Playing Texas Hold'em Online, The Professional Guide - Chapter 4-2

Pocket Card Odds

Hole Cards (Dealt)	Dealt	Percent	Expected	Percent
Suited Starters	680,351	23.56%	679,596	23.53%
Connected Starters	454,220	15.73%	453,064	15.69%
Suited Connected Starters	114,304	3.96%	113,266	3.92%
Paired Starters
AA	13,010	0.45%
KK	13,182	0.46%
QQ	13,122	0.45%
JJ	13,069	0.45%
TT	12,886	0.45%
99	13,092	0.45%
88	13,046	0.45%
77	13,111	0.45%
66	13,130	0.45%
55	13,173	0.46%
44	13,015	0.45%
33	13,075	0.45%
22	13,076	0.45%
All Paired Starters	169,987	5.89%	169,899	5.88%
AK Suited Starters	8,717	0.30%	8,713	0.30%
AK Offsuit Starters	26,051	0.90%	26,138	0.90%
All AK Starters	34,768	1.20%	34,851	1.21%

THE RULE OF FOUR-TWO

The rule of four-two is an easier way to figure the odds for any situation where you know your outs. It is not completely accurate but it will give you a quick ballpark figure of your chances for making a hand.

Here is how it works.

With two cards to come after the flop you multiply your number of outs by four. With one card to come after the turn, you multiply your number of outs by two.

This will give you a quick figure to work with.

If you have a four-card flush after the flop you have nine outs. With two cards to come, you multiply the nine by four and you get 36 percent chance of making the flush.

The chart shows the true odds at 35 percent. With one card to come you multiply nine by two and get 18 percent. The chart shows that the true figure is 19.6. It is not completely accurate but it is pretty close, and it is an easy calculation to do in your head

How to calculate hand odds (the longer way):

Once you know how to correctly count the number of outs you have on a hand, you can use that to calculate what percent of the time you will hit your hand by the river. Probability can be calculated easily for a single event, like the flipping of the river card from the turn. This would simply be: Total Outs / Remaining Cards. For two cards however, like from the flop to the river, it's a bit more complicated. This is calculated by figuring the probability of your cards not hitting twice in a row. This can be calculated as shown below:

• Flop to River % = 1 - [ ((47 - Outs) / 47) * ((46 - Outs) / 46) ]
• Turn to River % = (47 - Outs) / 46

The number 47 represents the remaining cards left in the deck after the flop (52 total cards, minus 2 in our hand and 3 on the flop = 47 remaining cards). Even though there might not technically be 47 cards remaining, we do calculations assuming we are the only players in the game. To illustrate, here is a two over card draw, which has 3 outs for each over card, giving a total of 6 outs for a top pair draw:

However, most of the time we want to see this in hand odds, which will be explained after you read about pot odds. To change a percent to odds, the formula is:

Odds = ( 1 / Percentage ) - 1

Thus, to change the 24% draw into an odd we can use, we do the following:

ANALYZING PROBABILITIES IN DEPTH

You may want to skip this section and go back to it later. Some of this is pretty deep. But important!

Getting a handle on the probability of being dealt various poker hands is one of the most important and valuable skills a player can have. We present a number of different ways to do these calculations, from a rough guesstimate system called the 2-4 Rule to the actual combination math.

The first odds calculation that must be made is to determine the total number of possible poker hands in a deck.

As we've shown, a poker hand consists of 5 cards drawn from a deck of 52 cards. Therefore, the number of combinations is COMBIN(52, 5) = 2,598,960.

If you use Microsoft Excel, you can duplicate these calculations using the COMBIN factor. COMBIN returns the number of combinations for a given number of items. To find the COMBIN factor in Excel go to INSERT . . . FUNCTION . . . MATH & TRIG.

For each of the above "Number of Combinations" we divide by this number to get the probability of being dealt any particular hand.

For the calculations, we will first split out the no Pair hands which include Royal Straight flush, Straight flush, Flushes, Straights, and nothings. Then, we will look at all combinations that have at least 1 pair.

The cards in a hand without any pairs will have 5 different denominations selected randomly from the 13 available (2, 3, 4...Ace). Also, each of the 5 denominations will select 1 suit from the four available suits. Thus, the total number of no-pair hands will equal:

COMBIN(13, 5) * (COMBIN(4, 1))^5 = 1287 * 1024 = 1,317,888.

A Straight Flush is made up of 5 consecutive cards in the same suit and may have a high card of 5, 6, 7, 8, 9, 10, Jack, Queen, King, or Ace for a total of 10 different ranks. Each of these may be in any of 4 suits. Thus, there are 40 possible Straight flush. An Ace high Straight Flush is a Royal Flush. Since there are only 4 different suits there are only 4 possible Royal Straight flush. When we subtract the 4 Royal Straight flush from the total of 40 Straight flush, we are left with 36 other Straight flush that are King high or less.

A Flush consists of any 5 of the 13 cards from a particular suit. There are 4 possible suits. The number of possible flushes is: COMBIN(13, 5) * 4 = 5,148. However, this includes the 40 possible Straight flush. When we subtract these out, we are left with: 5,148 - 40 = 5,108 possible ordinary flush.

A straight consists of 5 cards with consecutive denominations and may have a high card of 5, 6, 7, 8, 9, 10, Jack, Queen, King, or Ace for a total of 10 different ranks. Each of these 5 cards may be in any of the 4 suits. Thus, there are 10 * 4^5 = 10,240 different possible straights. However, this total includes the 40 possible Straight flush. Thus, we subtract 40, which leaves us with 10,200 possible ordinary straights.

Finally, we come to the nothing hands which are basically all the left over garbage. This is simply the total number of no Pair hands minus all the good stuff. This gives us: 1,317,888 - 4 - 36 - 5,108 - 10,200 = 1,302,540 nothing hands.

How about the odds of getting 1 pair or better?

A hand with just 1 pair has 4 different denominations selected randomly from the 13 available denominations. 3 of these denominations will select 1 card randomly from the 4 available suits. The 4th denomination will select 2 cards from the available 4 suits. Finally, the pair can be any one of the four available denominations. Thus, the calculation is: COMBIN(13, 4) *(COMBIN(4, 1))^3 * COMBIN( 4, 2) * 4 = 1,098,240 possible hands that have just one pair.

The calculation for a hand with two pairs is similar. We will have 3 random denominations taken from the 13 available. Two of these denominations will use 2 of the four available suits while the third denomination selects 1 of the four available suits. The singleton card may be any one of the three denominations. Thus, the calculation becomes: COMBIN(13, 3) * (COMBIN(4, 2))^2COMBIN(4, 1) * 3 = 123,552 possible hands with 2 pairs.

Three of a kind is calculated in a similar manner. There will be 3 different denominations from the 13 possible denominations. One denomination will select 3 of the 4 available suits while the other two denominations select 1 card from each of the 4 possible suits. Finally, the three of a kind can be in any of the three denominations. The calculation becomes: COMBIN(13, 3)COMBIN(4, 3) * (COMBIN(4, 1))^2 * 3 = 54,912 possible hands with 3 of a kind.

The next calculation will be for a Full House. A Full House only uses 2 of the 13 denominations. One of these will select 3 cards from the 4 available while the other selects 2 cards from the 4 available. Finally, the denomination that has 3 cards can be either one of the 2 denominations that we are using. This gives us: COMBIN(13, 2) * COMBIN(4, 3) * COMBIN(4 , 2) *2 = 3,744 possible Full Houses.

The final calculation is for 4 of a kind. Again, we will select 2 denominations from the 13 available. One of these will select 4 cards from the 4 available (Obviously the only way to do this is to take all four cards.) while the other denomination takes 1 of the available 4 cards. The denomination that has 4 of a kind can be either one of the 2 available denominations.

Thus, the calculation becomes: COMBIN(13, 2) * COMBIN( 4, 4) * COMBIN( 4, 1) * 2 = 624 different ways of being dealt 4 of a kind.

Poker Odds From The Turn

Many players who really understand Hold'em odds still tend to forget that the 'turn' can change their odds dramatically. It's true that for a flush draw, the card odds are 1.9 to 1 from the flop to the river. However, this is a theoretical situation where it assumes there is no additional betting on the turn. Typically, this is not going to be the case so you will need to recalculate your card odds and pot odds.

We will use the flush calculation example again and run through it 100 times assuming there was $20 in the pot on the flop with two $5 bets. On the turn, this leaves $30 in the pot, plus a $10 bet from your opponent to call.

Now, you can see that what was a very profitable draw on the flop suddenly turned into a not-so-great draw on the turn. This is because by not hitting your flush by the turn, it lowered your chances of making a flush by the river. The odds thus increased to 4.1 to 1 instead of 1.9 to 1. So even though the pot odds remained the same at 4:1, because the card odds went down, this flush draw has now become unprofitable.

Realizing the dynamic changes in your odds is extremely important so that you don't go making incorrect draws based on odds from the flop. Just remember that your odds essentially double from the flop to the turn, so adjust your play accordingly.

Each entry in the following table is the result of 1,000,000 simulated hands of Texas Hold'em played to the showdown and represents the percentage of pots won (including partial pots in the case of splits) by the indicated hand against the indicated number of opponents holding random hands.

The study shows a very clear correlation between your odds of success against the number of players. Notice the JJ, TT, 99 anomalies where the power of these cards increase dramatically over perceived better pocket cards - depending on how many players are left. The hands indicated in BOLD can have impressive results but require aggressive raising to force out weaker players.

Opponents	1	2	3	4	5	6	7	8	9
AA	85.3	73.4	63.9	55.9	49.2	43.6	38.8	34.7	31.1
KK	82.4	68.9	58.2	49.8	43.0	37.5	32.9	29.2	26.1
QQ	79.9	64.9	53.5	44.7	37.9	32.5	28.3	24.9	22.2
AKs	67.0	50.7	41.4	35.4	31.1	27.7	25.0	22.7	20.7
AQs	66.1	49.4	39.9	33.7	29.4	26.0	23.3	21.1	19.3
JJ	77.5	61.2	49.2	40.3	33.6	28.5	24.6	21.6	19.3
KQs	63.4	47.1	38.2	32.5	28.3	25.1	22.5	20.4	18.6
AJs	65.4	48.2	38.5	32.2	27.8	24.5	22.0	19.9	18.1
KJs	62.6	45.9	36.8	31.1	26.9	23.8	21.3	19.3	17.6
ATs	64.7	47.1	37.2	31.0	26.7	23.5	21.0	18.9	17.3
AK	65.4	48.2	38.6	32.4	27.9	24.4	21.6	19.2	17.2
TT	75.1	57.7	45.2	36.4	30.0	25.3	21.8	19.2	17.2
QJs	60.3	44.1	35.6	30.1	26.1	23.0	20.7	18.7	17.1
KTs	61.9	44.9	35.7	29.9	25.8	22.8	20.4	18.5	16.9
QTs	59.5	43.1	34.6	29.1	25.2	22.3	19.9	18.1	16.6
JTs	57.5	41.9	33.8	28.5	24.7	21.9	19.7	17.9	16.5
99	72.1	53.5	41.1	32.6	26.6	22.4	19.4	17.2	15.6
AQ	64.5	46.8	36.9	30.4	25.9	22.5	19.7	17.5	15.5
A9s	63.0	44.8	34.6	28.4	24.2	21.1	18.8	16.9	15.4
KQ	61.4	44.4	35.2	29.3	25.1	21.8	19.1	16.9	15.1
T9s	54.3	38.9	31.0	26.0	22.5	19.8	17.8	16.2	14.9
A8s	62.1	43.7	33.6	27.4	23.3	20.3	18.0	16.2	14.8
K9s	60.0	42.4	32.9	27.2	23.2	20.3	18.1	16.3	14.8
J9s	55.8	39.6	31.3	26.1	22.4	19.7	17.6	15.9	14.6
A5s	59.9	41.4	31.8	26.0	22.2	19.6	17.5	15.9	14.5
Q9s	57.9	40.7	31.9	26.4	22.5	19.7	17.6	15.9	14.5
88	69.1	49.9	37.5	29.4	24.0	20.3	17.7	15.8	14.4
AJ	63.6	45.6	35.4	28.9	24.4	21.0	18.3	16.1	14.3
A7s	61.1	42.6	32.6	26.5	22.5	19.6	17.4	15.7	14.3
A4s	58.9	40.4	30.9	25.3	21.6	19.0	17.0	15.5	14.2
A6s	60.0	41.3	31.4	25.6	21.7	19.0	16.9	15.3	14.0
A3s	58.0	39.4	30.0	24.6	21.0	18.5	16.6	15.1	13.9
KJ	60.6	43.1	33.6	27.6	23.5	20.2	17.7	15.6	13.9
QJ	58.2	41.4	32.6	26.9	22.9	19.8	17.3	15.3	13.7
77	66.2	46.4	34.4	26.8	21.9	18.6	16.4	14.8	13.7
T8s	52.6	36.9	29.0	24.0	20.6	18.1	16.2	14.8	13.6
K8s	58.5	40.2	30.8	25.1	21.3	18.6	16.5	14.8	13.5
AT	62.9	44.4	34.1	27.6	23.1	19.8	17.2	15.1	13.4
A2s	57.0	38.5	29.2	23.9	20.4	18.0	16.1	14.6	13.4
98s	51.1	36.0	28.5	23.6	20.2	17.8	15.9	14.5	13.4
K7s	57.8	39.4	30.1	24.5	20.8	18.1	16.0	14.5	13.2
Q8s	56.2	38.6	29.7	24.4	20.7	18.0	16.0	14.4	13.2
J8s	54.2	37.5	29.1	24.0	20.5	17.9	15.9	14.4	13.2
KT	59.9	42.0	32.5	26.5	22.3	19.2	16.7	14.7	13.1
JT	55.4	39.0	30.7	25.3	21.5	18.6	16.3	14.5	13.1
66	63.3	43.2	31.5	24.5	20.1	17.3	15.4	14.0	13.1
QT	57.4	40.2	31.3	25.7	21.6	18.6	16.3	14.4	12.9
K6s	56.8	38.4	29.1	23.7	20.1	17.5	15.6	14.0	12.8
87s	48.2	33.9	26.6	22.0	18.9	16.7	15.0	13.7	12.7
K5s	55.8	37.4	28.2	23.0	19.5	17.0	15.2	13.7	12.5
97s	49.5	34.2	26.8	22.1	18.9	16.6	14.9	13.6	12.5
T7s	51.0	34.9	27.0	22.2	19.0	16.6	14.8	13.5	12.4
K4s	54.7	36.4	27.4	22.3	19.0	16.6	14.8	13.4	12.3
76s	45.7	32.0	25.1	20.8	18.0	15.9	14.4	13.2	12.3
55	60.3	40.1	28.8	22.4	18.5	16.0	14.4	13.2	12.3
K3s	53.8	35.5	26.7	21.7	18.4	16.2	14.5	13.1	12.1
Q7s	54.5	36.7	27.9	22.7	19.2	16.7	14.8	13.3	12.1
44	57.0	36.8	26.3	20.6	17.3	15.2	13.9	12.9	12.1
J7s	52.4	35.4	27.1	22.2	18.9	16.4	14.6	13.2	12.0
33	53.7	33.5	23.9	19.0	16.2	14.6	13.5	12.6	12.0
22	50.3	30.7	22.0	17.8	15.5	14.2	13.3	12.5	12.0
K2s	52.9	34.6	26.0	21.2	18.1	15.9	14.3	13.0	11.9
86s	46.5	32.0	25.0	20.6	17.6	15.6	14.1	12.9	11.9
65s	43.2	30.2	23.7	19.7	17.0	15.2	13.8	12.7	11.9
Q6s	53.8	35.8	27.1	21.9	18.5	16.1	14.3	12.9	11.7
54s	41.1	28.8	22.6	18.9	16.5	14.8	13.5	12.5	11.7
Q5s	52.9	34.9	26.3	21.4	18.1	15.8	14.1	12.7	11.6
96s	47.7	32.3	24.9	20.4	17.4	15.3	13.7	12.4	11.4
75s	43.8	30.1	23.4	19.4	16.7	14.8	13.4	12.3	11.4
Q4s	51.7	33.9	25.5	20.7	17.6	15.4	13.7	12.4	11.3
T9	51.7	35.7	27.7	22.5	18.9	16.2	14.1	12.6	11.3
A9	60.9	41.8	31.2	24.7	20.3	17.1	14.7	12.8	11.2
T6s	49.2	32.8	25.1	20.5	17.4	15.2	13.6	12.3	11.2
Q3s	50.7	33.0	24.7	20.1	17.0	14.9	13.3	12.1	11.1
J6s	50.8	33.6	25.4	20.6	17.4	15.2	13.5	12.1	11.1
64s	41.4	28.5	22.1	18.4	15.9	14.2	12.9	11.9	11.1
Q2s	49.9	32.2	24.0	19.5	16.6	14.6	13.1	11.9	10.9
85s	44.8	30.2	23.2	19.1	16.3	14.3	12.9	11.8	10.9
K9	58.0	39.5	29.6	23.6	19.5	16.5	14.1	12.3	10.8
J9	53.4	36.5	27.9	22.5	18.7	15.9	13.8	12.1	10.8
J5s	50.0	32.8	24.7	20.0	17.0	14.7	13.1	11.8	10.8
53s	39.3	27.1	21.1	17.5	15.2	13.7	12.5	11.6	10.8
Q9	55.5	37.6	28.5	22.9	19.0	16.1	13.8	12.1	10.7
A8	60.1	40.8	30.1	23.7	19.4	16.2	13.9	12.0	10.6
J4s	49.0	31.8	24.0	19.4	16.4	14.3	12.8	11.5	10.6
J3s	47.9	30.9	23.2	18.8	16.0	14.0	12.5	11.3	10.4
74s	41.8	28.2	21.7	17.9	15.3	13.5	12.2	11.2	10.4
95s	45.9	30.4	23.2	18.8	16.0	13.9	12.4	11.3	10.3
43s	38.0	26.2	20.3	16.9	14.7	13.1	12.0	11.1	10.3
J2s	47.1	30.1	22.6	18.3	15.6	13.7	12.2	11.1	10.2
T5s	47.2	30.8	23.3	18.9	16.0	13.9	12.4	11.2	10.2
A7	59.1	39.4	28.9	22.6	18.4	15.4	13.2	11.4	10.1
A5	57.7	38.2	27.9	22.0	18.0	15.2	13.1	11.5	10.1
T4s	46.4	30.1	22.7	18.4	15.6	13.6	12.1	11.0	10.0
63s	39.4	26.5	20.4	16.8	14.5	12.9	11.7	10.8	10.0
T8	50.0	33.6	25.4	20.4	16.9	14.4	12.5	11.0	9.9
98	48.4	32.9	25.1	20.1	16.6	14.2	12.3	10.9	9.9
A4	56.4	36.9	26.9	21.1	17.3	14.7	12.6	11.0	9.8
T3s	45.5	29.3	22.0	17.8	15.1	13.2	11.8	10.7	9.8
84s	42.7	28.1	21.4	17.4	14.8	13.0	11.7	10.6	9.8
52s	37.5	25.3	19.5	16.1	14.0	12.5	11.4	10.6	9.8
T2s	44.7	28.5	21.4	17.4	14.8	13.0	11.6	10.5	9.7
A6	57.8	38.0	27.6	21.5	17.5	14.7	12.6	10.9	9.6
42s	36.3	24.6	18.8	15.7	13.7	12.3	11.2	10.4	9.6
A3	55.6	35.9	26.1	20.4	16.7	14.2	12.2	10.7	9.5
J8	51.7	34.2	25.6	20.4	16.8	14.1	12.2	10.7	9.5
K8	56.3	37.2	27.3	21.4	17.4	14.6	12.5	10.8	9.4
94s	43.8	28.4	21.3	17.3	14.6	12.7	11.3	10.3	9.4
87	45.5	30.6	23.2	18.5	15.4	13.1	11.5	10.3	9.3
73s	40.0	26.3	20.0	16.4	14.0	12.3	11.1	10.1	9.3
Q8	53.8	35.4	26.2	20.6	16.9	14.1	12.1	10.5	9.2
93s	43.2	27.8	20.8	16.8	14.3	12.5	11.1	10.1	9.2
32s	35.1	23.6	18.0	14.9	13.0	11.7	10.7	9.9	9.2
A2	54.6	35.0	25.2	19.6	16.1	13.6	11.7	10.2	9.1
92s	42.3	27.0	20.2	16.4	13.9	12.2	10.9	9.9	9.1
62s	37.5	24.8	18.8	15.4	13.3	11.8	10.7	9.8	9.1
K7	55.4	36.1	26.3	20.5	16.7	13.9	11.8	10.2	9.0
83s	40.8	26.3	19.8	16.0	13.6	11.9	10.7	9.7	8.9
97	46.7	30.9	23.1	18.4	15.1	12.8	11.1	9.8	8.8
82s	40.3	25.8	19.4	15.7	13.3	11.7	10.5	9.6	8.8
76	42.7	28.5	21.5	17.1	14.2	12.2	10.8	9.6	8.8
K6	54.3	35.0	25.3	19.7	16.0	13.3	11.3	9.8	8.6
T7	48.2	31.4	23.4	18.4	15.1	12.8	11.0	9.7	8.6
72s	38.1	24.5	18.4	15.0	12.8	11.2	10.1	9.2	8.5
65	40.1	26.7	20.0	15.9	13.3	11.5	10.2	9.2	8.5
K5	53.3	34.0	24.5	19.0	15.4	12.9	11.0	9.5	8.3
86	43.6	28.6	21.3	16.9	13.9	11.8	10.4	9.2	8.3
54	37.9	25.2	18.8	15.0	12.6	11.0	9.8	8.9	8.2
J7	49.9	32.1	23.5	18.3	14.9	12.4	10.6	9.2	8.1
K4	52.1	32.8	23.4	18.1	14.7	12.3	10.5	9.1	8.0
Q7	51.9	33.2	24.0	18.6	15.1	12.5	10.6	9.2	8.0
75	40.8	26.5	19.7	15.5	12.8	11.0	9.7	8.7	7.9
K3	51.2	31.9	22.7	17.6	14.2	11.9	10.2	8.9	7.8
96	44.9	28.8	21.2	16.6	13.5	11.4	9.8	8.7	7.8
K2	50.2	30.9	21.8	16.9	13.7	11.5	9.8	8.6	7.6
Q6	51.1	32.3	23.2	17.9	14.4	12.0	10.1	8.8	7.6
64	38.0	24.7	18.2	14.4	12.0	10.3	9.2	8.3	7.6
Q5	50.2	31.3	22.3	17.3	13.9	11.6	9.8	8.5	7.4
T6	46.3	29.2	21.2	16.5	13.4	11.2	9.5	8.3	7.3
85	41.7	26.5	19.4	15.2	12.4	10.5	9.1	8.1	7.3
53	35.8	23.3	17.1	13.6	11.4	9.9	8.8	8.0	7.3
Q4	49.0	30.2	21.4	16.4	13.3	11.0	9.4	8.1	7.1
J6	47.9	29.8	21.4	16.5	13.2	11.0	9.3	8.0	7.0
Q3	47.9	29.2	20.7	15.9	12.8	10.7	9.1	7.9	6.9
Q2	47.0	28.4	19.9	15.3	12.3	10.3	8.8	7.7	6.8
74	38.6	24.5	17.9	13.9	11.4	9.7	8.5	7.6	6.8
43	34.4	22.3	16.3	12.8	10.7	9.3	8.3	7.5	6.8
J5	47.1	29.1	20.7	15.9	12.8	10.6	8.9	7.7	6.7
95	42.9	26.7	19.2	14.8	12.0	10.0	8.5	7.4	6.6
J4	46.1	28.1	19.9	15.3	12.3	10.2	8.6	7.5	6.5
63	35.9	22.7	16.4	12.8	10.6	9.1	8.0	7.2	6.5
T5	44.2	27.1	19.3	14.8	11.9	9.9	8.4	7.2	6.4
J3	45.0	27.1	19.1	14.6	11.7	9.8	8.3	7.2	6.3
J2	44.0	26.2	18.4	14.1	11.3	9.4	8.0	7.0	6.2
T4	43.4	26.4	18.7	14.3	11.5	9.5	8.1	7.0	6.2
52	33.9	21.3	15.3	12.0	10.0	8.6	7.6	6.8	6.2
84	39.6	24.4	17.5	13.4	10.8	9.0	7.8	6.8	6.1
T3	42.4	25.5	18.0	13.7	11.0	9.1	7.8	6.8	6.0
42	32.5	20.5	14.7	11.5	9.5	8.3	7.3	6.6	6.0
T2	41.5	24.7	17.3	13.2	10.6	8.8	7.5	6.6	5.8
73	36.6	22.4	16.0	12.3	9.9	8.4	7.2	6.4	5.7
94	40.7	24.6	17.3	13.2	10.5	8.7	7.3	6.4	5.6
32	31.2	19.5	13.9	10.8	8.9	7.7	6.8	6.1	5.6
93	39.9	23.9	16.7	12.7	10.1	8.3	7.1	6.1	5.4
62	34.0	20.7	14.6	11.2	9.1	7.8	6.8	6.0	5.4
92	38.9	22.9	16.0	12.1	9.6	8.0	6.8	5.9	5.2
83	37.5	22.4	15.7	11.9	9.5	7.9	6.7	5.8	5.1
82	36.8	21.7	15.1	11.4	9.1	7.5	6.4	5.6	4.9
72	34.6	20.4	14.2	10.7	8.6	7.2	6.1	5.4	4.8