MM Racing Chapter 2294 Gotham Music Chapter (33)
Chapter 2294 Gotham Music Chapter (33)
Chapter 2294 Gotham Music Festival (Thirty-three)
The key is not these complex probabilities, but the number of cards you draw in the end. No matter how many complete flower cards you have in your hand, you will only draw 10 cards in the end, and they are drawn randomly.
In other words, even if you have a royal flush in the deck, it is useless if you split all the cards when you draw the cards. The cards that determine the outcome are still a bunch of scattered cards, so you can only win by comparing the size of the cards.
The last 10 cards you draw are the key to victory or defeat, so how do you draw the exquisite cards in your deck?
While Roman was still thinking about this question, he heard a crisp bell and the staff next to him picked up the coin and prepared to toss it.
With a clang, the coin fell on the table, and the trident was facing upwards, so the right side was the god, and the one standing on the right was Roman.
Roman's hands tightened immediately. He could hardly hide his smile. Judging from the rules, the gods were more proactive. After all, they could decide how many cards they wanted to send. As long as they had a good hand, they could clear the junk cards one by one, unlike the believers who had to get three cards every round.
The believer offered sacrifice first. He saw Bruce on the opposite side casually draw three cards from his pile of cards and put them in the middle of the table. Roman reached out and took the three cards.
He had to see what Bruce's strategy was for this round, which could be seen from the size and suit of the cards he gave away.
As expected, Bruce dealt 2, 5, and 7, all diamonds. It seemed that he wanted to keep the flush, but didn't want Roman to have a straight, so he dealt the scattered cards of diamonds.
After having a little understanding, Roman directly sent these three cards together with the three of hearts in his hand back. Of course, he pretended to shuffle the cards before sending them back so that Bruce could not tell that they were the cards he sent over.
Bruce accepted all of them without showing any surprise, and then picked out three more cards and placed them in the middle of the table.
Roman picked it up and saw that this time it became 3, 6, and 8, and all of them were spades. The 8 of Spades was worth keeping because the number was relatively large, and because a 3 of Hearts had been given away before, receiving a 3 of Spades would make up for the missing 3.
That's right, Roman believes that the most initial card pattern is actually the most stable. In this case, the probabilities of all flower cards follow the initial probability, and unless you can only receive and not send, as long as one card is sent out, the initial probability will be destroyed and will definitely be reduced.
Although the cards will be collected and the probability of other flower cards will be increased, most of the collected cards are small cards. It is not cost-effective to increase the probability of small flower cards in exchange for a decrease in the probability of other flower cards.
Roman gave back the extra 6, only one this time, and Bruce still took it. When Bruce took out three cards again, Roman said, "I refuse."
Roman was very proud. Now his cards were changed from 3 of hearts to 3 of spades, with an additional 8 of spades. So from a probabilistic point of view, his cards still basically followed the initial probability.
From this round on, he refuses to accept all cards and gives away one in each round. He can clear 9 small cards and basically keep the initial probability of other big flower cards unchanged, which is most advantageous for him.
Bruce said nothing. He took back the cards he had just handed out and waited for Roman to hand out his cards. Roman naturally handed out his cards from small to large and even disrupted the order to prevent Bruce from guessing the order of his cards.
He sent out one card, which Bruce refused. Then it was Bruce's turn to send out three cards, which Roman refused.
Then things got into an awkward situation, they all gave away cards and then refused to accept them, and this went on for three rounds until the fifth round.
Although Roman now has a complete set of cards in his hand, so does Bruce, because they didn't exchange many cards at all, and basically both sides have a complete deck of cards.
Bruce just stood there silently, not even looking at Roman. Roman glanced to the side and cold sweat instantly broke out.
Bruce kept shuffling the cards in his hand and fiddling with the coins on the table. He occasionally looked back at the time, looking bored.
"I don't know why you want to bet with me?" Bruce shook his head and said, "Do you think that we are equals just standing on the same table? Are you really that naive?"
Bruce sighed, as if he was worried about Roman. He said, "So what if I lose? What can this ship do to me? What can the people behind you do to me? Either spend some money or some time. It can always be settled."
"I don't know how you got out of jail, but the person who rescued you must have wanted you to punch me hard. I can accompany you through ten rounds like this. In the end, it all depends on luck. It's just a game. I can use it to try my luck and don't care about winning or losing. What about you?"
Roman clenched his hands on the table again. Although he was reluctant to admit it, he knew that Bruce was right. If the stalemate continued, although the odds were equal on paper, the situations they faced outside the game were different. This would be a slow death for him.
Bruce can afford to lose, but Roman can't. Except for the people who brought him here, no one will allow him to fail like this. Even if he fails, it will not hit Bruce hard. Even if he can survive, Bruce will obviously not let him go. Not only can he not lose, he must win.
If this continues, after the next five rounds, when both players have similar chances, it will all be based on luck to draw 10 cards.
So the question is, if Roman's luck is better than Bruce's, why is Bruce still the richest man in the world, while he has become a prisoner?
Bruce yawned and said, "I'm tired of playing this game. How about this, if you give me three, I'll take three, and next time I'll give you three. If I take two, next time I'll give you two, and vice versa."
Roman was thinking, he knew that Bruce had seen through his weakness of not being able to afford to lose, so no matter what he said, it would be difficult to shake Bruce. But the current situation was not in his favor, and if he didn't make changes, he would be in big trouble.
Bruce had the initiative, so he could only accept Bruce's conditions. He nodded and said, "That's it."
They only have five rounds left. If they have three cards in each round, they will have to exchange 15 cards with each other. This is not a small number. It can completely affect the probability and even determine the final victory or defeat.
Roman firmly stuck to his plan. When Bruce handed him three cards, he took the ones he didn't have to complete his own hand, and gave the rest back, making up the shortfall with small cards.
What surprised Roman was that Bruce did not send the small cards back, and even the cards he sent over became bigger and bigger. At first they were just some big numbers, but later he started sending out JQK as well.
Roman was ecstatic when he got the big cards. He began to calculate in his mind that these big alphabetic cards originally had four cards of each suit. If he could get two more cards of each suit, it would become six cards of each suit, a total of 6 cards. The probability of drawing these cards would be greatly increased.
Then under the permutations and combinations, the probability of a royal flush is high. To put it another way, the probability of a big-name flush is also high. Even if it is not the top, a flush with Q, J, 10, 8, and 9 is almost unbeatable.
What's more, with 6 cards of each suit, it is easy to draw a leopard, that is, three cards with the same number. If a pair of letter leopards appear among the 10 cards, the probability of winning is greatly increased.
Roman then began to wonder why Bruce did this.
But the pressure made him unable to think so much. He just wanted all the big cards in Bruce's hand. However, according to the rules they set before, if he took three, he had to give three. If he wanted to take all three, he had to give three more cards in each round.
Roman weighed the pros and cons and decided that since he already had so many big cards, why not make big ones? He could just give away all the small cards.
"Why would he do this?" the man wearing the Megalodon mask questioned again, "Why would he give all the big brands to others?"
Stark sighed again and said, "The guy on the right has already lost."
He was referring to Roman, and everyone in the VIP seats looked at him, but Stark shook his head and said, "I'll explain it after it's revealed."
After five rounds of cards were changed, Roman looked at the neatly arranged hand of big cards with some disbelief. Almost all the small number cards were kicked out by him.
He silently counted the number of big flower cards in his current hand, thinking that he would win as long as he could draw certain combinations, such as a straight flush, or a leopard of K and Q, or even a royal flush.
Although Roman was not as smart as Bruce, he could at least calculate the probability of drawing various combinations. He found that his current hand of cards was at least three times higher than the basic probability. After all, the more times the same card was drawn, the greater the probability of drawing certain combinations.
With this in mind, he put the cards in order, watched as he and Bruce put all their cards into the machine, and this strange shuffling machine drew out 10 cards each to turn over.
The cards are flipped simultaneously, that is, two people flip the first card at the same time, and then flip the second card at the same time.
After Roman's first card was revealed, his heart immediately rose to his throat, because his first card was the King of Spades, which is a very large card, but this is normal, after all, there are no small cards in his hand.
Then came the Ten of Spades, and Roman felt his heart pounding, because now he had a chance to make a royal flush, which was the Ten of Spades, Jack, Queen, King, and Ace.
The third, fourth and fifth cards are the 10 of spades, the 9 of diamonds and the J of hearts respectively. Now Roman has the 9, 10 and J, completing half of the straight.
Next are the 8 of Spades, the King of Hearts, the 6 of Hearts, the Queen of Clubs and the 10 of Diamonds.
也就是说,罗曼现在有黑桃8、方片9、黑桃10、方片J、草花Q、黑桃K的顺子,剩下的散牌数字分别是10、6、10、K、。
This hand is already quite big. Not only is the straight up to the King, but the scattered cards are also very big. If you compare them in order, the priority is quite high.
At the same time, Bruce had turned over all his cards.
红桃2、草花5、草花7、草花J、黑桃9、方片3、草花3、草花4、草花6、方片A。
布鲁斯草花3、4、5、6、7同花顺获胜。
Roman stared at the 10 cards in disbelief. Then he rushed to the machine like crazy to get his cards back. He searched through the entire deck and only found four clubs.
There are 108 cards in two decks of playing cards. Excluding the 4 jokers, there are 104 cards left, which means 26 cards of each suit.
If Roman only has four clubs here, it proves that Bruce has 22 clubs, which is a little over half of the 54 cards.
Roman looked more closely and saw that he had 15 diamonds, which meant that Bruce had 11 diamonds, while Bruce's spades and hearts only added up to 19, 10 each and a 9 each.
也就是说,布鲁斯抽到草花方片黑桃红桃的概率大约为22:11:10:9,抽到最多的草花牌的概率约为0.42。
而罗曼则是4:15:16:17,抽到方片、红桃、黑桃的概率都在0.2~0.3之间。
Stark spread his hands and said:
"He forgot the most important thing. A straight flush is definitely bigger than a straight."
"It's true that the one on the right has a lot of big cards, but the probability of the three suits is equal, so the probability of getting a flush is small. The one on the left has a small hand, but the probability of drawing a club is greater than the probability of drawing any other card, and the small cards are not short of numbers, so he can get a straight and a flush at the same time."
"Even if he's unlucky and doesn't get a straight flush, at least he can get a flush, and a flush is bigger than a straight. That's why I said that guy is bound to lose. He was completely fooled by the other party."
"This is the simplest problem of probability of color. You don't have to consider the size of the numbers at all. The greater the probability of drawing the same color, the greater the chance of winning."
"The guy on the left first puts enough pressure on the opponent, making him feel that he must win, and then releases a big card. The purpose is to interfere with the opponent, making him just want to desperately gamble with a big card, and not notice that the probability of his own suit is being manipulated."
Stark pointed to Bruce on the left and said.
"He is just like all the dealers. He first puts pressure on the opponent, making him eager to win, and then gives him a taste of sweetness, making him indulge in the fantasy of victory. After losing his mind, he is unable to make sober calculations and finally falls for the simplest rules."
“The greater the pressure, the more you gamble, the more you want to make it big, the crazier you become, the less sober you become, and the more you lose—this is the eternal curse of a gambler.”
This game is self-created. I played a few games with my friends and it was quite interesting. The probability is very accurate, and there is a sense of pleasure in drawing ten cards in a row. You can try it.
(End of this chapter)