 Total 1.000000 1.000000 1.000000 1.000000
The next table shows the mean, median, and mode for the count of the first, second, third, and fourth coolest numbers in the 300-spin simulations of double-zero roulette. Summary of the count of the Four Least Frequent Numbers on a Double-Zero WheelOrderMeanMedianMode Least 2.61 3 3 Second Least 3.44 3 4 Third Least 3.96 4 4 Fourth Least 4.36 4 4 Count of the Hottest Numbers in 300 Spins of Single-Zero Roulette
In 300 spins, the average number of wins on a single-zero wheel for any number is 300/37=8.11. The next table shows the probability of each count of the four coolest numbers in 300 spins of double-zero roulette. For example, the probability the third most frequent number happens 15 times is 0.015727. Count of the Hottest Four Numbers in 300 Spins on a Single-Zero WheelObservationsProbability
Most FrequentProbability Second
Most FrequentProbability Third
Most FrequentProbability Fourth
Most Frequent 25 or More 0.000034 0.000000 0.000000 0.000000 24 0.000078 0.000000 0.000000 0.000000 23 0.000245 0.000000 0.000000 0.000000 22 0.000728 0.000000 0.000000 0.000000 21 0.002069 0.000002 0.000000 0.000000 20 0.005570 0.000018 0.000000 0.000000 19 0.014191 0.000135 0.000000 0.000000 18 0.033833 0.000905 0.000008 0.000000 17 0.074235 0.005202 0.000125 0.000001 16 0.144490 0.025286 0.001624 0.000050 15 0.232429 0.097046 0.015727 0.001286 14 0.269735 0.259360 0.101259 0.021054 13 0.177216 0.382432 0.347102 0.175177 12 0.043266 0.208137 0.429715 0.508292 11 0.001879 0.021373 0.102979 0.283088 10 0.000003 0.000103 0.001461 0.011049 9 0.000000 0.000000 0.000000 0.000002 Total 1.000000 1.000000 1.000000 1.000000 Winning Roulette Strategy 2018
The next table shows the mean, median, and mode for the count of the first, second, third, and fourth hottest numbers in millions of 300-spin simulations of double-zero roulette. Summary — Count of the Four Hottest Numbers — Double-Zero WheelOrderMeanMedianMode First 14.74 15 14 Second 13.30 13 13 Third 12.50 12 12 Fourth 11.92 12 12 Count of the Coolest Numbers in 300 Spins in Single-Zero Roulette
The next table shows the probability of each count of the four coolest numbers in 300 spins of double-zero roulette. For example, the probability the third coolest numbers will be observed five times is 0.287435. Count of the Coolest Four Numbers in 300 Spins on a Double-Zero WheelObservationsProbability Least
FrequentProbability Second
Least FrequentProbability Third
Least FrequentProbability Fourth
Least Frequent 0 0.009926 0.000038 0.000000 0.000000 1 0.079654 0.003324 0.000068 0.000001 2 0.275226 0.062392 0.006791 0.000448 3 0.419384 0.350408 0.140173 0.034850 4 0.200196 0.484357 0.557907 0.406702 5 0.015563 0.098547 0.287435 0.521238 6 0.000050 0.000933 0.007626 0.036748 7 0.000000 0.000000 0.000001 0.000013 Total 1.000000 1.000000 1.000000 1.000000
The next table shows the mean, median, and mode for the count of the first, second, third, and fourth coolest numbers in the 300-spin simulations of single-zero roulette. Summary of the count of the Four Least Frequent Numbers on a Single-Zero WheelOrderMeanMedianMode Least 2.77 3 3 Second Least 3.62 4 4 Third Least 4.15 4 4 Fourth Least 4.56 5 5
The least I hope you have learned from this article is it is to be expected that certain numbers will come up more than others. To put it in other words, it is natural that some numbers will be ’hot’ and some ’cool.’ I
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