| The probability that... |
Expressed in percent is... |
The odds against it are... |
You will hold a Pair before the Flop
You will hold suited cards before
the Flop
You will hold 2 Kings or 2 Aces
before the Flop
You will hold Ace-King before the Flop
You will hold at least 1 Ace before
the Flop |
5.88
23.53
0.90
1.21
14.93
|
16 to 1
3.25 to 1
110 to 1
81.9 to 1
5.70 to 1
|
If you have four parts of a Flush after
the Flop, you will make it
If you have four parts of an Open-end
Straight-Flush after the Flop, you will
make a Straight-Flush
If you have four parts of an Open-end
Straight Flush after the Flop, you will
make at least a Straight
If you have Two-Pair after the Flop,
you will make a Full House or better*
If you have Three-of-a-kind after the
Flop, you will make a Full House or
better*
If you have a Pair after the Flop at
least one more of that kind will turn up
(on the last two cards) |
34.97
8.42
54.12
16.74
33.40
8.42
|
1.86 to 1
10.9 to 1
0.85 to 1
4.97 to 1
1.99 to 1
10.9 to 1
|
If you hold a Pair, at least one more
of that kind will Flop
If you hold no Pair, you will pair at
least one of your cards on the Flop
If you hold two suited cards, two or more
of that suit will Flop |
11.76
32.43
11.79
|
7.51 to 1
2.08 to 1
7.48 to 1
|
If you begin suited and stay through
seven cards, three more (But not
four or five more!) of your suit
will turn up
If you begin paired and stay through
seven cards, at least one more of
your kind will turn up |
5.77
19.18
|
16.3 to 1
4.21 to 1
|
