Gambling with the Martingale Strategy - Numberphile

if you have infinite money then why gamble your money in the first place 🤔

I find that it's a bit of a nuisance, most of the times

@@colarboy1720 A better question would be "why not?".

@@colarboy1720 If I had infinite money, I'd gamble it away every which way

Many politicians don't seem to understand this, and think they can solve it by printing an infinite amount of money.

your expected winning will still be 0

You would already be rich

@@stemacademy2182 That's... the joke

@@SodiumInteresting
No it wouldn't
It's impossible to have an infinite losing streak
Therefore someone with infinite money will ALWAYS win back their money + the original bet.

@@dustinjames1268 no, your expected gain after any amount of bets would be 0 (note: AVERAGE, assuming 50/50 odds).

I thought about this problem, usually starting with a real casino game that moderately favours the house (e.g. roulette or craps). The Law of Large Numbers works against you if you make many bets, so I think you should get the gambling session over as quickly as possible. I assume that you can afford to spend more than $101 on the item but have some temporary problem with your bank or credit card. Part of the strategy is to leave the casino with either $0 or just enough to buy the item.
In your example, I follow the Martingale strategy as long as I can. If I lose 6 times then I have $38 left, and I bet all of it on the next play, and if I lose again then it's over. If I win then I have $76, so I bet $25 and hope to reach $101. If I then lose, I bet $50, either winning what I need or coming down to $1. If I really want the item then I keep betting everything I have until I either lose or come back to $64. In that case I then bet $37, and so on. There's no guaranteed end to the session, but the expected number of plays is about 2 (because each play has the potential to end the session in one way or the other). I think that the fast strategy gives the greatest probability of success (at bit less than 100/101 in your example), but I haven't proved it.

A better strategy would be to ask someone for $1 and explain why you need it

@@Flechashe that's begging and that's illegal.

@@rolandasgrigaitis708 Did I stutter

@@rolandasgrigaitis708asking for money is not illegal. Otherwise all charities would be shut down.

we straight up call it the stupidity tax

National lottery is a form of tax. But hey! it' s the only tax whereby I earned half a million euros.
Gambling is not a tax but a business. The State taxes their benefits, but the major part doesn't serve public goals.

So are lotteries

@@MarcusCactus My dude, it's just an expression meant to drive home the risks of gambling.

Alcohol, weed, gambling, cigarettes. All hail the cash cows of Canadian provinces

Should’ve covered the losses with a £2048 bet

how do i gamble kids?

Lost 4k gambling online at the age of 16, whoops!

Boy, wait until you hear my time losing a game of Russian roulette

I think gambling kids is something most of us would never think of doing. Thanks for the tip tho

statistical variance and law of large numbers...in your case, it was nearly a universe sign to save you...

What was the point of this comment. It essentially says, there is this secret martingale variant that I essentially made up to tell a story about something insignificant.

@@TheAcidicMolotov and yet you came here and wasted your time replying to it. Well done you.

Thanks for your story, I enjoyed it, and I hope you enjoyed that weekend.

Ah yes sounds familiar...

This isn't the reason for the limits. Just a bi-product. They limit bettering for other reasons.

@@TuberTugger interesting, like what?

@@gaeb-hd4lf The fact they don't keep a gajillion dollars on hand to honor your absurdly high bet if you were to win it.
So they'll generally adjust the bet to what they can reasonably give in winnnings for a night.
They should theoretically earn more on average but chance is a cruel mistress so some nights might dig into their margins.

Also the house always wins, you dont get poor Vegas casino bosses, unless they offer 50:50 roulette wheels 🤔😉😆

@@jeffcarr392 The house does not always win, or they'd let you bet however much you like.

You would think that's the case, but most rich people end up squandering their wealth unless they are also members of the government.

The less likely you are to bet everything on a wheel

@@HenriFaust Thanks for telling us that you have never met a wealthy person.

Also the richer you are, the more money you can lose

@@CK-nh7sv what's the point of this "gotchya!"? you added nothing of value except for just being like "erm... no."

How many times you lost in a row?

@@samiulhaquerounok5787 well he lost it all so that would be 7

@@allancouceiro9255not true at all

blahem

​@@allancouceiro9255 and the more money you can lose.

yeah
i worked out an excel sheet that just throws a coin 200 times and counts the repeats and highlighting the highest one.
the number is almost never below 5 and quite often over 7

I mean, if you play infinite many games, this is bound to happen. But many people don't realize that.

I have seen streaks if 16, so ridiculous

I did the same years ago, though I wasn't ever sure if the random num generator was significant variable, I wasn't working with any sophisticated programming. Even graphed it over a few hundred thousand rounds. It would appear to work over many short stretches of a few hundred or few thousand, but like you noticed there would be those few outliers where the deficit would hit tens of millions.

Don't we need to also look at winning streaks. £1 is the minimum win, but we are waiting for say 2 wins in a row, continuing the double strategy.

Like Covid

@@sillysausage4549 Nice reply, fellow human.

Why did I have to be so mean? I'M SO SORRY, SNOWFLAKES!

@@sillysausage4549 Underrated apologize.

haha I remember the same when I was 13, I used my parents account, after two hours of profiting I experienced 15 lost rounds in a row and lost it all (I had 0.01 base bet and I lost about 300usd :D)

always make sure the starting bet

you guys might have forget to jump house to house

@@thureintun1687 - Even if you start at 1%, the system doesn't work due to table limits. The casino already has this factored in.

Random question but what do you do for a living now?

It is the only rule one needs to know 😄

the house always wins until you get the skills to beat their game (advantage play) and then they ban you from playing so they still win.

oh, okay yes I was wondering about that. You can't beat the house using this strategy but you also can't lose to the house (on average from a large number of plays) if each of the rolls are 50/50.

@@colorado841that’s assuming the loss didn’t come early

Technically, your expected loss is smaller if you use the martingale system, because you start at a smaller bet.

Unfortunately it is not 50/50 the house has an advantage.@@colorado841

Once you win doesn’t the strategy reset so ther aren’t any stored gains?

Hi! Sorry to disappoint you, but the Kelly formula is demonstrably too theoretical to be used as a strategy basis. For example, it assumes that you are going to play an infinite number of times, each time knowing the exact probabilities, and that these probabilities are in your favour. And, that you want to grow your budget on a constant rate. All this is rarely encountered in real life. It has supposedly been used by card counters in BJ, but never been proved that it was "better" than some other rule.
When you have a limited span (an evening or even a week), the formula says to bet your whole bankroll in one bet.

The only sensible comment here.

@@MarcusCactus You are more or less correct. You would be correct with something like horse racing where you can never be completely sure what your expectation is going to be. In that case you can use a fractional Kelly. You won't make as much profit as a 100% Kelly but you are not going to run the risk of accidentally over-betting your incorrect expectation. In the case of card counting or other games where expectation is known then Kelly works. However, you have the additional risk of the casino shutting you down before you have made a profit.

@@betfairprotrader7159 What you mean with "Kelly works", I don't know. First, in a casino setting, the house has an edge so Kelly says Do Not Bet. Second, in a positive expectation game, any formula "works". Nothing has ever proved that one is "better" than the other. What is "better" anyway, in a probabilistic environment?

@@MarcusCactus If you are counting cards at blackjack then you have an advantage over the house. The same with a roulette computer. In any game where you have complete information and know what the winning bet is going to be then you have 100% expectation; Kelly says, "Bet 100%" of your bank, other systems might say bet 2%. Which is going to make more money in the long run? Anyway, I'll stick to Kelly over fractions.

This is essentially true. There is serious literature about how being poor contrains ur ability to make profitable gambles/investments. Likewise being able to afford losing money is about the biggest edge normal people can count on in any given investment scenario.

Even better. To make a fortune at the casino one must OWN the casino. Don't bet against the house, BE the house.

I would say infinite fortune

@@androsida8704 not necessarily.
You start with any one fortune of let us say $k0. You enter a casino. You play. You leave the casino with a fortune of $k1.
In all but finitely many cases $k1

It's a probability thing, most people lose, some people win, casino always wins. Still better than national lotteries, they pay out even less than casinos - in my country ~40% of bets, roulette pays out slightly more.

@@saimon174666 what do you mean by "payout less than casinos"?
Is the payout percentage vs the lottery rake relevant at such scales and do any of them have anything to do with your probability of winning?
The odds are just as terrible aren't they?
I always thought it was funny, when you would see hysteria over then fact that the lottery was 200M.
And you'd always hear people say "well, I don't normally play the lotto, but at 200mil? Yeah, I'm in".
As if the odds of hitting all the numbers materially changed from 50mil...
Nnnooowww it makes "sense" to play?... no.

I've always thought about what to tell people who think it is foolproof without going deep into the maths behind it or considering very long (and unlikely) loss streaks.
Let's say you've sat on that roulette table for an hour or two. You lost some and won some more, you got lucky a couple times and have now about 31 bucks more than what you started with. Now you lose five times in a row, which really isn't an unlikely thing to happen. So, what's your situation now?
Following your strategy, you would have to bet 32 now, since you just lost a total of 31 in the current streak. But honestly, why? Your balance is now exactly at the point where it was 1-2 hours ago when you started betting only 1. The probability of winning the next round also is exactly the same as it was back then. If you're willing to keep going and bet 32 now, you know you could have done this from the start and not waste a couple hours getting to the point where "the strategy allows it".
I get that you think you're not gonna lose like ten times in a row and all your money is gone, but five losses in a row is nothing. That happens all the time, and that's the only thing standing between that strategy and just starting with big bids.

There's a math theorem called "Optional Stopping Theorem" that states how any strategy that finishes on average in a finite time (so every strategy for a human) can't buy you anything in terms of expected value in a martingale, so either you discover more information that pushes the odds in your favour or you are bound to lose.

@@mileyardgigahertz or you know, just use logic

Same. The only answer I’ve seen elsewhere is that roulette wheels have 0s so the odds aren’t actually 50/50, but that really isn’t the main problem here because the payout is still double your stake. It’s nice to have an actual in depth answer that identifies the real problems.

@@stechuskaktus8318 Is the £1 win the limit of max expected win value ? Because we know we can double our money, about 1/3 of the time, presumably the flip is total loss 1/3 of time and the 1/3 in the middle the limit is something like 1 or 0. Can anyone want to sort the maths numbers for me.

Doubling money!

It does work sometimes. In fact, it's 50/50, it either works or it doesn't.

Man, martingale Works with wee use It with a lot of care, only using tree doubling steps

It does if you only do it once. They'll usually double the first 100 gold or whatever to "prove" that it works. So just run away after the first doubling.

Sand casino bad

As did I... Sigh...

Should have just DDS spec’d harder

Same, even though I was the casino (had better stats). If you don't have an infinite bank you're bound to get stuck. I did manage though to go from a 500k bank to like a 10mill bank before I got cleaned.

LOL RIGHT? I KEEP GOING ON -12 STREAKS WITH THIS STRATEGY

@@ZaneZephyr no arm, whip only bruv

… What? Why would the previous color have any bearing on the likelihood of the next color?

​@@billberg1264 because it's unlikely a table will always alternate colours a large amount of times, table bias will usually repeat a specific part of the wheel a lot

Thanks. I was hoping someone would get into this

Your bets also don’t evenly go into 100. If you start with 100, you are effectively starting with £63. No matter what you are keeping the remaining £37. This also plays into the probability making it a lot less likely to double your 100 than what they claimed in the video

Thank you. The assumption that all the winnings were put aside was not stated. It would be interesting to look at the expected return using different starting sums with this method though.

@@colbygann4674 It was stated that the bets could be easily calibrated to take account of this. However your right that you'd only be able to split your bets down into certain denominations.

Ah this makes a lot of sense, I was wondering if you reversed the strategy and played as the casino (double your bet every time you win, and start at 1 again after you lose) then you'd theoretically have a 63% chance of winning based on what we learned in the video which makes no sense.

There is a 144.3% chance of that not happening.

@@TheJohnmmullin A video about that would spell DISASTER for YOU

@@lenmetallica what a sacrifice

You mean 18 minutes.

omg hi

you dont need a complicated maths theory to know that if you have a less than 50% chance of winning your more likely to lose the more you play.

The odds of 26 blacks in a row is 66.6 million to 1.
The odds on 1000 blacks in a row, 64.8 quintillion to 1.

​@@lordfarquard9902 A low probability doesn't mean it won't happen... Let the game run for long enough and it's almost certain, that it will happen at some point.
With a software simulation, which executes millions of iterations pet second, it almost happens instantaneously.

@@lars7898 1000 in a row?
Maybe over a few billion years it would occur, but highly highly doubtful tbh.

​@@lordfarquard9902 It basically depends on how fast you play and on how big your start balance is. A simulation sacrifices all the money instantly, whereas playing in real life might take ages...
It's probable, that it works in the short term period. The higher the start balance, the longer the initial working period.
But when running the simulations, I noticed that the balance usually maxes out at 1.3-1.5 times the start balance. After that, there is usually a chain of blacks or reds, which makes the player go bankrupt.

@@lars7898 I have a system of starting with 635 and quitting at 800 using 5 as a stake. Basically trying to get 33 blacks before a chain of 7 reds/0s in a row occurs. It’s been successful so far but I’m not delusional.
It will get the full 635 eventually. Just waiting for it to happen. 12 days in a row lucky so far haha

The expected value is always 0.
If you bet k pounds and you win, you win k pounds.
If you bet k pounds and you lose, you lose k pounds, so you win -k pounds.
Averaging the two to get the expected value is 0.

If probability to double your money is 38,6 percent and probability to lose all your money is 61,4 then the expected value is negative.

@@themasterofthemansion3809 No, you are missing a point here. With the martingale as the guy explained it in the video you are not counting the extra profits you get every time an iteration wins a pound, this is not added to your bank. He did that for simplicity reasons. So this extra money you will end up having everytime you actually lose all your bank will on average account for the extra 11.4% to get you to 50-50. With a fair 50-50 game, whatever strategy you follow your value is zero so doubling your bet is 50-50 whatever you do. The strategy is only affecting the variance not the expected value.

@@themasterofthemansion3809 But it's not what happens here. When you hit the losing stop condition the expected amount of money you won beforehand exactly compensates this negative value.
So you have 38.6% chance of doubling your pot, and 61.4% chance of not doubling it and leave with anywhere from 0 pound to your initial pot.

I would have really liked if he had explained that or even calculated the expected value to show it's 0. Our prof. used a seesaw as an analogon with weights on both ends, where one weight corresponds to winning and one to loosing. The size of the weights equal the amounts you get/lose and the distance from the anchor point the probability to win/lose. In a fair game like the one in the video the seesaw is balanced and different strategies are using different weights at different distances to keep the balance. Like @HammerTh said the shown strategy is having a small winning weight close to the center and a very big losing weight far out, where classic lottery is the exact opposite.

Truth!

The thing is if you bet all of yor money 1 time and you lose you'll have nothing. If you'll keep betting your money with the Martingale strategy and you lose you'll still have some money that you've won previously. So it's evens out

@@Slyzor1 No, you will not. Do the math.

@@NeverTalkToCops1 The strategy described includes not adding your winnings to your stake, so you can only lose all of your money if it happens on the first attempt. If it happens on the nth attempt, then you've already won n-1 times and so still have all of those winnings.

@@NeverTalkToCops1 Yes, you will. If you go through 63 iterations before losing you'll end up with $63 at the end. If you bet all your money on the first round and lose you end up with $0 at the end.

if he didn't figure it out by himself i doubt this video will help him

That kind of person is a rarely convinced by a reasoned argument.

Either your brother is really lucky and it does seem to work for him

Or you could just offer to play against him.

Is he rich?

Slot machine: the computer choses what it gives you. They can even be reprogrammed to give better or worse average output.

@@Lulink013 also, the operator can and will reprogram the machine accordingly

Check out minding the data, he makes videos like that

Yeah - my suspicions were raised as soon as he said 0.366 (i.e. approx 37%) for the first case. I was sure 1/e was coming. It comes up all over the place in these probability/strategy problems.
For example, I think it's the probability (limit) of no-one choosing themselves at Secret Santa. Also, it comes up in the "Secretary Problem".

I first remember encountering them during nuclear decay and stuff. Nowadays the 1/e and 1-1/e appears everywhere.

@@matthewcooke4011 That (1+1/n)^n converges to 1/e is actually the reason you see the e^(-m) in the probability function for a Poisson distribution e^(-m)*(m^x)/x!. Plug in m=1 and x=0 and you get that the probability that nothing happens over a time period where it on average ought to have happened once in that time period is.... wait for it... 1/e :)

@@TomRocksMaths you are more precious than knowing negative number

Thats why you reset to 1 everytime you win

@Oyvind Lie Did you even watch the video?

@@Emetris No. Play long enough, and you will eventually have a streak of bad luck sufficient to either bankrupt you or take you past the maximum allowed bet.

No, that's not the take away. You're odds are 50/50. No matter the strategy. Some people will use this strategy and be fine. And some will lose it all. Regardless of how long you play for.

No, you won't live forever. Your odds of winning are equal to losing if you have infinite money and finite time.

I mean he has his PHD already, so he probably doesnt really do exams anymore ;)
Also, e is preprogrammed in most calculators. The navier stokes equation he has could be of more use but he literally wrote his thesis on that so I guess hes got it down already.
Could come in handy for some students taking exams with him watching though

@@kcbsuiejd jajaja

He's not allowed to play Pokémon Crystal anymore too

we did imagine it at our university and now it's in the regs: all tattoos must be covered for the duration of the exam. We even (allegedly) provide the exam invigilators with a box of plasters to stick over tattoos. You can never be too prepared or too cunning when it comes to university exams.

Pretty sure thats not true, betting the same on a 50/50 over and over is guaranteed to win eventually. The strategy, if no maximum bet is in place, does work, and I have personally used it at a 100% success rate of coming out with more than I started.

@@GoddaryuTUBE No. You need to check more thoroughly how these things work.

@@BigParadox Nah it's most definitely a thing in probability, that if you bet the same thing over and over in a 50/50, even though each toss is individual, the odds of getting it correct increases with each attempt. So maybe it's you that doesn't truly understand how things work.

@@GoddaryuTUBE lol, make this thought experiment: A and B toss a coin (50/50) repeatedly. They bet money on each toss. According to your belief both are going to be winners in the long run. That is clearly not possible.

quite literally if you have unlimited money and no bet limits and you double your bet every loss there is absolutely no way you dont come out a winner how you can't comprehend that eventually you will win and a single win even after 100 loses is still coming out an overall winner@@BigParadox

Thank you! I was hoping someone would notice this.

Problem is you can double your money or halve it anytime, casino or not (:

"Yay! My amount of money got infiniter!"

No sane person goes into a casino expecting to come out richer. So I would say infinitely rich people have at least as much reason to enter as regular folk.

Fun?

To make it very slightly less silly, I think it would also work if the casino was willing to give you infinite credit to gamble with.

it's exactly the same math as the regular Martingale, except you change the signs: winning becomes losing, and losing becomes winning.

The math is identical. It's just that now you're asking, "If I'm a casino, what are my chancing of making $X if a gambler employs reverse Martingale?"
Keep in mind that with 50% odds, every bet is symmetric: When the player bets $1, the casino is also betting $1. You could model this by having both the casino and the player place $1 on the table, with the winner collecting the $2.

Funnily enough, even if the odds are 60/40 in your favor in this game and you double your bet everytime you win, the expected value of each bet is always greater than zero which means that to reach max profit you should never stop playing, but if you never stop playing you will eventually lose all your money with a 100 % certainty.

That seems like a really bad strategy given that you won't know how many times you lose between winning. With the normal Martingale, the increase on loss means your wins will always put you back in the positive. Reversing that means you could lose enough times in a row that winning, doubling your bet, and winning again may not be enough to even get you out of the hole.
For instance, say you start with a win streak. You bet 1 and win, so your current profit is 1. You double to 2 and win, so your current profit is 3. Say you get to betting 16 before you finally lose. Thanks to the math of the Martingale strategy, we know you'll now be 1 in the negative, so all your winning was for nothing. Now say you lose a few times in a row; the losses will continue digging the hole without increasing the bet, so you get down to negative 4. A win from here will only dig you out by 1, so even winning again the very next round (betting 2) will just get you back to being down by 1.
Essentially, the Martingale strategy isn't a bad strategy for small gain (you'd need a bad losing streak to wind up with nothing), it would just be difficult to go so far as doubling your money with it. Trying to reverse it, however, would be a fast way to lose all your money, even while you're winning half the time.

@@granite_planet Thanks for the broken brain.

...sure? ;-)

Or at least the mathematician ones.

Isn't it 50%?

That's not even the formula for E. The correct formula is the limit as n approaches infinity, of the quantity (1 + 1/n)^n

@@NeverTalkToCops1 yup I know. But it's clear that it will be related to e.

When are your plans...I'll join

and before we do that, we want to earn as much capital as we can!

@@ethancheung1676 up to the highest possible maximum bet... though I also plan to use a casino promotion for free chips because they often do those and it can "hedge" the bet a bit

Hence the 38%+ number. The remaining 12%- number accounts for the money you put aside to bring the true odds back to the starting 50/50. Ultimately what this strategy will do is allow you to win a smaller amount more often and lose a bigger amount less often. In the end, it's always 50/50.

Any one that didn't get that deserves to lose all of their money

It's not a paradox. If you have infinite money, you will keep winning fresh dollar bills. The only issue is that its not physically meaningful to have infinite money.

Jeremy,Please change ur profile pic.

I've lost at least 13 times in a row betting on 25 cent video roulette. I was winning for a while until I went on a huge losing streak.

there’s a lot of great poker math videos out there to cover basics like that- it would be interesting to hear them explain nash equilibrium

What is interesting is that I would have thought that the constant that the odds of doubling was going to trend towards was .5, but instead it's e. I think an explanation for why this is the case would be an awesome follow up video. Tom does talk about how e tends to show up all the time when it comes to gambling, or interest growth.

@@xIPatchy Yeah, it seems weird to me as well - I would have expected the chances of doubling your money to always be 50 % no matter what kind of tricks you do with your betting. I honestly don't understand how just betting with a changing amount of money manages to lower the expected value of total winnings for the night. My math intuition says that everything should cancel out and just approach 50 %.

@@xIPatchy I think it comes from "how many times would you need to play how many times to ..."

@@granite_planet I had a doubt
If 2 players with equal initial amounts bet on opposite colours each time, then each of them should have equal probability of doubling which should be 0.5
But after some thought I realised that not every outcome results in a player losing all money which goes in doubling the opponents pocket. So even if the player loses 1 bet, that's not considered in this probability so we exclude those cases.
I think u had the same doubt. Hope its resolved

@@granite_planet Maybe it has to do with the fact that with this betting strategy, you are always angling towards winning an extra pound, vs simply betting the same amount every time would average out to being 0 sum. I don't understand it either.