In fact, as long as you learn to calculate probability when playing any poker game, it will be of great help to winning cards! Actually, the same is true for stud! Today, the editor will bring you the Suha Probability Analysis! Everyone, please click in and take a look!

Suha Probability Analysis

The two kings left 52 cards, and the cards were 2. 3.4.5.6.7.8.9.10.J.Q.K.A. The suits were spades, hearts, plum blossoms, and squares.

There are 52 in total, which are 2598,960 cases.

Calculation: C top 5 bottom 52 = (52*51*50*49*48)/(5*4*3*2*1) = 2598960

1. Flush: There are 4 types of colors, and there are ten straights from 12345 to 10 JQKA, with a total of 4*10=40 types.

Calculation: C up to 1 down 4*C up to 1 down 10=4*10=40;

Probability: P=40/2598960=0.00001539

2. Flush: 4 kinds of colors, 13 one-sided pictures, 5 pictures are selected. Subtract 10 straights. There are 5108 kinds in total.

Calculation: C up to 1 down 4*【C up to 5 down 13-C up to 10】=4【(13*12*11*10*9)/(5*4*3*2*1)-10】=5108

Probability: P=5108/2598960=0.0019654

3Shift: There are ten straights on the card from 12345 to 10JQKA, and the suits are 4*4*4*4 minus 4 flushes. There are 10,200 types in total.

Calculation: C top 1 bottom 10*【4^5-4】=10*(1024-4)=10200

Probability: P3=10200/2598960=0.00392465

4. One stew plus single card (4+1): Choose one of the stews for 13 cards, and choose one of the other 48 cards in the remaining 48 cards, and there are 48 cards. There are 13*48=624 cases in total.

Calculation: C up to 1 down 13* C up to 1 down 12*4=13*12*4=624

Probability: P4=624/2598960=0.0002401

5. One pair of fried and a pair (3+2): Choose one of the 13 cards on the card, choose 3 for 4 suits; choose one of the 12 remaining cards, choose 2 for 4 suits. There are 3744 cases in total.

Calculation: C top 1 bottom 13*4* C top 1 bottom 12* C top 2 bottom 4=13*4*12*6=3744

Probability: P5=3744/2598960=0.00144058

6.AAdd two single cards to the fried card (3+1+1): Choose one of the 13 cards on the card, choose 3 for the 4 suits; choose 2 for the remaining 12 cards on the card, and choose 4 suits. There are 54,912 situations in total.

Calculation: C top 1 bottom 13*4* C top 2 bottom 12*4*4=54912

Probability: P6=54912/2598960=0.02112845

7. Add one single card for two pairs (2+2+1): There are 13 cards on the card and choose two pairs, and the suits are 4 choices; the other card only needs to choose one of the other 11 cards, and there are 4 suits; there are 123,552 cases in total.

Calculation: C top 2 bottom 13* C top 2 bottom 4* C top 2 bottom 4* C top 1 bottom 11*4=123552

Probability: P7=123552/2598960=0.04753902

8. Only one pair (2+1+1+1): Choose one pair for 13 cards on the board, choose 2 for 4 suits; choose 3 for the remaining 12 cards, and choose 4 for the suits. There are 1098,240 cases in total.

Calculation: C top 1 bottom 13* C top 2 bottom 4* C top 3 bottom 12*4*4*4=13*6*[(12*11*10)/(3*2*1)]*4*4*4=1098240

Probability: P8=1098240/2598960=0.42256903

9 Nothing is (1+1+1+1+1): Choose 5 cards on the 13 types of cards minus 10 straights; 4 flush types are minus 5th power of suit 4; there are 1302540 cases in total

Calculation: (C-5-13-C-1-1-10) (4^5-4) = (1087-10) (1024-4) = 1302540

Probability P9=1302540/2598960=0.50117739

Because the computer bit limit is approximately equal to 1.

The above is the full introduction to the stud probability analysis brought to you by the editor. I hope you can like this editor’s guide! More Soha personality skills guides are available on 87G mobile game network!

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