The probability that............
|
|
The odds against it are...........
|
You will hold a pair before the flop |
5.86 |
16 to 1 |
You will hold suited cards before the flop |
23.53 |
3.25 to 1 |
You will hold 2 Kings or 2 Aces before the flop |
0.90 |
110 to 1 |
You will hold Ace-King before the flop |
1.21 |
81.9 to win |
You will hold at least 1 Ace before the flop |
14.93 |
5.70 to 1 |
- |
- |
- |
If you have 4 parts of a Flush after flop, you will make it.... |
34.97 |
1.86 to 1 |
If you have 4 parts of open end Straight Flush after the flop, you will make a Straight Flush.. |
8.42 |
10.9 to 1 |
If you have 4 parts of an open end Straight Flush after the flop, you will make at least a straight..... |
54.12 |
0.85 to 1 |
If you have two pair after the flop, you will make a Full House or better.. |
16.74 |
4.97 to 1 |
If you have Three of a Kind after the flop, you will make a Full House or better........... |
33.40 |
1.99 to 1 |
If you have a pair after the flop at least one more of that kind will turn up (on the last 2 cards)......... |
8.42 |
10.9 to 1 |
20.......... |
0.18 |
1.12 |
- |
- |
- |
If you hold a pair, at least 1 more of that kind will flop......... |
11.76 |
7.51 to 1 |
If you hold no pair, you will pair at least 1 of your cards on the flop..... |
32.43 |
2.08 to 1 |
If you hold 2 suited cards, 2 or more of that suit will flop |
11.79 |
7.48 to 1 |
- |
- |
- |
If you begin suited and stay through seven cards, three more of your suit will turn up....... |
5.77 |
16.3 to 1 |
If you begin paired and stay through seven cards, at least 1 more of your kind will turn up....... |
19.18 |
4.21 to 1 |
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