Number of different starting hands in Short Deck Omaha (and the Best Starting Hands)
My home game has recently introduced Short Deck Omaha into its rotation, a game not for the faint of heart. Very lively, very swingy, very fun.
As everybody knows by now, Short Deck is played with the 2's thru 5's removed, so the deck consists of 36 cards (Ace-Six). Short Deck is sometimes referred to as Six Plus but that name isn't used much anymore.
The question arose how many different starting hands are there in Short Deck Omaha. And we mean taking into account "suit isomorphisms". In regular 52-card HoldEm there are 169 (= 13*13) different starting hands where the C(52,2) = 1,326 boils down to 169 when you care about suited or unsuited hands, but don't care about the specific suits. Similarly, in short deck HoldEm there are 81 (= 9*9) different starting hands where you only care about suited or unsuited cards.
AhJh is suit-isomorphic to AdJd (they are both in the "AJ suited" bucket). And Ks8d is suit-isomorphic to Kc8h (they are both in the "K8 offsuit" bucket).
In both Long Deck Omaha (full 52-cards) and Short Deck Omaha (36-card deck), of course, players are dealt four hole cards so the "interactions" between suits and ranks are a bit more complex than in HoldEm. For example, AdKcTs7h is suit-isomorphic to AsKhTd7c, but AdKcTd7h is not suit-isomorphic to AsKhTd7s (the first hand has a suited AT whereas the second hand has a suited A7 and we care about that difference).
In Long Deck Omaha there are C(52,4) = 270,725 different starting hands (where each card is treated as unique) and in Short Deck Omaha there are C(36,4) = 58,905 different starting hands (again, where each card is treated as unique).
But what is the equivalent number for Omaha to the 169 suit-isomorphic number in Long Deck Holdem or the 81 in Short Deck HoldEm (for either Long Deck Omaha or Short Deck Omaha)?
I will first derive the Long Deck Omaha number (I am sure this derivation has been done many times by many different people). Then I will extend the derivation to Short Deck Omaha.
Number of Different Long Deck Omaha Suit-Isomorphic Starting Hands
There are five cases to consider and we will walk through each case.
Case 1: Quads
There are clearly C(13,1) = 13 different possible quad starting hands, one for each rank from Ace to Deuce. And each quads hand has exactly one way for the suits to appear. The suit-isomorphism concept doesn't come into play here.
Case 2: Trips (trips with a singleton)
There are C(13,2)*C(2,1) = 156 different rank combos for a 4-card hand with 3 cards of the same rank and the fourth card of a different rank.
For concreteness, suppose the ranks are KKKQ. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 2.1: Rainbow = (K)(K)(K)(Q) where the parentheses surround cards of the same suit. Here there are C(4,3) = 4 possible unique hands.
Subcase 2.2: One suit in common = (KQ)(K)(K). Here there are C(4,3)*3 = 12 possible unique hands.
Subtotal = 4+12 = 16
Case 3: Two Pair
There are C(13,2) = 78 different rank combos for a 4-card hand with 2 cards of one rank and the other two cards of a different rank.
For concreteness, suppose the ranks are KKQQ. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 3.1: Rainbow = (K)(K)(Q)(Q). Here there are C(4,2) = 6 possible unique hands.
Subcase 3.2: One suit in common = (KQ)(K)(Q). Here there are C(4,2)*2*2 = 24 possible unique hands.
Subcase 3.3: Two suits in common = (KQ)(KQ). Here there are C(4,2) = 6 possible unique hands.
Subtotal = 6+24+6 = 36
Case 4: One Pair (one pair and two singletons):
There are C(13,3)*C(3,1) = 858 different rank combos for a 4-card hand with 2 cards of one rank and the other two cards having two different ranks.
For concreteness, suppose the ranks are KKQJ. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 4.1: (K)(K)(Q)(J). Here there are C(4,2)*2 = 12 possible unique hands.
Subcase 4.2: (QJ)(K)(K). Here there are C(4,2)*2 = 12 possible unique hands.
Subcase 4.3: (KQ)(K)(J). Here there are C(4,2)*2*2 = 24 possible unique hands.
Subcase 4.4: (KJ)(K)(Q). Here there are C(4,2)*2*2 = 24 possible unique hands.
Subcase 4.5: (KQ)(KJ). Here there are C(4,2)*2 = 12 possible unique hands.
Subcase 4.6: (KQJ)(K). Here there are C(4,2)*2 = 12 possible unique hands.
Subtotal = 12+12+24+24+12+12 = 96
Case 5: No Pair (four singletons):
There are C(13,4) = 715 different rank combos for a 4-card hand with four different ranks.
For concreteness, suppose the ranks are KQJT. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 5.1: (K)(Q)(J)(T). Here there are 4! = 24 possible unique hands.
Subcase 5.2: (KQ)(J)(T). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.3: (KJ)(Q)(T). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.4: (KT)(Q)(J). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.5: (QJ)(K)(T). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.6: (QT)(K)(J). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.7: (JT)(K)(Q). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.8: (KQ)(JT). Here there are 4*3 = 12 possible unique hands.
Subcase 5.9: (KJ)(QT). Here there are 4*3 = 12 possible unique hands.
Subcase 5.10: (KT)(QJ). Here there are 4*3 = 12 possible unique hands.
Subcase 5.11: (KQJ)(T). Here there are 4*3 = 12 possible unique hands.
Subcase 5.12: (KQT)(J). Here there are 4*3 = 12 possible unique hands.
Subcase 5.13: (KJT)(Q). Here there are 4*3 = 12 possible unique hands.
Subcase 5.14: (QJT)(K). Here there are 4*3 = 12 possible unique hands.
Subcase 5.15: (KQJT). Here there are 4 possible unique hands.
Subtotal = 24+24+24+24+24+24+24+12+12+12+12+12+12+12+4 = 256
Let's put this information into a table.
Table of Info on Number of Long Deck Omaha Starting Hands
The first "Total" in the table above tells us that there are 16,432 different "suit-isomorphic" starting hands in Long Deck Omaha. The second "Total" in the table above tells us that there are 270,725 different starting hands in Long Deck Omaha when each card is treated as unique (meaning that we do not do any suit-isomorphic collapsing of hands). Of course, we encountered the 270,725 figure at the top of this post since this is exactly C(52,4). This shows that our breakdown into different rank categories and suit-rank subcases when combined into a whole gives the correct number, so we can have confidence that we did the breakdowns correctly.
Number of Different Short Deck Omaha Suit-Isomorphic Starting Hands
Now let's turn our attention to Short Deck Omaha. After a bit of thought, it is clear that the number of suit-rank subcases and number of unique hands per rank-combo are the same for both Long Deck and Short Deck. What is different, of course, is the number of rank-combos in each Hand Category since the number of ranks in Short Deck is collapsed to 9 (from 13 in Long Deck).
I will simply report the number of Short Deck rank-combos for the five categories below.
Quads: C(9,1) = 9
Trips: C(9,2)*C(2,1) = 72
Two Pair: C(9,2) = 36
One Pair: C(9,3)*C(3,1) = 252
No Pair: C(9,4) = 126
Let's make a new table reflecting these new Short Deck rank-combos.
Table of Info on Number of Short Deck Omaha Starting Hands
So we see from the table that there are a total of 3,663 different suit-isomorphic starting hands in Short Deck Omaha. The table also show that there are a grand total of 58,905 different unique starting hands in Short Deck Omaha which we can confirm by double-checking that C(36,4) = 58,905.
My ultimate goal is to eventually run a simulation to determine the best starting hands in Short Deck Omaha, but I fear that the computing time would not be feasible given how many deals (say of 6-max) would be required given that there are 3,663 different suit-isomorphic starting hands in Short Deck Omaha.
As everybody knows by now, Short Deck is played with the 2's thru 5's removed, so the deck consists of 36 cards (Ace-Six). Short Deck is sometimes referred to as Six Plus but that name isn't used much anymore.
The question arose how many different starting hands are there in Short Deck Omaha. And we mean taking into account "suit isomorphisms". In regular 52-card HoldEm there are 169 (= 13*13) different starting hands where the C(52,2) = 1,326 boils down to 169 when you care about suited or unsuited hands, but don't care about the specific suits. Similarly, in short deck HoldEm there are 81 (= 9*9) different starting hands where you only care about suited or unsuited cards.
AhJh is suit-isomorphic to AdJd (they are both in the "AJ suited" bucket). And Ks8d is suit-isomorphic to Kc8h (they are both in the "K8 offsuit" bucket).
In both Long Deck Omaha (full 52-cards) and Short Deck Omaha (36-card deck), of course, players are dealt four hole cards so the "interactions" between suits and ranks are a bit more complex than in HoldEm. For example, AdKcTs7h is suit-isomorphic to AsKhTd7c, but AdKcTd7h is not suit-isomorphic to AsKhTd7s (the first hand has a suited AT whereas the second hand has a suited A7 and we care about that difference).
In Long Deck Omaha there are C(52,4) = 270,725 different starting hands (where each card is treated as unique) and in Short Deck Omaha there are C(36,4) = 58,905 different starting hands (again, where each card is treated as unique).
But what is the equivalent number for Omaha to the 169 suit-isomorphic number in Long Deck Holdem or the 81 in Short Deck HoldEm (for either Long Deck Omaha or Short Deck Omaha)?
I will first derive the Long Deck Omaha number (I am sure this derivation has been done many times by many different people). Then I will extend the derivation to Short Deck Omaha.
Number of Different Long Deck Omaha Suit-Isomorphic Starting Hands
There are five cases to consider and we will walk through each case.
Case 1: Quads
There are clearly C(13,1) = 13 different possible quad starting hands, one for each rank from Ace to Deuce. And each quads hand has exactly one way for the suits to appear. The suit-isomorphism concept doesn't come into play here.
Case 2: Trips (trips with a singleton)
There are C(13,2)*C(2,1) = 156 different rank combos for a 4-card hand with 3 cards of the same rank and the fourth card of a different rank.
For concreteness, suppose the ranks are KKKQ. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 2.1: Rainbow = (K)(K)(K)(Q) where the parentheses surround cards of the same suit. Here there are C(4,3) = 4 possible unique hands.
Subcase 2.2: One suit in common = (KQ)(K)(K). Here there are C(4,3)*3 = 12 possible unique hands.
Subtotal = 4+12 = 16
Case 3: Two Pair
There are C(13,2) = 78 different rank combos for a 4-card hand with 2 cards of one rank and the other two cards of a different rank.
For concreteness, suppose the ranks are KKQQ. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 3.1: Rainbow = (K)(K)(Q)(Q). Here there are C(4,2) = 6 possible unique hands.
Subcase 3.2: One suit in common = (KQ)(K)(Q). Here there are C(4,2)*2*2 = 24 possible unique hands.
Subcase 3.3: Two suits in common = (KQ)(KQ). Here there are C(4,2) = 6 possible unique hands.
Subtotal = 6+24+6 = 36
Case 4: One Pair (one pair and two singletons):
There are C(13,3)*C(3,1) = 858 different rank combos for a 4-card hand with 2 cards of one rank and the other two cards having two different ranks.
For concreteness, suppose the ranks are KKQJ. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 4.1: (K)(K)(Q)(J). Here there are C(4,2)*2 = 12 possible unique hands.
Subcase 4.2: (QJ)(K)(K). Here there are C(4,2)*2 = 12 possible unique hands.
Subcase 4.3: (KQ)(K)(J). Here there are C(4,2)*2*2 = 24 possible unique hands.
Subcase 4.4: (KJ)(K)(Q). Here there are C(4,2)*2*2 = 24 possible unique hands.
Subcase 4.5: (KQ)(KJ). Here there are C(4,2)*2 = 12 possible unique hands.
Subcase 4.6: (KQJ)(K). Here there are C(4,2)*2 = 12 possible unique hands.
Subtotal = 12+12+24+24+12+12 = 96
Case 5: No Pair (four singletons):
There are C(13,4) = 715 different rank combos for a 4-card hand with four different ranks.
For concreteness, suppose the ranks are KQJT. How many different suit-isomorphism sub-cases are there and how many different unique hands exist in each subcase?
Subcase 5.1: (K)(Q)(J)(T). Here there are 4! = 24 possible unique hands.
Subcase 5.2: (KQ)(J)(T). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.3: (KJ)(Q)(T). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.4: (KT)(Q)(J). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.5: (QJ)(K)(T). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.6: (QT)(K)(J). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.7: (JT)(K)(Q). Here there are 4*3*2 = 24 possible unique hands.
Subcase 5.8: (KQ)(JT). Here there are 4*3 = 12 possible unique hands.
Subcase 5.9: (KJ)(QT). Here there are 4*3 = 12 possible unique hands.
Subcase 5.10: (KT)(QJ). Here there are 4*3 = 12 possible unique hands.
Subcase 5.11: (KQJ)(T). Here there are 4*3 = 12 possible unique hands.
Subcase 5.12: (KQT)(J). Here there are 4*3 = 12 possible unique hands.
Subcase 5.13: (KJT)(Q). Here there are 4*3 = 12 possible unique hands.
Subcase 5.14: (QJT)(K). Here there are 4*3 = 12 possible unique hands.
Subcase 5.15: (KQJT). Here there are 4 possible unique hands.
Subtotal = 24+24+24+24+24+24+24+12+12+12+12+12+12+12+4 = 256
Let's put this information into a table.
Table of Info on Number of Long Deck Omaha Starting Hands
Hand Category | # of Rank Combos | # of Suit-Rank Subcases | __Product__ | _____ | # of Rank Combos | # of Unique Hands per Rank Combo | __Product__ |
---|---|---|---|---|---|---|---|
Quads | 13 | 1 | 13 | . | 13 | 1 | 13 |
Trips | 156 | 2 | 312 | . | 156 | 16 | 2,496 |
Two Pair | 78 | 3 | 234 | . | 78 | 36 | 2,808 |
One Pair | 858 | 6 | 5,148 | . | 858 | 96 | 82,368 |
No Pair | 715 | 15 | 10,725 | . | 715 | 256 | 183,040 |
. | |||||||
TOTAL | 16,432 | 270,725 |
The first "Total" in the table above tells us that there are 16,432 different "suit-isomorphic" starting hands in Long Deck Omaha. The second "Total" in the table above tells us that there are 270,725 different starting hands in Long Deck Omaha when each card is treated as unique (meaning that we do not do any suit-isomorphic collapsing of hands). Of course, we encountered the 270,725 figure at the top of this post since this is exactly C(52,4). This shows that our breakdown into different rank categories and suit-rank subcases when combined into a whole gives the correct number, so we can have confidence that we did the breakdowns correctly.
Number of Different Short Deck Omaha Suit-Isomorphic Starting Hands
Now let's turn our attention to Short Deck Omaha. After a bit of thought, it is clear that the number of suit-rank subcases and number of unique hands per rank-combo are the same for both Long Deck and Short Deck. What is different, of course, is the number of rank-combos in each Hand Category since the number of ranks in Short Deck is collapsed to 9 (from 13 in Long Deck).
I will simply report the number of Short Deck rank-combos for the five categories below.
Quads: C(9,1) = 9
Trips: C(9,2)*C(2,1) = 72
Two Pair: C(9,2) = 36
One Pair: C(9,3)*C(3,1) = 252
No Pair: C(9,4) = 126
Let's make a new table reflecting these new Short Deck rank-combos.
Table of Info on Number of Short Deck Omaha Starting Hands
Hand Category | # of Rank Combos | # of Suit-Rank Subcases | __Product__ | _____ | # of Rank Combos | # of Unique Hands per Rank Combo | __Product__ |
---|---|---|---|---|---|---|---|
Quads | 9 | 1 | 9 | . | 9 | 1 | 9 |
Trips | 72 | 2 | 144 | . | 72 | 16 | 1,152 |
Two Pair | 36 | 3 | 108 | . | 36 | 36 | 1,296 |
One Pair | 252 | 6 | 1,512 | . | 252 | 96 | 24,192 |
No Pair | 126 | 15 | 1,890 | . | 126 | 256 | 32,256 |
. | |||||||
TOTAL | 3,663 | 58,905 |
So we see from the table that there are a total of 3,663 different suit-isomorphic starting hands in Short Deck Omaha. The table also show that there are a grand total of 58,905 different unique starting hands in Short Deck Omaha which we can confirm by double-checking that C(36,4) = 58,905.
My ultimate goal is to eventually run a simulation to determine the best starting hands in Short Deck Omaha, but I fear that the computing time would not be feasible given how many deals (say of 6-max) would be required given that there are 3,663 different suit-isomorphic starting hands in Short Deck Omaha.
My ultimate goal is to eventually run a simulation to determine the best starting hands in Short Deck Omaha, but I fear that the computing time would not be feasible given how many deals (say of 6-max) would be required given that there are 3,663 different suit-isomorphic starting hands in Short Deck Omaha.
My thought was to replicate what I did (and I am sure many others have done so before me) in the case of NLHE. I simulated millions and millions of 6-max NLHE deals, both long deck and short deck, and tabulated how often each hand won a deal.
Omaha simulations are more time-consuming than NLHE simulations, of course, since there are many more 5-card hands to evaluate for each player in Omaha (60 vs 21).
Another confounding effect is that there are only 169 suit-isomorphic hands in NLHE and their relative weights (4, 6, 12) are not too disparate so that it takes a reasonable number of deals (say 10 million) to get a clear picture of which suit-isomorphic hands are the best starting hands in NLHE. In Short Deck Omaha the 169 figure becomes 3,663 and the (4, 6, 12) relative "weights" become (1, 4, 6, 12, 24). This seems to elevate the required number of deals to get a clear picture of the best Short Deck Omaha starting hands to become very large.
I plan on setting up the machinery later this week and I hope to post preliminary results (if any) at that time. I suppose it is more likely that I'll simply post the runtime projections and give up at that time.
Omaha simulations are more time-consuming than NLHE simulations, of course, since there are many more 5-card hands to evaluate for each player in Omaha (60 vs 21).
Another confounding effect is that there are only 169 suit-isomorphic hands in NLHE and their relative weights (4, 6, 12) are not too disparate so that it takes a reasonable number of deals (say 10 million) to get a clear picture of which suit-isomorphic hands are the best starting hands in NLHE. In Short Deck Omaha the 169 figure becomes 3,663 and the (4, 6, 12) relative "weights" become (1, 4, 6, 12, 24). This seems to elevate the required number of deals to get a clear picture of the best Short Deck Omaha starting hands to become very large.
I plan on setting up the machinery later this week and I hope to post preliminary results (if any) at that time. I suppose it is more likely that I'll simply post the runtime projections and give up at that time.
I think I have coded things properly and kicked off a simulation of 1 million Short Deck Omaha 6-Max deals last night (all hands go to showdown on all deals). I will present the preliminary results in two separate tables.
The first table will list the top five starting hands (suit-isomorphic buckets) based upon raw tallies of number of deals won (each hand that ties gets 1/N).
Table 1: Best Short Deck Omaha 6-Max Starting Hands based upon Raw Tallies (very preliminary)
The second table will list the top five starting hands (suit-isomorphic buckets) based upon adjusted tallies of number of deals won where the raw tallies are divided by the number of unique hands in each suit-isomorphic bucket.
Table 2: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (very preliminary)
On first viewing these results look credible. Meaning that my simulation is very likely doing what I intended. Not too much should be put into the rankings based upon this preliminary simulation of only 1,000,000 deals.
I suppose it is clear to everybody the difference between the two tables. The first table based upon raw tallies gives a significant "advantage" to suit-isomorphic buckets containing many unique starting hands. This is the analog to NLHE where AK-offsuit wins more hands than AK-suited, but this is merely due to there being more AK-offsuit starting hands in NLHE than AK-suited starting hands (12 vs 4). Of course, the raw tallies need to be adjusted. When the number of times AK-offsuit wins is divided by the number of unique AK-offsuit starting hands (12) and the number of times AK-suited wins is divided by the number of unique AK-suited starting hands (4), AK-suited is seen to be a stronger starting hand than AK-offsuit.
The same "adjustment" is required in Omaha as well. Some Omaha starting hand suit-iso buckets contain many more unique starting hands than other starting hand suit-iso buckets. It is not surprising that the top five starting hand buckets in Table 1 all contain 24 unique starting hands (24 being the max possible). When the relevant adjustment is made, these single-suited hand buckets correctly slide down the ranking and double-suited hands correctly move up.
I don't want to spend any time discussing the specific results (other than to say they look reasonable). As discussed in a previous post in this thread, I presume that many many millions of deals will be required to get a solid ranking (and even then the specific ranks among the top 10 hands, say, will probably not be conclusive). That is, I imagine that the top 10 (top 20, top 50, etc.) hands will be identified as a group but where each hand falls within the group will be less well-defined.
I will now kick off additional simulations.
The first table will list the top five starting hands (suit-isomorphic buckets) based upon raw tallies of number of deals won (each hand that ties gets 1/N).
Table 1: Best Short Deck Omaha 6-Max Starting Hands based upon Raw Tallies (very preliminary)
__Rank per Raw Tallies__ | Starting Hand (suit-iso bucket) | # of Unique Hands in suit-iso bucket |
---|---|---|
1 | Single-suited Aces & Kings | 24 |
2 | Single-suited Aces & Queens | 24 |
3 | Single-suited Aces & Tens | 24 |
4 | Single-suited Aces & Jacks | 24 |
5 | Single-suited Kings & Tens | 24 |
The second table will list the top five starting hands (suit-isomorphic buckets) based upon adjusted tallies of number of deals won where the raw tallies are divided by the number of unique hands in each suit-isomorphic bucket.
Table 2: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (very preliminary)
Rank per Adjusted Tallies | Starting Hand (suit-iso bucket) | # of Unique Hands in suit-iso bucket |
---|---|---|
1 | Double-suited Aces & Jacks | 6 |
2 | Double-suited Aces & Kings | 6 |
3 | Double-suited Aces & Queens | 6 |
4 | Double-suited Aces & Tens | 6 |
5 | Double-suited (AT) (QJ) | 12 |
On first viewing these results look credible. Meaning that my simulation is very likely doing what I intended. Not too much should be put into the rankings based upon this preliminary simulation of only 1,000,000 deals.
I suppose it is clear to everybody the difference between the two tables. The first table based upon raw tallies gives a significant "advantage" to suit-isomorphic buckets containing many unique starting hands. This is the analog to NLHE where AK-offsuit wins more hands than AK-suited, but this is merely due to there being more AK-offsuit starting hands in NLHE than AK-suited starting hands (12 vs 4). Of course, the raw tallies need to be adjusted. When the number of times AK-offsuit wins is divided by the number of unique AK-offsuit starting hands (12) and the number of times AK-suited wins is divided by the number of unique AK-suited starting hands (4), AK-suited is seen to be a stronger starting hand than AK-offsuit.
The same "adjustment" is required in Omaha as well. Some Omaha starting hand suit-iso buckets contain many more unique starting hands than other starting hand suit-iso buckets. It is not surprising that the top five starting hand buckets in Table 1 all contain 24 unique starting hands (24 being the max possible). When the relevant adjustment is made, these single-suited hand buckets correctly slide down the ranking and double-suited hands correctly move up.
I don't want to spend any time discussing the specific results (other than to say they look reasonable). As discussed in a previous post in this thread, I presume that many many millions of deals will be required to get a solid ranking (and even then the specific ranks among the top 10 hands, say, will probably not be conclusive). That is, I imagine that the top 10 (top 20, top 50, etc.) hands will be identified as a group but where each hand falls within the group will be less well-defined.
I will now kick off additional simulations.
Here are the results of a simulation of 10 million Short Deck Omaha 6-Max deals (all hands go to showdown on all deals). To remove any uncertainty on this issue, these simulations use the "new" short deck rules in which a flush beats a full house but a straight beats three-of-a-kind. I will present the results in two separate tables.
The first table will list the top 25 starting hands (suit-isomorphic buckets) based upon raw tallies of number of deals won (each hand that ties gets 1/N).
Table 1: Best Short Deck Omaha 6-Max Starting Hands based upon Raw Tallies (10 million deals)
Recall that the parentheses surround cards in the same suit. So the first entry in the table (AK) (A) (K) is single-suited aces-and-kings. The second entry in the table (AQ) (A) (Q) is single-suited aces-and-queens. These two appear clearly ahead of all other starting hand suit-iso buckets.
The second table will list the top 25 starting hands (suit-isomorphic buckets) based upon adjusted tallies of number of deals won where the raw tallies are divided by the number of unique hands in each suit-isomorphic bucket.
Table 2: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (10 million deals)
To repeat what I said above, I am sure it is clear to everybody the difference between the two tables. The first table based upon raw tallies gives a significant "advantage" to suit-isomorphic buckets containing many unique starting hands. This is the analog to NLHE where AK-offsuit wins more hands than AK-suited, but this is merely due to there being more AK-offsuit starting hands in NLHE than AK-suited starting hands (12 vs 4). Of course, the raw tallies need to be adjusted. When the number of times AK-offsuit wins is divided by the number of unique AK-offsuit starting hands (12) and the number of times AK-suited wins is divided by the number of unique AK-suited starting hands (4), AK-suited is seen to be a stronger starting hand than AK-offsuit.
The same "adjustment" is required in Omaha as well. Some Omaha starting hand suit-iso buckets contain many more unique starting hands than other starting hand suit-iso buckets. It is not surprising that the top 25 starting hand buckets in Table 1 all contain 24 unique starting hands (24 being the max possible). When the relevant adjustment is made, these single-suited hand buckets correctly slide down the ranking and double-suited hands correctly move up.
The first entry in Table 2 shows that the best starting hand in Short Deck Omaha (based upon this simulation) is Double-Suited Aces & Kings. The Raw Tally shows that Double-Suited Aces & Kings won 1,993 of the 10 million deals (if N hands tie they each get 1/N). And when adjusted for how many unique hands are double-suited aces-and-kings (6), the Adjusted Tally is 332. The interpretation is that a specific double-suited aces-and-kings hand, say [As Ah Ks Kh] won 332 of the 10 million 6-max short deck omaha deals.
There is a lot of information to be gleaned from the above tables. Since I am a novice in short deck omaha, I will not presume to interpret the reasons and nuances behind the above rankings.
As discussed in a previous post in this thread, I presume that many many millions of deals will be required to get a solid ranking (and even then the specific ranks among the top 10 hands, say, will probably not be conclusive). That is, I imagine that the top 10 (top 20, top 50, etc.) hands will be identified as a group but precisely where each hand falls within the group will be less well-defined.
I plan to launch another simulation of another 10 million deals later today. When that simulation is completed I am hoping that the starting hand rankings will be reasonably stable so that we can place confidence in these results. (My guess is that it may take 50 million or even 100 million deals to reach the level of confidence in the results that we are used to in NLHE.)
The first table will list the top 25 starting hands (suit-isomorphic buckets) based upon raw tallies of number of deals won (each hand that ties gets 1/N).
Table 1: Best Short Deck Omaha 6-Max Starting Hands based upon Raw Tallies (10 million deals)
__Rank per Raw Tallies__ | Starting Hand (suit-iso bucket) | Raw Tally | # of Unique Hands in suit-iso bucket | Adjusted Tally |
---|---|---|---|---|
1 | (AK) (A) (K) | 7196 | 24 | 300 |
2 | (AQ) (A) (Q) | 7026 | 24 | 293 |
3 | (KQ) (K) (Q) | 6559 | 24 | 273 |
4 | (AT) (A) (T) | 6518 | 24 | 272 |
5 | (AQ) (J) (T) | 6447 | 24 | 269 |
6 | (AJ) (A) (J) | 6444 | 24 | 268 |
7 | (KJ) (Q) (T) | 6442 | 24 | 268 |
8 | (KQ) (J) (T) | 6430 | 24 | 268 |
9 | (AQ) (A) (J) | 6396 | 24 | 267 |
10 | (KT) (Q) (J) | 6381 | 24 | 266 |
11 | (AJ) (Q) (T) | 6343 | 24 | 264 |
12 | (AQ) (A) (T) | 6339 | 24 | 264 |
13 | (AT) (Q) (J) | 6335 | 24 | 264 |
14 | (AT) (A) (J) | 6332 | 24 | 264 |
15 | (QJ) (K) (T) | 6331 | 24 | 264 |
16 | (AT) (A) (Q) | 6328 | 24 | 264 |
17 | (JT) (K) (Q) | 6326 | 24 | 264 |
18 | (QT) (K) (J) | 6323 | 24 | 263 |
19 | (AJ) (A) (Q) | 6314 | 24 | 263 |
20 | (KJ) (K) (J) | 6308 | 24 | 263 |
21 | (AJ) (K) (Q) | 6293 | 24 | 262 |
22 | (AT) (K) (J) | 6290 | 24 | 262 |
23 | (AJ) (A) (T) | 6240 | 24 | 260 |
24 | (AJ) (K) (T) | 6214 | 24 | 259 |
25 | (KT) (K) (J) | 6206 | 24 | 259 |
Recall that the parentheses surround cards in the same suit. So the first entry in the table (AK) (A) (K) is single-suited aces-and-kings. The second entry in the table (AQ) (A) (Q) is single-suited aces-and-queens. These two appear clearly ahead of all other starting hand suit-iso buckets.
The second table will list the top 25 starting hands (suit-isomorphic buckets) based upon adjusted tallies of number of deals won where the raw tallies are divided by the number of unique hands in each suit-isomorphic bucket.
Table 2: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (10 million deals)
Rank per Adjusted Tallies | Starting Hand (suit-iso bucket) | Raw Tally | # of Unique Hands in suit-iso bucket | Adjusted Tally |
---|---|---|---|---|
1 | (AK) (AK) | 1993 | 6 | 332 |
2 | (AQ) (AQ) | 1975 | 6 | 329 |
3 | (AJ) (AJ) | 1920 | 6 | 320 |
4 | (AJ) (AT) | 3808 | 12 | 317 |
5 | (AT) (AT) | 1891 | 6 | 315 |
6 | (KQ) (KQ) | 1873 | 6 | 312 |
7 | (KJ) (QT) | 3675 | 12 | 306 |
8 | (AQ) (AT) | 3631 | 12 | 303 |
9 | (KT) (QJ) | 3609 | 12 | 301 |
10 | (AK) (A) (K) | 7196 | 24 | 300 |
11 | (KJ) (KJ) | 1792 | 6 | 299 |
12 | (AQ) (AJ) | 3573 | 12 | 298 |
13 | (KQ) (JT) | 3561 | 12 | 297 |
14 | (AT) (QJ) | 3547 | 12 | 296 |
15 | (AT) (KJ) | 3530 | 12 | 294 |
16 | (AK) (AT) | 3528 | 12 | 294 |
17 | (KJ) (KT) | 3524 | 12 | 294 |
18 | (AQ) (A) (Q) | 7026 | 24 | 293 |
19 | (AJ) (QT) | 3511 | 12 | 293 |
20 | (AQ) (JT) | 3509 | 12 | 292 |
21 | (AK) (AQ) | 3501 | 12 | 292 |
22 | (AJ) (KT) | 3497 | 12 | 291 |
23 | (KQ) (KJ) | 3486 | 12 | 291 |
24 | (QJ) (QT) | 3484 | 12 | 290 |
25 | (AK) (KQ) | 3474 | 12 | 289 |
To repeat what I said above, I am sure it is clear to everybody the difference between the two tables. The first table based upon raw tallies gives a significant "advantage" to suit-isomorphic buckets containing many unique starting hands. This is the analog to NLHE where AK-offsuit wins more hands than AK-suited, but this is merely due to there being more AK-offsuit starting hands in NLHE than AK-suited starting hands (12 vs 4). Of course, the raw tallies need to be adjusted. When the number of times AK-offsuit wins is divided by the number of unique AK-offsuit starting hands (12) and the number of times AK-suited wins is divided by the number of unique AK-suited starting hands (4), AK-suited is seen to be a stronger starting hand than AK-offsuit.
The same "adjustment" is required in Omaha as well. Some Omaha starting hand suit-iso buckets contain many more unique starting hands than other starting hand suit-iso buckets. It is not surprising that the top 25 starting hand buckets in Table 1 all contain 24 unique starting hands (24 being the max possible). When the relevant adjustment is made, these single-suited hand buckets correctly slide down the ranking and double-suited hands correctly move up.
The first entry in Table 2 shows that the best starting hand in Short Deck Omaha (based upon this simulation) is Double-Suited Aces & Kings. The Raw Tally shows that Double-Suited Aces & Kings won 1,993 of the 10 million deals (if N hands tie they each get 1/N). And when adjusted for how many unique hands are double-suited aces-and-kings (6), the Adjusted Tally is 332. The interpretation is that a specific double-suited aces-and-kings hand, say [As Ah Ks Kh] won 332 of the 10 million 6-max short deck omaha deals.
There is a lot of information to be gleaned from the above tables. Since I am a novice in short deck omaha, I will not presume to interpret the reasons and nuances behind the above rankings.
As discussed in a previous post in this thread, I presume that many many millions of deals will be required to get a solid ranking (and even then the specific ranks among the top 10 hands, say, will probably not be conclusive). That is, I imagine that the top 10 (top 20, top 50, etc.) hands will be identified as a group but precisely where each hand falls within the group will be less well-defined.
I plan to launch another simulation of another 10 million deals later today. When that simulation is completed I am hoping that the starting hand rankings will be reasonably stable so that we can place confidence in these results. (My guess is that it may take 50 million or even 100 million deals to reach the level of confidence in the results that we are used to in NLHE.)
Great work! Maybe the next table can also have confidence intervals?
The second simulation of 10 million Short Deck Omaha 6-Max deals (all hands go to showdown on all deals) has completed. To remove any uncertainty on this issue, these simulations use the "new" short deck rules in which a flush beats a full house but a straight beats three-of-a-kind. I will present the top 25 starting hands (suit-isomorphic buckets) based upon the Adjusted Tallies from the combined simulations of 20 million deals.
Table 2: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (20 million deals)
At this juncture I will note that the two 10-million simulations gave similar results, but far from identical results. Consequently there is a fair amount of movement in the tables between the 10-million deal results and the 20-million deal results, especially as you move to the middle and lower portions of the tables. I don't want to make a big deal of it, but I will note that the top nine starting hands are the exact same (in the same order 1-9) in the two tables.
So I will refrain from making any substantive comments on the hand rankings appearing above. The results are not yet sufficiently stable and we are still seeing the effects of "variance" (how often a specific hand is dealt, what other hands it is up against in that deal, how that deal's board runs out determining which hand wins, etc.). Of course, the law-of-large-numbers applies so that the hand rankings will eventually stabilize reflecting starting hands' true underlying worthiness.
I will kick off another 10 million deals later tonight and will report back the combined 30-million results when it finishes in a few days.
Table 2: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (20 million deals)
Rank per Adjusted Tallies | Starting Hand (suit-iso bucket) | Raw Tally | Unique Hands in Bucket | Adjusted Tally |
---|---|---|---|---|
1 | (AK) (AK) | 3,967 | 6 | 661 |
2 | (AQ) (AQ) | 3,963 | 6 | 660 |
3 | (AJ) (AJ) | 3,858 | 6 | 643 |
4 | (AJ) (AT) | 7,639 | 12 | 637 |
5 | (AT) (AT) | 3,799 | 6 | 633 |
6 | (KQ) (KQ) | 3,757 | 6 | 626 |
7 | (KJ) (QT) | 7,332 | 12 | 611 |
8 | (AQ) (AT) | 7,224 | 12 | 602 |
9 | (KT) (QJ) | 7,160 | 12 | 597 |
10 | (AQ) (AJ) | 7,154 | 12 | 596 |
11 | (AK) (A) (K) | 14,288 | 24 | 595 |
12 | (KJ) (KJ) | 3,533 | 6 | 589 |
13 | (KQ) (JT) | 7,047 | 12 | 587 |
14 | (AJ) (KT) | 7,036 | 12 | 586 |
15 | (AT) (KJ) | 7,028 | 12 | 586 |
16 | (AJ) (QT) | 7,015 | 12 | 585 |
17 | (AK) (AT) | 7,013 | 12 | 584 |
18 | (AK) (AJ) | 7,009 | 12 | 584 |
19 | (AQ) (JT) | 7,002 | 12 | 584 |
20 | (AQ) (KT) | 6,994 | 12 | 583 |
21 | (AT) (QJ) | 6,987 | 12 | 582 |
22 | (KJ) (KT) | 6,987 | 12 | 582 |
23 | (AK) (AQ) | 6,986 | 12 | 582 |
24 | (QJ) (QJ) | 3,474 | 6 | 579 |
25 | (AQ) (KJ) | 6,938 | 12 | 578 |
At this juncture I will note that the two 10-million simulations gave similar results, but far from identical results. Consequently there is a fair amount of movement in the tables between the 10-million deal results and the 20-million deal results, especially as you move to the middle and lower portions of the tables. I don't want to make a big deal of it, but I will note that the top nine starting hands are the exact same (in the same order 1-9) in the two tables.
So I will refrain from making any substantive comments on the hand rankings appearing above. The results are not yet sufficiently stable and we are still seeing the effects of "variance" (how often a specific hand is dealt, what other hands it is up against in that deal, how that deal's board runs out determining which hand wins, etc.). Of course, the law-of-large-numbers applies so that the hand rankings will eventually stabilize reflecting starting hands' true underlying worthiness.
I will kick off another 10 million deals later tonight and will report back the combined 30-million results when it finishes in a few days.
The third simulation of 10 million Short Deck Omaha 6-Max deals (all hands go to showdown on all deals) has completed. These simulations use the "new" short deck rules in which a flush beats a full house but a straight beats three-of-a-kind. I will present the top 25 starting hands (suit-isomorphic buckets) based upon the Adjusted Tallies from the combined simulations of 30 million deals.
Table: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (30 million deals)
There is still a fair amount of movement in the tables between the 20-million deal results and the 30-million deal results, especially as you move to the middle and lower portions of the tables. I don't want to make a big deal of it, but I will note that the top nine starting hands are the exact same (in the same order 1-9) in the two tables. I will kick off another 10 million deals later tonight and will report back the combined 40-million results when the simulation finishes.
The original idea was to run this "meta simulation" (over all possible hands/deals) partly to serve as a preliminary foray to identify the candidates for the best 25 starting hands. This simulation is of the Broad/Shallow variety.
The idea was then to run a whole bunch of Narrow/Deep simulations on specific hands. That is, we would next determine the expected winning percentage of double-suited Aces & Kings vs five random hands. Do the same for double-suited Aces & Queens, etc.
My plans are up in the air, but I am thinking that I'll plow through the "meta simulations" until we have results for 50 million deals. Maybe I'll post the top 100, or top 1000, or even the complete ranking of 3663 starting hands knowing that there is still likely to be significant variance around where a hand is ranked based upon "only" 50 million deals. One of the advantages of the broad/shallow meta-simulation is that we have win results for each of the 3663 starting hands and it would be a shame to throw that information away.
After that has been put aside, then I may undertake specific hand simulations (vs five other random hands). Unfortunately, I think these simulations will also suffer from runtime issues. I would love to do 25 or 50 or 100 of these (ideally all 3663), but that seems infeasible. We'll have to see what is possible when we get to that point.
Table: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (30 million deals)
Rank per Adjusted Tallies | Starting Hand (suit-iso bucket) | Raw Tally | Unique Hands in Bucket | Adjusted Tally |
---|---|---|---|---|
1 | (AK) (AK) | 5,988 | 6 | 998 |
2 | (AQ) (AQ) | 5,847 | 6 | 974 |
3 | (AJ) (AJ) | 5,687 | 6 | 948 |
4 | (AJ) (AT) | 11,317 | 12 | 943 |
5 | (AT) (AT) | 5,650 | 6 | 942 |
6 | (KQ) (KQ) | 5,604 | 6 | 934 |
7 | (KJ) (QT) | 10,858 | 12 | 905 |
8 | (AQ) (AT) | 10,844 | 12 | 904 |
9 | (AQ) (AJ) | 10,792 | 12 | 899 |
10 | (AK) (A) (K) | 21,447 | 24 | 894 |
11 | (KT) (QJ) | 10,713 | 12 | 893 |
12 | (KJ) (KJ) | 5,316 | 6 | 886 |
13 | (AK) (AQ) | 10,578 | 12 | 881 |
14 | (AT) (KJ) | 10,576 | 12 | 881 |
15 | (AK) (AJ) | 10,575 | 12 | 881 |
16 | (AJ) (KT) | 10,562 | 12 | 880 |
17 | (AJ) (QT) | 10,558 | 12 | 880 |
18 | (AT) (QJ) | 10,549 | 12 | 879 |
19 | (AK) (AT) | 10,542 | 12 | 879 |
20 | (AQ) (JT) | 10,507 | 12 | 876 |
21 | (KQ) (JT) | 10,497 | 12 | 875 |
22 | (AT) (KQ) | 10,466 | 12 | 872 |
23 | (QJ) (QJ) | 5,204 | 6 | 867 |
24 | (KJ) (KT) | 10,389 | 12 | 866 |
25 | (AQ) (KJ) | 10,372 | 12 | 864 |
There is still a fair amount of movement in the tables between the 20-million deal results and the 30-million deal results, especially as you move to the middle and lower portions of the tables. I don't want to make a big deal of it, but I will note that the top nine starting hands are the exact same (in the same order 1-9) in the two tables. I will kick off another 10 million deals later tonight and will report back the combined 40-million results when the simulation finishes.
The original idea was to run this "meta simulation" (over all possible hands/deals) partly to serve as a preliminary foray to identify the candidates for the best 25 starting hands. This simulation is of the Broad/Shallow variety.
The idea was then to run a whole bunch of Narrow/Deep simulations on specific hands. That is, we would next determine the expected winning percentage of double-suited Aces & Kings vs five random hands. Do the same for double-suited Aces & Queens, etc.
My plans are up in the air, but I am thinking that I'll plow through the "meta simulations" until we have results for 50 million deals. Maybe I'll post the top 100, or top 1000, or even the complete ranking of 3663 starting hands knowing that there is still likely to be significant variance around where a hand is ranked based upon "only" 50 million deals. One of the advantages of the broad/shallow meta-simulation is that we have win results for each of the 3663 starting hands and it would be a shame to throw that information away.
After that has been put aside, then I may undertake specific hand simulations (vs five other random hands). Unfortunately, I think these simulations will also suffer from runtime issues. I would love to do 25 or 50 or 100 of these (ideally all 3663), but that seems infeasible. We'll have to see what is possible when we get to that point.
The results of a simulation of 40 million Short Deck Omaha 6-Max deals.
Table: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (40 million deals)
I will kick off another 10 million deals later tonight and will report back the combined 50-million results when the simulation finishes.
See the earlier posts for my thoughts on next steps.
Table: Best Short Deck Omaha 6-Max Starting Hands based upon Adjusted Tallies (40 million deals)
Rank per Adjusted Tallies | Starting Hand (suit-iso bucket) | Raw Tally | Unique Hands in Bucket | Adjusted Tally |
---|---|---|---|---|
1 | (AK) (AK) | 8,004 | 6 | 1,334 |
2 | (AQ) (AQ) | 7,770 | 6 | 1,295 |
3 | (AJ) (AJ) | 7,568 | 6 | 1,261 |
4 | (AJ) (AT) | 14,941 | 12 | 1,245 |
5 | (AT) (AT) | 7,442 | 6 | 1,240 |
6 | (KQ) (KQ) | 7,398 | 6 | 1,233 |
7 | (AQ) (AT) | 14,458 | 12 | 1,205 |
8 | (AQ) (AJ) | 14,443 | 12 | 1,204 |
9 | (KJ) (QT) | 14,301 | 12 | 1,192 |
10 | (AK) (A) (K) | 28,581 | 24 | 1,191 |
11 | (KT) (QJ) | 14,271 | 12 | 1,189 |
12 | (AT) (QJ) | 14,118 | 12 | 1,177 |
13 | (AK) (AQ) | 14,112 | 12 | 1,176 |
14 | (AK) (AJ) | 14,107 | 12 | 1,176 |
15 | (KQ) (JT) | 14,093 | 12 | 1,174 |
16 | (AT) (KJ) | 14,082 | 12 | 1,174 |
17 | (AJ) (QT) | 14,075 | 12 | 1,173 |
18 | (KJ) (KJ) | 7,026 | 6 | 1,171 |
19 | (AJ) (KT) | 14,050 | 12 | 1,171 |
20 | (AT) (KQ) | 14,037 | 12 | 1,170 |
21 | (AK) (AT) | 14,030 | 12 | 1,169 |
22 | (AQ) (JT) | 14,005 | 12 | 1,167 |
23 | (AJ) (KQ) | 13,901 | 12 | 1,158 |
24 | (KJ) (KT) | 13,838 | 12 | 1,153 |
25 | (QJ) (QJ) | 6,899 | 6 | 1,150 |
I will kick off another 10 million deals later tonight and will report back the combined 50-million results when the simulation finishes.
See the earlier posts for my thoughts on next steps.
Here are the complete results of a simulation of 50 million Short Deck Omaha 6-Max deals. To remove any uncertainty on this issue, these simulations use the "new" short deck rules in which a flush beats a full house but a straight beats three-of-a-kind.
The following tables list the adjusted tally and estimated equity for all possible 3,663 starting hands in short deck omaha. Some of the starting hands may look a little odd due to the way I display hands with pairs or trips. Since there is a limit on the size of posts, the tables will appear in separate posts.
Table 1: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 1-400
The following tables list the adjusted tally and estimated equity for all possible 3,663 starting hands in short deck omaha. Some of the starting hands may look a little odd due to the way I display hands with pairs or trips. Since there is a limit on the size of posts, the tables will appear in separate posts.
Table 1: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 1-400
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
1 | (AK) (AK) | 1664 | 32.7 |
2 | (AQ) (AQ) | 1627 | 31.9 |
3 | (AJ) (AJ) | 1579 | 31.0 |
4 | (AT) (AT) | 1555 | 30.5 |
5 | (AJ) (AT) | 1544 | 30.3 |
6 | (KQ) (KQ) | 1537 | 30.2 |
7 | (AQ) (AT) | 1514 | 29.7 |
8 | (AQ) (AJ) | 1500 | 29.4 |
9 | (KJ) (QT) | 1498 | 29.4 |
10 | (KT) (QJ) | 1491 | 29.3 |
11 | (AK) (A) (K) | 1491 | 29.3 |
12 | (AJ) (KT) | 1473 | 28.9 |
13 | (AK) (AQ) | 1472 | 28.9 |
14 | (AK) (AJ) | 1471 | 28.9 |
15 | (AK) (AT) | 1468 | 28.8 |
16 | (AT) (QJ) | 1467 | 28.8 |
17 | (AJ) (QT) | 1466 | 28.8 |
18 | (KJ) (KJ) | 1462 | 28.7 |
19 | (AT) (KJ) | 1462 | 28.7 |
20 | (KQ) (JT) | 1460 | 28.7 |
21 | (AT) (KQ) | 1458 | 28.6 |
22 | (AQ) (JT) | 1456 | 28.6 |
23 | (KT) (KT) | 1447 | 28.4 |
24 | (QJ) (QJ) | 1446 | 28.4 |
25 | (KJ) (KT) | 1444 | 28.4 |
26 | (AQ) (A) (Q) | 1439 | 28.3 |
27 | (AJ) (KQ) | 1438 | 28.2 |
28 | (AQ) (KJ) | 1433 | 28.1 |
29 | (A9) (A9) | 1432 | 28.1 |
30 | (AK) (JT) | 1424 | 28.0 |
31 | (AQ) (KT) | 1421 | 27.9 |
32 | (KA) (KT) | 1419 | 27.9 |
33 | (AT) (A9) | 1415 | 27.8 |
34 | (KA) (KJ) | 1409 | 27.7 |
35 | (AK) (QT) | 1407 | 27.6 |
36 | (KA) (KQ) | 1407 | 27.6 |
37 | (AJ) (A9) | 1407 | 27.6 |
38 | (KQ) (KJ) | 1406 | 27.6 |
39 | (QA) (QK) | 1405 | 27.6 |
40 | (AK) (QJ) | 1404 | 27.6 |
41 | (QT) (QT) | 1402 | 27.5 |
42 | (QJ) (QT) | 1401 | 27.5 |
43 | (KQ) (KT) | 1397 | 27.4 |
44 | (QA) (QJ) | 1387 | 27.2 |
45 | (AJ) (A8) | 1380 | 27.1 |
46 | (AT) (A8) | 1379 | 27.1 |
47 | (QK) (QJ) | 1379 | 27.1 |
48 | (KQ) (K) (Q) | 1375 | 27.0 |
49 | (JQ) (JT) | 1371 | 26.9 |
50 | (JK) (JQ) | 1370 | 26.9 |
51 | (AJ) (A) (J) | 1369 | 26.9 |
52 | (JA) (JQ) | 1365 | 26.8 |
53 | (QK) (QT) | 1364 | 26.8 |
54 | (AQ) (A9) | 1363 | 26.8 |
55 | (QA) (QT) | 1361 | 26.7 |
56 | (JT) (JT) | 1357 | 26.7 |
57 | (TQ) (TJ) | 1357 | 26.7 |
58 | (JA) (JT) | 1357 | 26.6 |
59 | (KT) (Q) (J) | 1356 | 26.6 |
60 | (A8) (A8) | 1355 | 26.6 |
61 | (JA) (JK) | 1355 | 26.6 |
62 | (JK) (JT) | 1353 | 26.6 |
63 | (KT) (K9) | 1350 | 26.5 |
64 | (AT) (Q) (J) | 1349 | 26.5 |
65 | (AT) (A) (T) | 1347 | 26.4 |
66 | (QT) (J9) | 1345 | 26.4 |
67 | (KQ) (J) (T) | 1343 | 26.4 |
68 | (KJ) (Q) (T) | 1341 | 26.3 |
69 | (AQ) (J) (T) | 1338 | 26.3 |
70 | (TA) (TJ) | 1333 | 26.2 |
71 | (AQ) (A8) | 1332 | 26.1 |
72 | (TK) (TJ) | 1330 | 26.1 |
73 | (AK) (A9) | 1330 | 26.1 |
74 | (Q9) (JT) | 1330 | 26.1 |
75 | (K) (QT) (J) | 1330 | 26.1 |
76 | (AT) (A) (J) | 1329 | 26.1 |
77 | (AJ) (Q) (T) | 1329 | 26.1 |
78 | (AT) (A7) | 1328 | 26.1 |
79 | (AT) (J9) | 1325 | 26.0 |
80 | (K) (QJ) (T) | 1324 | 26.0 |
81 | (KJ) (K) (J) | 1323 | 26.0 |
82 | (QJ) (T9) | 1319 | 25.9 |
83 | (AK) (A7) | 1316 | 25.8 |
84 | (AT) (Q9) | 1316 | 25.8 |
85 | (AT) (A6) | 1314 | 25.8 |
86 | (TA) (TQ) | 1314 | 25.8 |
87 | (TK) (TQ) | 1313 | 25.8 |
88 | (KJ) (K9) | 1313 | 25.8 |
89 | (AK) (A8) | 1312 | 25.8 |
90 | (AJ) (A7) | 1310 | 25.7 |
91 | (AK) (A6) | 1310 | 25.7 |
92 | (K9) (JT) | 1310 | 25.7 |
93 | (A9) (JT) | 1309 | 25.7 |
94 | (K) (Q) (JT) | 1308 | 25.7 |
95 | (AJ) (A) (T) | 1308 | 25.7 |
96 | (AJ) (A) (Q) | 1307 | 25.7 |
97 | (AJ) (T9) | 1307 | 25.7 |
98 | (AT) (K9) | 1306 | 25.6 |
99 | (AQ) (A) (J) | 1304 | 25.6 |
100 | (AT) (K) (J) | 1304 | 25.6 |
101 | (AT) (A) (Q) | 1303 | 25.6 |
102 | (KT) (J9) | 1302 | 25.6 |
103 | (K9) (QT) | 1301 | 25.6 |
104 | (AJ) (A6) | 1301 | 25.5 |
105 | (A) (A) (K) (K) | 1299 | 25.5 |
106 | (AQ) (A) (T) | 1297 | 25.5 |
107 | (KT) (Q9) | 1296 | 25.4 |
108 | (KA) (K8) | 1294 | 25.4 |
109 | (AQ) (A7) | 1294 | 25.4 |
110 | (AJ) (K) (T) | 1292 | 25.4 |
111 | (KJ) (T9) | 1292 | 25.4 |
112 | (KT) (K8) | 1291 | 25.4 |
113 | (QJ) (Q) (J) | 1290 | 25.3 |
114 | (AQ) (K) (J) | 1290 | 25.3 |
115 | (TA) (TK) | 1290 | 25.3 |
116 | (AQ) (A6) | 1289 | 25.3 |
117 | (KT) (K) (J) | 1285 | 25.2 |
118 | (KT) (K) (T) | 1282 | 25.2 |
119 | (A) (QJ) (T) | 1281 | 25.2 |
120 | (A7) (A7) | 1281 | 25.2 |
121 | (K9) (K9) | 1281 | 25.2 |
122 | (AK) (J) (T) | 1281 | 25.1 |
123 | (AJ) (K) (Q) | 1281 | 25.1 |
124 | (A) (QT) (J) | 1280 | 25.1 |
125 | (AJ) (A) (K) | 1279 | 25.1 |
126 | (A9) (KT) | 1279 | 25.1 |
127 | (A9) (KJ) | 1278 | 25.1 |
128 | (AT) (K) (Q) | 1278 | 25.1 |
129 | (K9) (QJ) | 1277 | 25.1 |
130 | (AJ) (Q9) | 1277 | 25.1 |
131 | (AK) (Q) (J) | 1274 | 25.0 |
132 | (A9) (QJ) | 1274 | 25.0 |
133 | (AT) (A) (K) | 1273 | 25.0 |
134 | (AK) (A) (J) | 1273 | 25.0 |
135 | (QT) (Q9) | 1273 | 25.0 |
136 | (AQ) (A) (K) | 1273 | 25.0 |
137 | (A9) (QT) | 1273 | 25.0 |
138 | (QT) (J8) | 1272 | 25.0 |
139 | (KA) (K9) | 1270 | 24.9 |
140 | (AJ) (K9) | 1268 | 24.9 |
141 | (AQ) (K) (T) | 1267 | 24.9 |
142 | (AQ) (K9) | 1267 | 24.9 |
143 | (KJ) (K) (T) | 1266 | 24.9 |
144 | (AK) (A) (Q) | 1264 | 24.8 |
145 | (KQ) (K9) | 1264 | 24.8 |
146 | (A9) (A8) | 1264 | 24.8 |
147 | (K8) (JT) | 1262 | 24.8 |
148 | (QT) (Q) (J) | 1262 | 24.8 |
149 | (Q8) (JT) | 1261 | 24.8 |
150 | (KQ) (T9) | 1261 | 24.8 |
151 | (A) (Q) (JT) | 1261 | 24.8 |
152 | (A) (KT) (J) | 1261 | 24.8 |
153 | (AK) (A) (T) | 1260 | 24.7 |
154 | (A9) (KQ) | 1258 | 24.7 |
155 | (AK) (Q) (T) | 1258 | 24.7 |
156 | (QA) (Q) (K) | 1258 | 24.7 |
157 | (AT) (K8) | 1257 | 24.7 |
158 | (KJ) (K8) | 1257 | 24.7 |
159 | (KA) (K7) | 1256 | 24.7 |
160 | (AQ) (T9) | 1256 | 24.7 |
161 | (K) (K) (AJ) | 1254 | 24.6 |
162 | (KA) (K) (Q) | 1254 | 24.6 |
163 | (A) (KQ) (J) | 1254 | 24.6 |
164 | (KJ) (T8) | 1253 | 24.6 |
165 | (AQ) (J9) | 1252 | 24.6 |
166 | (QA) (Q9) | 1251 | 24.6 |
167 | (KT) (K) (Q) | 1250 | 24.6 |
168 | (A8) (QT) | 1250 | 24.5 |
169 | (A) (KJ) (T) | 1247 | 24.5 |
170 | (A) (KT) (Q) | 1246 | 24.5 |
171 | (KJT) (Q) | 1246 | 24.5 |
172 | (AT) (J8) | 1246 | 24.5 |
173 | (A) (KJ) (Q) | 1246 | 24.5 |
174 | (KT) (J8) | 1245 | 24.5 |
175 | (AJ) (Q8) | 1245 | 24.4 |
176 | (QT) (Q) (T) | 1245 | 24.4 |
177 | (KQ) (J9) | 1245 | 24.4 |
178 | (KJ) (Q9) | 1244 | 24.4 |
179 | (KA) (K) (J) | 1244 | 24.4 |
180 | (A6) (A6) | 1244 | 24.4 |
181 | (AK) (T9) | 1244 | 24.4 |
182 | (KQ) (K) (J) | 1242 | 24.4 |
183 | (QK) (Q) (T) | 1240 | 24.3 |
184 | (KJ) (K) (Q) | 1240 | 24.3 |
185 | (A) (A) (QJ) | 1240 | 24.3 |
186 | (A8) (JT) | 1239 | 24.3 |
187 | (JT) (J) (T) | 1238 | 24.3 |
188 | (KT) (K7) | 1238 | 24.3 |
189 | (KQ) (K) (T) | 1237 | 24.3 |
190 | (KT) (Q8) | 1237 | 24.3 |
191 | (A8) (KT) | 1237 | 24.3 |
192 | (A) (A) (JT) | 1236 | 24.3 |
193 | (JT) (J9) | 1236 | 24.3 |
194 | (A) (KQ) (T) | 1236 | 24.3 |
195 | (K) (K) (AT) | 1236 | 24.3 |
196 | (KA) (K) (T) | 1235 | 24.3 |
197 | (QJ) (Q9) | 1235 | 24.2 |
198 | (JQ) (J) (T) | 1234 | 24.2 |
199 | (K) (K) (JT) | 1234 | 24.2 |
200 | (A) (A) (KQ) | 1234 | 24.2 |
201 | (A8) (KQ) | 1232 | 24.2 |
202 | (QK) (Q) (J) | 1231 | 24.2 |
203 | (A) (K) (QJ) | 1230 | 24.2 |
204 | (Q) (Q) (JT) | 1230 | 24.1 |
205 | (QJ) (Q) (T) | 1230 | 24.1 |
206 | (A9) (A7) | 1229 | 24.1 |
207 | (J) (J) (QT) | 1228 | 24.1 |
208 | (AQ) (K8) | 1228 | 24.1 |
209 | (JK) (J) (Q) | 1228 | 24.1 |
210 | (A) (A) (KJ) | 1227 | 24.1 |
211 | (KQJ) (T) | 1227 | 24.1 |
212 | (KA) (K6) | 1227 | 24.1 |
213 | (JT) (J) (Q) | 1227 | 24.1 |
214 | (K) (K) (AQ) | 1226 | 24.1 |
215 | (QJ) (T8) | 1226 | 24.1 |
216 | (QA) (Q) (J) | 1226 | 24.1 |
217 | (Q) (Q) (AK) | 1225 | 24.1 |
218 | (KQ) (K) (A) | 1225 | 24.1 |
219 | (KT) (K6) | 1225 | 24.0 |
220 | (QK) (Q9) | 1224 | 24.0 |
221 | (TQ) (T) (J) | 1224 | 24.0 |
222 | (Q) (Q) (KT) | 1224 | 24.0 |
223 | (T) (T) (QJ) | 1223 | 24.0 |
224 | (Q) (Q) (KJ) | 1223 | 24.0 |
225 | (AT) (Q8) | 1222 | 24.0 |
226 | (A) (K) (QT) | 1222 | 24.0 |
227 | (QJ) (Q) (K) | 1221 | 24.0 |
228 | (A8) (KJ) | 1221 | 24.0 |
229 | (Q) (Q) (AJ) | 1220 | 24.0 |
230 | (KQT) (J) | 1220 | 24.0 |
231 | (AK) (J9) | 1220 | 24.0 |
232 | (QA) (Q) (T) | 1218 | 23.9 |
233 | (AK) (Q9) | 1218 | 23.9 |
234 | (K) (K) (QJ) | 1218 | 23.9 |
235 | (TJ) (T) (Q) | 1218 | 23.9 |
236 | (A) (A) (QT) | 1218 | 23.9 |
237 | (TJ) (T9) | 1216 | 23.9 |
238 | (KJ) (K) (A) | 1215 | 23.9 |
239 | (KT) (K) (A) | 1215 | 23.8 |
240 | (A9) (A) (T) | 1214 | 23.8 |
241 | (AQ) (J8) | 1214 | 23.8 |
242 | (A) (K) (JT) | 1213 | 23.8 |
243 | (QT) (J7) | 1213 | 23.8 |
244 | (AQT) (J) | 1213 | 23.8 |
245 | (AJT) (A) | 1213 | 23.8 |
246 | (AJ) (K8) | 1213 | 23.8 |
247 | (A8) (QJ) | 1213 | 23.8 |
248 | (QK) (Q) (A) | 1213 | 23.8 |
249 | (JK) (J) (T) | 1212 | 23.8 |
250 | (A) (A) (KT) | 1212 | 23.8 |
251 | (KJ) (K6) | 1211 | 23.8 |
252 | (AT) (Q7) | 1211 | 23.8 |
253 | (K) (K) (Q) (Q) | 1210 | 23.8 |
254 | (JA) (J) (Q) | 1210 | 23.8 |
255 | (AT) (A) (9) | 1210 | 23.8 |
256 | (J) (J) (AQ) | 1210 | 23.8 |
257 | (Q) (Q) (AT) | 1210 | 23.8 |
258 | (AJT) (Q) | 1210 | 23.8 |
259 | (AJ) (T8) | 1210 | 23.7 |
260 | (K) (QJT) | 1209 | 23.7 |
261 | (K) (K) (QT) | 1209 | 23.7 |
262 | (QT) (Q8) | 1207 | 23.7 |
263 | (Q9) (J) (T) | 1207 | 23.7 |
264 | (JQ) (J9) | 1207 | 23.7 |
265 | (KQ) (K8) | 1206 | 23.7 |
266 | (AT) (J7) | 1206 | 23.7 |
267 | (QT) (J) (9) | 1206 | 23.7 |
268 | (QT) (Q) (K) | 1205 | 23.7 |
269 | (K8) (QJ) | 1205 | 23.7 |
270 | (AT) (K7) | 1205 | 23.7 |
271 | (KQ) (K7) | 1205 | 23.7 |
272 | (K7) (JT) | 1204 | 23.6 |
273 | (TK) (T) (J) | 1203 | 23.6 |
274 | (J) (J) (KQ) | 1203 | 23.6 |
275 | (A9) (A) (J) | 1203 | 23.6 |
276 | (KJ) (Q8) | 1203 | 23.6 |
277 | (J) (J) (KT) | 1202 | 23.6 |
278 | (K8) (QT) | 1202 | 23.6 |
279 | (JQ) (J) (K) | 1202 | 23.6 |
280 | (A9) (A6) | 1201 | 23.6 |
281 | (AQ) (T8) | 1200 | 23.6 |
282 | (AQJ) (T) | 1200 | 23.6 |
283 | (Q7) (JT) | 1200 | 23.6 |
284 | (AJ) (K7) | 1199 | 23.5 |
285 | (JA) (J) (T) | 1198 | 23.5 |
286 | (K) (Q) (J) (T) | 1197 | 23.5 |
287 | (KJ) (K7) | 1197 | 23.5 |
288 | (KT) (J7) | 1197 | 23.5 |
289 | (A) (A) (Q) (Q) | 1196 | 23.5 |
290 | (JT) (J8) | 1196 | 23.5 |
291 | (KT) (Q7) | 1194 | 23.5 |
292 | (AK) (Q8) | 1193 | 23.4 |
293 | (AQ) (K7) | 1192 | 23.4 |
294 | (J) (J) (AT) | 1192 | 23.4 |
295 | (KQ) (T8) | 1191 | 23.4 |
296 | (TA) (T) (J) | 1191 | 23.4 |
297 | (QA) (Q8) | 1191 | 23.4 |
298 | (A7) (KJ) | 1191 | 23.4 |
299 | (A7) (KT) | 1190 | 23.4 |
300 | (T) (T) (KJ) | 1190 | 23.4 |
301 | (K9) (J) (T) | 1190 | 23.4 |
302 | (AJ) (A) (9) | 1189 | 23.3 |
303 | (JA) (J9) | 1189 | 23.3 |
304 | (K7) (QT) | 1188 | 23.3 |
305 | (Q) (J9) (T) | 1187 | 23.3 |
306 | (KQ) (K6) | 1185 | 23.3 |
307 | (A7) (QT) | 1185 | 23.3 |
308 | (AJ) (Q7) | 1185 | 23.3 |
309 | (AK) (J8) | 1184 | 23.3 |
310 | (A7) (KQ) | 1184 | 23.3 |
311 | (QJ) (T) (9) | 1184 | 23.3 |
312 | (KT) (Q6) | 1183 | 23.2 |
313 | (A8) (A7) | 1183 | 23.2 |
314 | (JT) (J) (K) | 1183 | 23.2 |
315 | (AT) (J) (9) | 1183 | 23.2 |
316 | (AJ) (T7) | 1182 | 23.2 |
317 | (QJ) (T7) | 1181 | 23.2 |
318 | (AQJ) (A) | 1180 | 23.2 |
319 | (QK) (Q8) | 1178 | 23.1 |
320 | (A9) (A) (9) | 1178 | 23.1 |
321 | (KQ) (J8) | 1177 | 23.1 |
322 | (A9) (J) (T) | 1177 | 23.1 |
323 | (KT) (J) (9) | 1177 | 23.1 |
324 | (K) (K) (J) (J) | 1176 | 23.1 |
325 | (QT) (J6) | 1176 | 23.1 |
326 | (TK) (T9) | 1175 | 23.1 |
327 | (QT) (Q7) | 1175 | 23.1 |
328 | (KJ) (T) (9) | 1175 | 23.1 |
329 | (A) (A) (J) (J) | 1175 | 23.1 |
330 | (A6) (KQ) | 1175 | 23.1 |
331 | (JK) (J9) | 1174 | 23.1 |
332 | (Q) (J) (T9) | 1173 | 23.0 |
333 | (A7) (JT) | 1172 | 23.0 |
334 | (KJ) (Q7) | 1171 | 23.0 |
335 | (QJ) (Q8) | 1171 | 23.0 |
336 | (A7) (QJ) | 1171 | 23.0 |
337 | (AT) (A) (8) | 1170 | 23.0 |
338 | (AQT) (A) | 1169 | 23.0 |
339 | (AT) (Q6) | 1169 | 22.9 |
340 | (AK) (T8) | 1168 | 22.9 |
341 | (JA) (J8) | 1168 | 22.9 |
342 | (QT) (Q) (A) | 1168 | 22.9 |
343 | (A9) (A) (Q) | 1168 | 22.9 |
344 | (A) (QJT) | 1167 | 22.9 |
345 | (T) (T) (AJ) | 1167 | 22.9 |
346 | (K7) (QJ) | 1167 | 22.9 |
347 | (Q) (JT) (9) | 1166 | 22.9 |
348 | (QJ) (Q) (A) | 1166 | 22.9 |
349 | (JA) (J) (K) | 1166 | 22.9 |
350 | (JQ) (J) (A) | 1165 | 22.9 |
351 | (Q6) (JT) | 1165 | 22.9 |
352 | (K6) (QT) | 1165 | 22.9 |
353 | (AK) (Q7) | 1164 | 22.9 |
354 | (A8) (A6) | 1164 | 22.9 |
355 | (Q9) (Q9) | 1164 | 22.9 |
356 | (AJT) (K) | 1163 | 22.8 |
357 | (KJT) (K) | 1163 | 22.8 |
358 | (TA) (T9) | 1162 | 22.8 |
359 | (AKJ) (T) | 1162 | 22.8 |
360 | (KJ) (T7) | 1162 | 22.8 |
361 | (TJ) (T) (K) | 1162 | 22.8 |
362 | (TQ) (T9) | 1162 | 22.8 |
363 | (AKT) (J) | 1161 | 22.8 |
364 | (TK) (T) (Q) | 1160 | 22.8 |
365 | (AJ) (T) (9) | 1160 | 22.8 |
366 | (K6) (QJ) | 1160 | 22.8 |
367 | (QK) (Q7) | 1157 | 22.7 |
368 | (A6) (KT) | 1157 | 22.7 |
369 | (QK) (Q6) | 1156 | 22.7 |
370 | (A9) (A) (K) | 1155 | 22.7 |
371 | (QA) (Q7) | 1155 | 22.7 |
372 | (A) (KJT) | 1154 | 22.7 |
373 | (TA) (T) (Q) | 1154 | 22.7 |
374 | (QJT) (Q) | 1154 | 22.7 |
375 | (A8) (A) (T) | 1154 | 22.7 |
376 | (AQ) (K6) | 1153 | 22.6 |
377 | (AJ) (Q6) | 1153 | 22.6 |
378 | (AT) (K6) | 1152 | 22.6 |
379 | (KQ) (T7) | 1152 | 22.6 |
380 | (A7) (A6) | 1152 | 22.6 |
381 | (AQ) (T7) | 1152 | 22.6 |
382 | (A6) (QT) | 1152 | 22.6 |
383 | (AJ) (K6) | 1151 | 22.6 |
384 | (K9) (K) (T) | 1150 | 22.6 |
385 | (A8) (A) (J) | 1150 | 22.6 |
386 | (AT) (J6) | 1150 | 22.6 |
387 | (QA) (Q6) | 1150 | 22.6 |
388 | (K8) (K8) | 1149 | 22.6 |
389 | (KJ) (T6) | 1149 | 22.6 |
390 | (KT) (K) (9) | 1148 | 22.5 |
391 | (K6) (JT) | 1148 | 22.5 |
392 | (AKJ) (A) | 1148 | 22.5 |
393 | (K) (J9) (T) | 1148 | 22.5 |
394 | (KT) (J6) | 1147 | 22.5 |
395 | (AQ) (J7) | 1147 | 22.5 |
396 | (AJ) (T6) | 1147 | 22.5 |
397 | (AQ) (A) (9) | 1147 | 22.5 |
398 | (K9) (K8) | 1147 | 22.5 |
399 | (JK) (J8) | 1146 | 22.5 |
400 | (QT) (Q6) | 1146 | 22.5 |
Table 2: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 401-800
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
401 | (QJ) (T6) | 1145 | 22.5 |
402 | (AKQ) (A) | 1143 | 22.4 |
403 | (KQT) (K) | 1143 | 22.4 |
404 | (T) (T) (KQ) | 1142 | 22.4 |
405 | (A6) (KJ) | 1142 | 22.4 |
406 | (TJ) (T8) | 1141 | 22.4 |
407 | (AKT) (Q) | 1141 | 22.4 |
408 | (A6) (QJ) | 1140 | 22.4 |
409 | (KJ) (Q6) | 1139 | 22.4 |
410 | (J9) (J9) | 1139 | 22.4 |
411 | (TA) (T8) | 1138 | 22.3 |
412 | (AKQ) (J) | 1138 | 22.3 |
413 | (AK) (J7) | 1138 | 22.3 |
414 | (JK) (J) (A) | 1138 | 22.3 |
415 | (AT) (A) (7) | 1138 | 22.3 |
416 | (K7) (K7) | 1138 | 22.3 |
417 | (TQ) (T) (K) | 1137 | 22.3 |
418 | (JT) (J) (A) | 1137 | 22.3 |
419 | (AJ) (A) (8) | 1137 | 22.3 |
420 | (T) (T) (AQ) | 1136 | 22.3 |
421 | (AQ) (J6) | 1136 | 22.3 |
422 | (AKJ) (Q) | 1136 | 22.3 |
423 | (AQJ) (K) | 1135 | 22.3 |
424 | (A) (KQJ) | 1134 | 22.3 |
425 | (K) (JT) (9) | 1133 | 22.3 |
426 | (J) (J) (AK) | 1133 | 22.2 |
427 | (AQ) (T) (9) | 1133 | 22.2 |
428 | (KQJ) (K) | 1132 | 22.2 |
429 | (JQ) (J8) | 1132 | 22.2 |
430 | (9Q) (9T) | 1132 | 22.2 |
431 | (AQ) (A) (8) | 1132 | 22.2 |
432 | (JQT) (J) | 1132 | 22.2 |
433 | (A) (A) (J) (T) | 1132 | 22.2 |
434 | (KQ) (J7) | 1132 | 22.2 |
435 | (A9) (Q) (T) | 1131 | 22.2 |
436 | (AT) (Q) (9) | 1131 | 22.2 |
437 | (A8) (A) (Q) | 1131 | 22.2 |
438 | (KT) (Q) (9) | 1131 | 22.2 |
439 | (AK) (A) (9) | 1131 | 22.2 |
440 | (A9) (Q) (J) | 1131 | 22.2 |
441 | (KQ) (J6) | 1130 | 22.2 |
442 | (QJ) (Q6) | 1130 | 22.2 |
443 | (AQT) (K) | 1129 | 22.2 |
444 | (TQ) (T8) | 1129 | 22.2 |
445 | (AQ) (T6) | 1129 | 22.2 |
446 | (K9) (Q) (J) | 1129 | 22.2 |
447 | (AK) (Q6) | 1129 | 22.2 |
448 | (9A) (9J) | 1129 | 22.2 |
449 | (K9) (Q) (T) | 1128 | 22.2 |
450 | (AK) (T7) | 1128 | 22.2 |
451 | (QJ) (Q7) | 1128 | 22.2 |
452 | (KAJ) (K) | 1128 | 22.1 |
453 | (AKT) (A) | 1128 | 22.1 |
454 | (9J) (9T) | 1128 | 22.1 |
455 | (Q) (Q) (J) (J) | 1128 | 22.1 |
456 | (K) (K) (T) (T) | 1128 | 22.1 |
457 | (AKQ) (T) | 1127 | 22.1 |
458 | (Q8) (J) (T) | 1126 | 22.1 |
459 | (A) (Q) (J) (T) | 1126 | 22.1 |
460 | (KQ) (T6) | 1126 | 22.1 |
461 | (KQ) (T) (9) | 1126 | 22.1 |
462 | (QKT) (Q) | 1125 | 22.1 |
463 | (A6) (JT) | 1125 | 22.1 |
464 | (A7) (A) (T) | 1125 | 22.1 |
465 | (A) (KQT) | 1124 | 22.1 |
466 | (QKJ) (Q) | 1123 | 22.1 |
467 | (JKQ) (J) | 1123 | 22.0 |
468 | (T9) (T9) | 1121 | 22.0 |
469 | (TA) (T) (K) | 1120 | 22.0 |
470 | (K) (J) (T9) | 1119 | 22.0 |
471 | (QT) (J) (8) | 1119 | 22.0 |
472 | (TQJ) (T) | 1118 | 21.9 |
473 | (K) (Q9) (T) | 1118 | 21.9 |
474 | (KAQ) (K) | 1117 | 21.9 |
475 | (K9) (K) (J) | 1117 | 21.9 |
476 | (A8) (A) (K) | 1117 | 21.9 |
477 | (Q) (J8) (T) | 1117 | 21.9 |
478 | (JT) (J7) | 1116 | 21.9 |
479 | (QJ) (T) (8) | 1115 | 21.9 |
480 | (K) (K) (J) (T) | 1115 | 21.9 |
481 | (9A) (9K) | 1115 | 21.9 |
482 | (9A) (9Q) | 1113 | 21.9 |
483 | (9K) (9T) | 1113 | 21.9 |
484 | (QJT) (9) | 1113 | 21.8 |
485 | (Q9) (Q) (T) | 1112 | 21.8 |
486 | (QT) (Q) (9) | 1112 | 21.8 |
487 | (J8) (T9) | 1111 | 21.8 |
488 | (AQ) (J) (9) | 1111 | 21.8 |
489 | (J9) (T8) | 1111 | 21.8 |
490 | (A9) (K8) | 1111 | 21.8 |
491 | (KAT) (K) | 1111 | 21.8 |
492 | (AJ) (A) (7) | 1110 | 21.8 |
493 | (JKT) (J) | 1110 | 21.8 |
494 | (JQ) (J7) | 1110 | 21.8 |
495 | (K) (QT) (9) | 1110 | 21.8 |
496 | (TJ) (T) (A) | 1110 | 21.8 |
497 | (JK) (J7) | 1110 | 21.8 |
498 | (A) (A) (Q9) | 1109 | 21.8 |
499 | (AJ) (Q) (9) | 1109 | 21.8 |
500 | (AT) (J) (8) | 1109 | 21.8 |
501 | (KJ) (Q) (9) | 1109 | 21.8 |
502 | (JT) (98) | 1109 | 21.8 |
503 | (A) (A) (Q) (T) | 1108 | 21.8 |
504 | (JA) (J7) | 1107 | 21.7 |
505 | (A9) (K) (T) | 1107 | 21.7 |
506 | (AT) (A) (6) | 1107 | 21.7 |
507 | (KQ) (J) (9) | 1107 | 21.7 |
508 | (A8) (A) (8) | 1106 | 21.7 |
509 | (QAK) (Q) | 1106 | 21.7 |
510 | (A7) (A) (J) | 1105 | 21.7 |
511 | (AK) (T6) | 1105 | 21.7 |
512 | (K) (K) (A9) | 1105 | 21.7 |
513 | (QT9) (J) | 1104 | 21.7 |
514 | (Q) (JT) (8) | 1104 | 21.7 |
515 | (K8) (J) (T) | 1103 | 21.7 |
516 | (KT) (J) (8) | 1103 | 21.7 |
517 | (KA) (K) (9) | 1103 | 21.7 |
518 | (9A) (9T) | 1102 | 21.6 |
519 | (AK) (A) (8) | 1102 | 21.6 |
520 | (A) (A) (K9) | 1102 | 21.6 |
521 | (J9) (J) (T) | 1101 | 21.6 |
522 | (A8) (J) (T) | 1101 | 21.6 |
523 | (Q) (Q) (T) (T) | 1101 | 21.6 |
524 | (KT) (K) (8) | 1101 | 21.6 |
525 | (AJ) (T) (8) | 1101 | 21.6 |
526 | (JQ) (J6) | 1100 | 21.6 |
527 | (AJ) (A) (6) | 1100 | 21.6 |
528 | (A9) (J8) | 1100 | 21.6 |
529 | (KJ) (K) (9) | 1099 | 21.6 |
530 | (K9) (K7) | 1098 | 21.6 |
531 | (Q8) (Q8) | 1098 | 21.6 |
532 | (K) (Q9) (J) | 1098 | 21.6 |
533 | (A) (A) (T) (T) | 1098 | 21.6 |
534 | (A) (A) (T9) | 1098 | 21.6 |
535 | (KJ) (T) (8) | 1098 | 21.6 |
536 | (QJ9) (T) | 1098 | 21.6 |
537 | (JT) (J) (9) | 1098 | 21.6 |
538 | (AT) (98) | 1098 | 21.6 |
539 | (TJ) (T7) | 1097 | 21.5 |
540 | (AT) (K) (9) | 1096 | 21.5 |
541 | (AQ) (A) (7) | 1096 | 21.5 |
542 | (A) (K) (J) (T) | 1096 | 21.5 |
543 | (A) (JT) (9) | 1095 | 21.5 |
544 | (A8) (K9) | 1095 | 21.5 |
545 | (K6) (K6) | 1095 | 21.5 |
546 | (A7) (A) (K) | 1095 | 21.5 |
547 | (A) (A) (Q) (J) | 1094 | 21.5 |
548 | (TKJ) (T) | 1094 | 21.5 |
549 | (A6) (A) (T) | 1094 | 21.5 |
550 | (Q) (Q) (J) (T) | 1094 | 21.5 |
551 | (A9) (K) (J) | 1094 | 21.5 |
552 | (Q) (JT9) | 1094 | 21.5 |
553 | (A7) (A) (Q) | 1094 | 21.5 |
554 | (A9) (T8) | 1093 | 21.5 |
555 | (KQJT) | 1093 | 21.5 |
556 | (AK) (A) (7) | 1092 | 21.4 |
557 | (TK) (T8) | 1092 | 21.4 |
558 | (JT) (J6) | 1091 | 21.4 |
559 | (Q9) (T8) | 1091 | 21.4 |
560 | (A) (J9) (T) | 1090 | 21.4 |
561 | (K8) (K) (T) | 1090 | 21.4 |
562 | (AJ) (K) (9) | 1090 | 21.4 |
563 | (QAJ) (Q) | 1089 | 21.4 |
564 | (J) (J) (Q) (T) | 1089 | 21.4 |
565 | (K) (K) (Q) (J) | 1089 | 21.4 |
566 | (AQ) (A) (6) | 1089 | 21.4 |
567 | (AK) (J6) | 1089 | 21.4 |
568 | (A8) (T9) | 1089 | 21.4 |
569 | (K) (Q) (T9) | 1088 | 21.4 |
570 | (QAT) (Q) | 1087 | 21.3 |
571 | (A) (J) (T9) | 1087 | 21.3 |
572 | (A9) (Q8) | 1086 | 21.3 |
573 | (J) (J) (T) (T) | 1086 | 21.3 |
574 | (A) (K) (Q) (J) | 1085 | 21.3 |
575 | (A9) (K) (Q) | 1085 | 21.3 |
576 | (K9) (K) (A) | 1085 | 21.3 |
577 | (TQ) (T) (A) | 1084 | 21.3 |
578 | (A) (K) (Q) (T) | 1084 | 21.3 |
579 | (A) (A) (J9) | 1084 | 21.3 |
580 | (A6) (A) (K) | 1083 | 21.3 |
581 | (K9) (K) (Q) | 1083 | 21.3 |
582 | (AT) (Q) (8) | 1083 | 21.3 |
583 | (A6) (A) (Q) | 1083 | 21.3 |
584 | (AK) (T) (9) | 1083 | 21.3 |
585 | (AK) (A) (6) | 1083 | 21.3 |
586 | (K9) (K) (9) | 1082 | 21.2 |
587 | (KT9) (J) | 1082 | 21.2 |
588 | (K9) (K6) | 1081 | 21.2 |
589 | (K) (K) (Q) (T) | 1081 | 21.2 |
590 | (K) (K) (T9) | 1080 | 21.2 |
591 | (9Q) (9J) | 1080 | 21.2 |
592 | (K) (K) (A) (Q) | 1080 | 21.2 |
593 | (TK) (T7) | 1080 | 21.2 |
594 | (A7) (A) (7) | 1080 | 21.2 |
595 | (JK) (J6) | 1079 | 21.2 |
596 | (AK) (J) (9) | 1079 | 21.2 |
597 | (TJ) (T) (9) | 1079 | 21.2 |
598 | (Q) (J) (T8) | 1079 | 21.2 |
599 | (JAQ) (J) | 1078 | 21.2 |
600 | (A) (QT) (9) | 1078 | 21.2 |
601 | (A8) (Q) (T) | 1078 | 21.2 |
602 | (TK) (T) (A) | 1077 | 21.2 |
603 | (A) (Q9) (J) | 1077 | 21.1 |
604 | (Q9) (Q) (J) | 1077 | 21.1 |
605 | (Q8) (J9) | 1076 | 21.1 |
606 | (K) (Q) (J9) | 1076 | 21.1 |
607 | (JA) (J6) | 1076 | 21.1 |
608 | (A6) (A) (J) | 1076 | 21.1 |
609 | (9K) (9J) | 1076 | 21.1 |
610 | (KQ) (K) (9) | 1076 | 21.1 |
611 | (Q9) (J8) | 1075 | 21.1 |
612 | (TQ) (T7) | 1075 | 21.1 |
613 | (T) (T) (J9) | 1075 | 21.1 |
614 | (TA) (T7) | 1075 | 21.1 |
615 | (KA) (K) (8) | 1075 | 21.1 |
616 | (Q) (Q) (K) (T) | 1075 | 21.1 |
617 | (AQJT) | 1075 | 21.1 |
618 | (KA) (K) (7) | 1074 | 21.1 |
619 | (AJ) (Q) (8) | 1074 | 21.1 |
620 | (A8) (J9) | 1073 | 21.1 |
621 | (QT) (98) | 1073 | 21.1 |
622 | (K) (K) (A7) | 1073 | 21.1 |
623 | (A) (Q9) (T) | 1073 | 21.1 |
624 | (K8) (J9) | 1073 | 21.1 |
625 | (K) (K) (A8) | 1072 | 21.0 |
626 | (A) (A) (K8) | 1072 | 21.0 |
627 | (K) (QJ) (9) | 1071 | 21.0 |
628 | (JAT) (J) | 1071 | 21.0 |
629 | (T) (T) (Q) (J) | 1071 | 21.0 |
630 | (T) (T) (AK) | 1070 | 21.0 |
631 | (Q) (Q) (K) (J) | 1070 | 21.0 |
632 | (K9) (T8) | 1070 | 21.0 |
633 | (KJ9) (T) | 1070 | 21.0 |
634 | (AK) (Q) (9) | 1069 | 21.0 |
635 | (K8) (T9) | 1069 | 21.0 |
636 | (A) (K9) (T) | 1069 | 21.0 |
637 | (T9) (T) (J) | 1069 | 21.0 |
638 | (Q8) (T9) | 1069 | 21.0 |
639 | (KT) (J) (7) | 1069 | 21.0 |
640 | (A8) (Q) (J) | 1068 | 21.0 |
641 | (Q7) (J) (T) | 1067 | 21.0 |
642 | (A8) (Q9) | 1066 | 20.9 |
643 | (Q) (Q) (T9) | 1066 | 20.9 |
644 | (K8) (K) (A) | 1066 | 20.9 |
645 | (A) (A) (T8) | 1066 | 20.9 |
646 | (AJ) (98) | 1065 | 20.9 |
647 | (K) (J) (T8) | 1065 | 20.9 |
648 | (AT9) (A) | 1064 | 20.9 |
649 | (K8) (K) (J) | 1064 | 20.9 |
650 | (K) (JT) (8) | 1064 | 20.9 |
651 | (QJ) (Q) (9) | 1064 | 20.9 |
652 | (K8) (Q) (T) | 1063 | 20.9 |
653 | (A) (A) (K) (Q) | 1063 | 20.9 |
654 | (K7) (K) (T) | 1063 | 20.9 |
655 | (A) (A) (K) (J) | 1063 | 20.9 |
656 | (K9) (J8) | 1062 | 20.9 |
657 | (TQ) (T6) | 1062 | 20.8 |
658 | (KT) (Q) (8) | 1062 | 20.8 |
659 | (K) (K) (A) (J) | 1062 | 20.8 |
660 | (A) (K9) (J) | 1061 | 20.8 |
661 | (J) (J) (T9) | 1060 | 20.8 |
662 | (J9) (T7) | 1060 | 20.8 |
663 | (J) (J) (K) (Q) | 1060 | 20.8 |
664 | (KJT) (9) | 1060 | 20.8 |
665 | (KT) (98) | 1060 | 20.8 |
666 | (KJ) (Q) (8) | 1060 | 20.8 |
667 | (A) (A) (K) (T) | 1060 | 20.8 |
668 | (KJ) (T) (7) | 1060 | 20.8 |
669 | (K9) (T7) | 1059 | 20.8 |
670 | (A) (KT) (9) | 1059 | 20.8 |
671 | (A) (A) (J8) | 1059 | 20.8 |
672 | (KA) (K) (6) | 1058 | 20.8 |
673 | (QA) (Q) (9) | 1057 | 20.8 |
674 | (K) (K) (Q9) | 1057 | 20.8 |
675 | (A9) (T7) | 1057 | 20.8 |
676 | (KQ) (T) (8) | 1057 | 20.8 |
677 | (J7) (T9) | 1057 | 20.7 |
678 | (Q) (Q) (K9) | 1056 | 20.7 |
679 | (K8) (Q9) | 1056 | 20.7 |
680 | (A) (QJ) (9) | 1056 | 20.7 |
681 | (KT) (K) (7) | 1055 | 20.7 |
682 | (AJ9) (A) | 1055 | 20.7 |
683 | (K8) (K7) | 1055 | 20.7 |
684 | (8A) (8K) | 1054 | 20.7 |
685 | (AQ) (T) (8) | 1054 | 20.7 |
686 | (QT) (J) (7) | 1054 | 20.7 |
687 | (A) (K9) (Q) | 1053 | 20.7 |
688 | (K7) (K) (A) | 1053 | 20.7 |
689 | (A) (KJ) (9) | 1053 | 20.7 |
690 | (AQ) (K) (9) | 1053 | 20.7 |
691 | (AT) (J) (7) | 1053 | 20.7 |
692 | (K) (J8) (T) | 1053 | 20.7 |
693 | (QJ) (T) (7) | 1052 | 20.7 |
694 | (AJ9) (T) | 1052 | 20.7 |
695 | (K8) (Q) (J) | 1052 | 20.7 |
696 | (A) (A) (Q8) | 1052 | 20.7 |
697 | (AT) (K) (8) | 1052 | 20.7 |
698 | (TJ) (T6) | 1052 | 20.7 |
699 | (Q9) (Q8) | 1052 | 20.7 |
700 | (A8) (K) (T) | 1051 | 20.6 |
701 | (AJT) (9) | 1051 | 20.6 |
702 | (Q8) (Q) (T) | 1051 | 20.6 |
703 | (9K) (9Q) | 1051 | 20.6 |
704 | (QT) (Q) (8) | 1051 | 20.6 |
705 | (JQ) (J) (9) | 1051 | 20.6 |
706 | (AQ) (J) (8) | 1050 | 20.6 |
707 | (Q) (J) (T) (9) | 1050 | 20.6 |
708 | (AJ) (T) (7) | 1050 | 20.6 |
709 | (A) (A) (K7) | 1050 | 20.6 |
710 | (TAJ) (T) | 1049 | 20.6 |
711 | (K) (K) (J9) | 1049 | 20.6 |
712 | (A) (Q) (J9) | 1049 | 20.6 |
713 | (K) (Q8) (T) | 1048 | 20.6 |
714 | (TQ) (T) (9) | 1048 | 20.6 |
715 | (K7) (J) (T) | 1047 | 20.6 |
716 | (Q) (Q) (A) (K) | 1047 | 20.6 |
717 | (A9) (K7) | 1047 | 20.6 |
718 | (Q9) (Q) (K) | 1047 | 20.6 |
719 | (AQ9) (A) | 1047 | 20.6 |
720 | (K7) (K) (J) | 1046 | 20.5 |
721 | (KJ) (K) (8) | 1045 | 20.5 |
722 | (TK) (T6) | 1045 | 20.5 |
723 | (K) (QT) (8) | 1045 | 20.5 |
724 | (K8) (K6) | 1044 | 20.5 |
725 | (A7) (J) (T) | 1044 | 20.5 |
726 | (QA) (Q) (8) | 1044 | 20.5 |
727 | (Q) (Q) (J9) | 1043 | 20.5 |
728 | (J9) (J) (Q) | 1043 | 20.5 |
729 | (K) (K) (A) (T) | 1043 | 20.5 |
730 | (TKQ) (T) | 1042 | 20.5 |
731 | (A) (Q) (T9) | 1042 | 20.5 |
732 | (A7) (K9) | 1041 | 20.4 |
733 | (K) (JT9) | 1041 | 20.4 |
734 | (KQ) (T) (7) | 1041 | 20.4 |
735 | (QK) (Q) (9) | 1041 | 20.4 |
736 | (J) (J) (Q9) | 1041 | 20.4 |
737 | (A7) (T9) | 1041 | 20.4 |
738 | (A) (A) (K6) | 1040 | 20.4 |
739 | (JT) (97) | 1040 | 20.4 |
740 | (J) (J) (K) (T) | 1040 | 20.4 |
741 | (K6) (K) (A) | 1040 | 20.4 |
742 | (Q) (JT) (7) | 1040 | 20.4 |
743 | (A) (J8) (T) | 1039 | 20.4 |
744 | (AK) (T) (8) | 1039 | 20.4 |
745 | (K8) (K) (Q) | 1039 | 20.4 |
746 | (JA) (J) (9) | 1039 | 20.4 |
747 | (TA) (T6) | 1038 | 20.4 |
748 | (K) (K) (T8) | 1038 | 20.4 |
749 | (KQ) (J) (8) | 1038 | 20.4 |
750 | (A) (A) (Q7) | 1038 | 20.4 |
751 | (K7) (T9) | 1038 | 20.4 |
752 | (A9) (Q7) | 1038 | 20.4 |
753 | (KT) (Q) (7) | 1038 | 20.4 |
754 | (QT8) (J) | 1037 | 20.4 |
755 | (A) (JT) (8) | 1037 | 20.4 |
756 | (K9) (Q8) | 1037 | 20.4 |
757 | (AK) (J) (8) | 1037 | 20.4 |
758 | (QJ) (98) | 1037 | 20.4 |
759 | (Q) (JT8) | 1036 | 20.3 |
760 | (Q9) (T7) | 1036 | 20.3 |
761 | (KJ) (K) (7) | 1036 | 20.3 |
762 | (AT) (Q) (7) | 1035 | 20.3 |
763 | (K7) (Q) (T) | 1035 | 20.3 |
764 | (KT9) (K) | 1035 | 20.3 |
765 | (Q) (J) (T7) | 1035 | 20.3 |
766 | (KT) (K) (6) | 1034 | 20.3 |
767 | (A) (K8) (T) | 1034 | 20.3 |
768 | (KQ) (K) (8) | 1034 | 20.3 |
769 | (A) (J) (T8) | 1034 | 20.3 |
770 | (AQ) (K) (8) | 1033 | 20.3 |
771 | (AT9) (J) | 1033 | 20.3 |
772 | (AJ8) (A) | 1033 | 20.3 |
773 | (A8) (K) (J) | 1033 | 20.3 |
774 | (KJ) (98) | 1033 | 20.3 |
775 | (A8) (K) (Q) | 1032 | 20.3 |
776 | (AQ) (98) | 1032 | 20.3 |
777 | (J) (J) (K9) | 1032 | 20.3 |
778 | (AT) (97) | 1032 | 20.3 |
779 | (A) (K) (T9) | 1031 | 20.2 |
780 | (A9) (A) (8) | 1031 | 20.2 |
781 | (K7) (K) (Q) | 1031 | 20.2 |
782 | (JAK) (J) | 1030 | 20.2 |
783 | (QT) (97) | 1030 | 20.2 |
784 | (A9) (J7) | 1030 | 20.2 |
785 | (Q9) (J7) | 1030 | 20.2 |
786 | (A9) (K6) | 1030 | 20.2 |
787 | (TK) (T) (9) | 1030 | 20.2 |
788 | (A) (KQ) (9) | 1030 | 20.2 |
789 | (Q) (Q) (A9) | 1030 | 20.2 |
790 | (A7) (Q9) | 1029 | 20.2 |
791 | (Q9) (Q7) | 1029 | 20.2 |
792 | (Q) (Q) (A) (J) | 1029 | 20.2 |
793 | (K) (K) (A6) | 1029 | 20.2 |
794 | (A7) (J9) | 1028 | 20.2 |
795 | (QJT) (8) | 1027 | 20.2 |
796 | (AKJT) | 1027 | 20.2 |
797 | (AK) (Q) (8) | 1026 | 20.1 |
798 | (QJ) (T) (6) | 1026 | 20.1 |
799 | (A) (A) (J7) | 1026 | 20.1 |
800 | (J) (J) (A9) | 1026 | 20.1 |
Table 3: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 801-1200
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
801 | (K9) (Q7) | 1025 | 20.1 |
802 | (JK) (J) (9) | 1025 | 20.1 |
803 | (T) (T) (K) (J) | 1025 | 20.1 |
804 | (TAQ) (T) | 1025 | 20.1 |
805 | (AQ) (T) (7) | 1025 | 20.1 |
806 | (Q) (J7) (T) | 1025 | 20.1 |
807 | (J6) (T9) | 1024 | 20.1 |
808 | (Q) (JT) (6) | 1024 | 20.1 |
809 | (K9) (J7) | 1024 | 20.1 |
810 | (Q) (Q) (A8) | 1024 | 20.1 |
811 | (K) (J7) (T) | 1024 | 20.1 |
812 | (KQ) (K) (7) | 1023 | 20.1 |
813 | (AKQJ) | 1023 | 20.1 |
814 | (AJ) (K) (8) | 1023 | 20.1 |
815 | (Q7) (T9) | 1023 | 20.1 |
816 | (J8) (J) (T) | 1023 | 20.1 |
817 | (KT9) (Q) | 1023 | 20.1 |
818 | (QT) (J) (6) | 1022 | 20.1 |
819 | (A7) (Q) (J) | 1022 | 20.1 |
820 | (KQ9) (T) | 1021 | 20.1 |
821 | (A8) (A) (9) | 1021 | 20.0 |
822 | (Q6) (J) (T) | 1021 | 20.0 |
823 | (A6) (K9) | 1020 | 20.0 |
824 | (A) (A) (T7) | 1020 | 20.0 |
825 | (K) (JT) (7) | 1020 | 20.0 |
826 | (8K) (8T) | 1020 | 20.0 |
827 | (Q9) (Q) (A) | 1020 | 20.0 |
828 | (KJ) (Q) (7) | 1019 | 20.0 |
829 | (AT) (K) (7) | 1019 | 20.0 |
830 | (A) (KT) (8) | 1019 | 20.0 |
831 | (AJ) (97) | 1019 | 20.0 |
832 | (Q) (Q) (A) (T) | 1019 | 20.0 |
833 | (TA) (T) (9) | 1019 | 20.0 |
834 | (8Q) (8T) | 1019 | 20.0 |
835 | (T9) (T) (Q) | 1019 | 20.0 |
836 | (A7) (Q) (T) | 1018 | 20.0 |
837 | (J9) (J8) | 1018 | 20.0 |
838 | (A9) (A) (7) | 1018 | 20.0 |
839 | (AT) (J) (6) | 1018 | 20.0 |
840 | (AT8) (A) | 1018 | 20.0 |
841 | (AJ) (Q) (7) | 1018 | 20.0 |
842 | (T) (T) (Q9) | 1018 | 20.0 |
843 | (A) (Q8) (T) | 1017 | 20.0 |
844 | (A) (A) (Q6) | 1017 | 20.0 |
845 | (JT) (J) (8) | 1017 | 20.0 |
846 | (K) (QT9) | 1017 | 20.0 |
847 | (8A) (8J) | 1017 | 20.0 |
848 | (K) (Q8) (J) | 1017 | 20.0 |
849 | (A) (QT) (8) | 1017 | 20.0 |
850 | (Q7) (J9) | 1016 | 20.0 |
851 | (QJ8) (T) | 1016 | 20.0 |
852 | (J8) (J8) | 1016 | 20.0 |
853 | (Q8) (Q) (J) | 1016 | 19.9 |
854 | (A) (K) (Q9) | 1016 | 19.9 |
855 | (Q9) (T6) | 1016 | 19.9 |
856 | (K) (K) (Q8) | 1016 | 19.9 |
857 | (QJ) (Q) (8) | 1016 | 19.9 |
858 | (T9) (T8) | 1015 | 19.9 |
859 | (KT) (J) (6) | 1015 | 19.9 |
860 | (K7) (Q) (J) | 1015 | 19.9 |
861 | (A) (Q8) (J) | 1014 | 19.9 |
862 | (A7) (K) (J) | 1014 | 19.9 |
863 | (A8) (K7) | 1014 | 19.9 |
864 | (QJT9) | 1014 | 19.9 |
865 | (A6) (A) (6) | 1014 | 19.9 |
866 | (K7) (J9) | 1014 | 19.9 |
867 | (J) (J) (A) (Q) | 1013 | 19.9 |
868 | (A) (K) (J9) | 1013 | 19.9 |
869 | (K6) (K) (Q) | 1013 | 19.9 |
870 | (Q) (J6) (T) | 1013 | 19.9 |
871 | (KQT) (9) | 1012 | 19.9 |
872 | (K6) (K) (T) | 1012 | 19.9 |
873 | (K7) (K6) | 1012 | 19.9 |
874 | (KT) (97) | 1012 | 19.9 |
875 | (AQ9) (T) | 1012 | 19.9 |
876 | (KQ) (K) (6) | 1012 | 19.9 |
877 | (A6) (Q9) | 1012 | 19.9 |
878 | (Q7) (Q7) | 1012 | 19.9 |
879 | (T) (T) (K9) | 1012 | 19.9 |
880 | (A7) (A) (9) | 1011 | 19.9 |
881 | (AK) (J) (7) | 1011 | 19.9 |
882 | (8A) (8Q) | 1011 | 19.9 |
883 | (K) (Q) (T8) | 1011 | 19.9 |
884 | (KJ) (K) (6) | 1011 | 19.8 |
885 | (QK) (Q) (8) | 1011 | 19.8 |
886 | (Q9) (Q) (9) | 1010 | 19.8 |
887 | (A) (K8) (J) | 1010 | 19.8 |
888 | (Q) (Q) (K8) | 1010 | 19.8 |
889 | (KT) (Q) (6) | 1010 | 19.8 |
890 | (AJ) (K) (7) | 1009 | 19.8 |
891 | (J7) (T8) | 1009 | 19.8 |
892 | (JT9) (J) | 1009 | 19.8 |
893 | (K6) (K) (J) | 1009 | 19.8 |
894 | (A7) (Q8) | 1009 | 19.8 |
895 | (KQ) (98) | 1009 | 19.8 |
896 | (K) (QJ) (8) | 1009 | 19.8 |
897 | (K7) (Q9) | 1008 | 19.8 |
898 | (A8) (Q7) | 1008 | 19.8 |
899 | (8J) (8T) | 1008 | 19.8 |
900 | (QT9) (Q) | 1008 | 19.8 |
901 | (TJ) (T) (8) | 1008 | 19.8 |
902 | (A7) (K8) | 1007 | 19.8 |
903 | (A7) (K) (T) | 1007 | 19.8 |
904 | (8A) (8T) | 1007 | 19.8 |
905 | (K) (J) (T7) | 1007 | 19.8 |
906 | (KQ) (J) (7) | 1007 | 19.8 |
907 | (Q) (Q) (T8) | 1006 | 19.8 |
908 | (A) (K8) (Q) | 1006 | 19.8 |
909 | (A) (A) (J6) | 1006 | 19.8 |
910 | (KJ) (T) (6) | 1006 | 19.8 |
911 | (AK) (T) (7) | 1006 | 19.8 |
912 | (KQ9) (J) | 1006 | 19.7 |
913 | (A) (KJ) (8) | 1006 | 19.7 |
914 | (T8) (T8) | 1006 | 19.7 |
915 | (AJ) (T) (6) | 1005 | 19.7 |
916 | (A) (A) (9) (9) | 1005 | 19.7 |
917 | (QK) (Q) (7) | 1005 | 19.7 |
918 | (AKQT) | 1004 | 19.7 |
919 | (A) (KQ) (8) | 1004 | 19.7 |
920 | (AQ) (97) | 1004 | 19.7 |
921 | (K) (J) (T) (9) | 1004 | 19.7 |
922 | (K) (QT) (7) | 1004 | 19.7 |
923 | (AK) (Q) (7) | 1004 | 19.7 |
924 | (AQ) (K) (7) | 1003 | 19.7 |
925 | (Q) (J) (T6) | 1002 | 19.7 |
926 | (J9) (T6) | 1002 | 19.7 |
927 | (QT) (Q) (7) | 1002 | 19.7 |
928 | (A) (QT9) | 1002 | 19.7 |
929 | (Q9) (Q6) | 1001 | 19.7 |
930 | (Q6) (T9) | 1001 | 19.7 |
931 | (KJ8) (T) | 1001 | 19.7 |
932 | (A) (QJ) (8) | 1001 | 19.7 |
933 | (AQ) (J) (7) | 1001 | 19.7 |
934 | (AQT) (9) | 1001 | 19.7 |
935 | (AQ8) (A) | 1001 | 19.7 |
936 | (T) (T) (J8) | 1001 | 19.7 |
937 | (AT9) (Q) | 1001 | 19.6 |
938 | (KJ) (Q) (6) | 1001 | 19.6 |
939 | (K) (K) (T7) | 1001 | 19.6 |
940 | (K6) (Q) (T) | 1000 | 19.6 |
941 | (A) (JT9) | 1000 | 19.6 |
942 | (A7) (K) (Q) | 1000 | 19.6 |
943 | (KT8) (K) | 1000 | 19.6 |
944 | (AK9) (A) | 1000 | 19.6 |
945 | (T8) (T) (J) | 1000 | 19.6 |
946 | (K) (Q7) (T) | 999 | 19.6 |
947 | (QK) (Q) (6) | 999 | 19.6 |
948 | (A9) (J6) | 999 | 19.6 |
949 | (K9) (T6) | 999 | 19.6 |
950 | (Q8) (Q) (K) | 999 | 19.6 |
951 | (K9) (Q6) | 999 | 19.6 |
952 | (AT) (96) | 998 | 19.6 |
953 | (J9) (J) (K) | 998 | 19.6 |
954 | (9J) (9) (T) | 997 | 19.6 |
955 | (JQ) (J) (8) | 997 | 19.6 |
956 | (JA) (J) (8) | 997 | 19.6 |
957 | (AK) (98) | 997 | 19.6 |
958 | (K6) (J) (T) | 997 | 19.6 |
959 | (Q) (Q) (J8) | 996 | 19.6 |
960 | (J8) (T7) | 996 | 19.5 |
961 | (T) (T) (Q8) | 996 | 19.5 |
962 | (AQ9) (J) | 995 | 19.5 |
963 | (KJ9) (Q) | 995 | 19.5 |
964 | (K6) (T9) | 995 | 19.5 |
965 | (AQ) (K) (6) | 995 | 19.5 |
966 | (KQJ) (9) | 995 | 19.5 |
967 | (Q8) (Q) (A) | 995 | 19.5 |
968 | (J) (J) (A8) | 994 | 19.5 |
969 | (A6) (Q) (J) | 994 | 19.5 |
970 | (AQJ) (9) | 993 | 19.5 |
971 | (KQ) (J) (6) | 993 | 19.5 |
972 | (QJ) (97) | 993 | 19.5 |
973 | (QT) (96) | 993 | 19.5 |
974 | (A9) (T6) | 993 | 19.5 |
975 | (AQ) (J) (6) | 992 | 19.5 |
976 | (Q7) (Q) (T) | 992 | 19.5 |
977 | (A) (Q) (J8) | 992 | 19.5 |
978 | (A) (Q) (T8) | 992 | 19.5 |
979 | (9T) (9) (J) | 992 | 19.5 |
980 | (J) (J) (T8) | 992 | 19.5 |
981 | (A6) (K8) | 992 | 19.5 |
982 | (KQ) (T) (6) | 991 | 19.5 |
983 | (AJ) (Q) (6) | 990 | 19.4 |
984 | (AT) (Q) (6) | 990 | 19.4 |
985 | (A6) (J) (T) | 990 | 19.4 |
986 | (K) (Q7) (J) | 990 | 19.4 |
987 | (Q6) (J9) | 990 | 19.4 |
988 | (KT8) (J) | 990 | 19.4 |
989 | (K) (Q) (J8) | 990 | 19.4 |
990 | (AT7) (A) | 989 | 19.4 |
991 | (K) (K) (J8) | 989 | 19.4 |
992 | (J) (J) (Q8) | 988 | 19.4 |
993 | (A9) (A) (6) | 988 | 19.4 |
994 | (JT) (96) | 988 | 19.4 |
995 | (QJ9) (Q) | 988 | 19.4 |
996 | (KT8) (Q) | 988 | 19.4 |
997 | (AJ9) (Q) | 988 | 19.4 |
998 | (AQ) (T) (6) | 988 | 19.4 |
999 | (A7) (T8) | 988 | 19.4 |
1000 | (A9) (Q6) | 988 | 19.4 |
1001 | (AT6) (A) | 988 | 19.4 |
1002 | (QT) (Q) (6) | 988 | 19.4 |
1003 | (A8) (J7) | 988 | 19.4 |
1004 | (K) (QJ) (7) | 988 | 19.4 |
1005 | (Q) (Q) (K6) | 987 | 19.4 |
1006 | (Q7) (Q) (K) | 987 | 19.4 |
1007 | (T) (T) (A9) | 986 | 19.4 |
1008 | (9) (9) (JT) | 986 | 19.4 |
1009 | (J9) (J7) | 986 | 19.4 |
1010 | (KJ) (97) | 986 | 19.4 |
1011 | (A8) (T7) | 986 | 19.4 |
1012 | (Q9) (J6) | 986 | 19.4 |
1013 | (A6) (Q) (T) | 986 | 19.4 |
1014 | (J) (J) (A) (T) | 986 | 19.4 |
1015 | (AK8) (A) | 985 | 19.3 |
1016 | (KJT) (8) | 985 | 19.3 |
1017 | (JT) (J) (7) | 985 | 19.3 |
1018 | (K9) (J6) | 985 | 19.3 |
1019 | (Q8) (T7) | 985 | 19.3 |
1020 | (AT) (87) | 985 | 19.3 |
1021 | (K) (K) (Q7) | 985 | 19.3 |
1022 | (QA) (Q) (7) | 985 | 19.3 |
1023 | (Q6) (Q) (T) | 985 | 19.3 |
1024 | (Q) (Q) (K7) | 984 | 19.3 |
1025 | (A6) (J9) | 984 | 19.3 |
1026 | (AJ8) (T) | 984 | 19.3 |
1027 | (K) (QJ) (6) | 984 | 19.3 |
1028 | (A) (KT) (7) | 984 | 19.3 |
1029 | (KT) (96) | 984 | 19.3 |
1030 | (J9) (J) (9) | 984 | 19.3 |
1031 | (A8) (K6) | 983 | 19.3 |
1032 | (AJT) (8) | 983 | 19.3 |
1033 | (A7) (J8) | 983 | 19.3 |
1034 | (K) (QJ9) | 983 | 19.3 |
1035 | (A6) (T9) | 982 | 19.3 |
1036 | (AK) (97) | 982 | 19.3 |
1037 | (A) (A) (T) (9) | 982 | 19.3 |
1038 | (8Q) (8J) | 982 | 19.3 |
1039 | (TJ9) (T) | 982 | 19.3 |
1040 | (K6) (Q) (J) | 982 | 19.3 |
1041 | (KJ9) (K) | 981 | 19.3 |
1042 | (T) (T) (K) (Q) | 981 | 19.3 |
1043 | (J) (T8) (9) | 981 | 19.3 |
1044 | (Q7) (Q) (J) | 981 | 19.3 |
1045 | (TA) (T) (8) | 981 | 19.3 |
1046 | (A) (K7) (Q) | 981 | 19.3 |
1047 | (J8) (J) (Q) | 980 | 19.2 |
1048 | (A) (JT) (7) | 980 | 19.2 |
1049 | (AT) (K) (6) | 980 | 19.2 |
1050 | (9A) (9) (T) | 980 | 19.2 |
1051 | (TQ) (T) (8) | 980 | 19.2 |
1052 | (AJ7) (A) | 979 | 19.2 |
1053 | (8K) (8Q) | 979 | 19.2 |
1054 | (A) (KJ) (7) | 979 | 19.2 |
1055 | (JK) (J) (8) | 979 | 19.2 |
1056 | (9Q) (9) (T) | 979 | 19.2 |
1057 | (A) (A) (T6) | 978 | 19.2 |
1058 | (Q6) (Q) (K) | 978 | 19.2 |
1059 | (AJ) (96) | 978 | 19.2 |
1060 | (K7) (Q8) | 978 | 19.2 |
1061 | (K8) (T7) | 978 | 19.2 |
1062 | (T) (T) (A) (J) | 978 | 19.2 |
1063 | (K) (QT) (6) | 977 | 19.2 |
1064 | (K) (JT) (6) | 977 | 19.2 |
1065 | (AT8) (J) | 977 | 19.2 |
1066 | (K) (K) (J7) | 977 | 19.2 |
1067 | (K7) (J8) | 976 | 19.2 |
1068 | (Q) (JT7) | 976 | 19.2 |
1069 | (AKT) (9) | 976 | 19.2 |
1070 | (A) (K) (Q8) | 976 | 19.2 |
1071 | (TAK) (T) | 976 | 19.2 |
1072 | (KT) (87) | 975 | 19.2 |
1073 | (J8) (T) (9) | 975 | 19.2 |
1074 | (Q) (J) (T) (8) | 975 | 19.1 |
1075 | (KA9) (K) | 975 | 19.1 |
1076 | (K8) (K) (8) | 975 | 19.1 |
1077 | (A) (K7) (J) | 975 | 19.1 |
1078 | (KQ9) (K) | 975 | 19.1 |
1079 | (AK) (Q) (6) | 975 | 19.1 |
1080 | (A) (J7) (T) | 975 | 19.1 |
1081 | (K8) (Q7) | 974 | 19.1 |
1082 | (A6) (A) (9) | 974 | 19.1 |
1083 | (8K) (8J) | 974 | 19.1 |
1084 | (T9) (T) (9) | 974 | 19.1 |
1085 | (Q) (Q) (A7) | 974 | 19.1 |
1086 | (AJ) (K) (6) | 974 | 19.1 |
1087 | (AQ7) (A) | 974 | 19.1 |
1088 | (K7) (T8) | 974 | 19.1 |
1089 | (J9) (T) (8) | 974 | 19.1 |
1090 | (A) (K) (J8) | 973 | 19.1 |
1091 | (A6) (K) (Q) | 973 | 19.1 |
1092 | (K) (K) (T6) | 973 | 19.1 |
1093 | (JT) (87) | 973 | 19.1 |
1094 | (A) (K7) (T) | 973 | 19.1 |
1095 | (KQ8) (T) | 973 | 19.1 |
1096 | (AKJ) (9) | 972 | 19.1 |
1097 | (KJ) (96) | 972 | 19.1 |
1098 | (QJ) (Q) (7) | 972 | 19.1 |
1099 | (K6) (Q9) | 972 | 19.1 |
1100 | (T9) (T) (K) | 972 | 19.1 |
1101 | (KJT9) | 972 | 19.1 |
1102 | (A6) (Q8) | 971 | 19.1 |
1103 | (A) (K) (T8) | 971 | 19.1 |
1104 | (QA) (Q) (6) | 971 | 19.1 |
1105 | (AT9) (K) | 970 | 19.0 |
1106 | (K6) (J9) | 970 | 19.0 |
1107 | (A) (A) (J) (9) | 970 | 19.0 |
1108 | (Q6) (Q6) | 970 | 19.0 |
1109 | (KQT) (8) | 970 | 19.0 |
1110 | (K) (Q) (J7) | 969 | 19.0 |
1111 | (KT7) (J) | 969 | 19.0 |
1112 | (AK9) (J) | 969 | 19.0 |
1113 | (A) (QT) (7) | 969 | 19.0 |
1114 | (K8) (J7) | 969 | 19.0 |
1115 | (K) (Q6) (J) | 969 | 19.0 |
1116 | (A8) (A) (7) | 969 | 19.0 |
1117 | (Q8) (Q7) | 968 | 19.0 |
1118 | (K) (Q6) (T) | 968 | 19.0 |
1119 | (K) (JT8) | 968 | 19.0 |
1120 | (K) (K) (Q6) | 968 | 19.0 |
1121 | (AQ6) (A) | 968 | 19.0 |
1122 | (9K) (9) (T) | 968 | 19.0 |
1123 | (J7) (J) (T) | 968 | 19.0 |
1124 | (T) (T) (A8) | 967 | 19.0 |
1125 | (JT) (9) (8) | 967 | 19.0 |
1126 | (J) (T9) (8) | 967 | 19.0 |
1127 | (Q7) (T8) | 967 | 19.0 |
1128 | (AJ) (87) | 967 | 19.0 |
1129 | (K) (J6) (T) | 966 | 19.0 |
1130 | (AK) (96) | 966 | 19.0 |
1131 | (A7) (A) (8) | 966 | 19.0 |
1132 | (A) (QJ) (7) | 965 | 19.0 |
1133 | (JQ9) (J) | 965 | 19.0 |
1134 | (A8) (A) (6) | 965 | 18.9 |
1135 | (AK) (T) (6) | 965 | 18.9 |
1136 | (A) (Q7) (J) | 965 | 18.9 |
1137 | (KA8) (K) | 965 | 18.9 |
1138 | (J) (J) (Q7) | 964 | 18.9 |
1139 | (K) (Q) (T7) | 964 | 18.9 |
1140 | (A6) (J8) | 964 | 18.9 |
1141 | (AK) (J) (6) | 964 | 18.9 |
1142 | (AK9) (T) | 964 | 18.9 |
1143 | (J9) (J) (A) | 964 | 18.9 |
1144 | (Q6) (Q) (J) | 963 | 18.9 |
1145 | (TQ9) (T) | 963 | 18.9 |
1146 | (A6) (K) (J) | 963 | 18.9 |
1147 | (J) (J) (K8) | 963 | 18.9 |
1148 | (QJ) (Q) (6) | 962 | 18.9 |
1149 | (TJ) (T) (7) | 962 | 18.9 |
1150 | (QJT) (7) | 962 | 18.9 |
1151 | (KA7) (K) | 962 | 18.9 |
1152 | (Q) (Q) (A6) | 962 | 18.9 |
1153 | (T9) (T7) | 962 | 18.9 |
1154 | (JK) (J) (7) | 962 | 18.9 |
1155 | (A) (KQ) (7) | 962 | 18.9 |
1156 | (Q8) (T6) | 962 | 18.9 |
1157 | (A) (Q7) (T) | 962 | 18.9 |
1158 | (QT7) (J) | 961 | 18.9 |
1159 | (A8) (Q6) | 961 | 18.9 |
1160 | (J) (J) (T7) | 961 | 18.9 |
1161 | (AJ9) (K) | 961 | 18.9 |
1162 | (Q7) (J8) | 960 | 18.9 |
1163 | (T) (T) (K8) | 960 | 18.9 |
1164 | (TJ8) (T) | 960 | 18.8 |
1165 | (Q) (Q) (T7) | 960 | 18.8 |
1166 | (A) (K6) (Q) | 960 | 18.8 |
1167 | (Q) (Q) (T) (9) | 960 | 18.8 |
1168 | (J7) (J7) | 960 | 18.8 |
1169 | (QT8) (Q) | 960 | 18.8 |
1170 | (J) (T) (98) | 960 | 18.8 |
1171 | (TK) (T) (8) | 959 | 18.8 |
1172 | (Q8) (Q6) | 959 | 18.8 |
1173 | (A) (J) (T7) | 959 | 18.8 |
1174 | (T7) (T) (J) | 959 | 18.8 |
1175 | (A) (K) (Q7) | 958 | 18.8 |
1176 | (J) (J) (T) (9) | 958 | 18.8 |
1177 | (A7) (K6) | 958 | 18.8 |
1178 | (Q8) (J7) | 958 | 18.8 |
1179 | (A) (KT9) | 957 | 18.8 |
1180 | (QJ) (96) | 957 | 18.8 |
1181 | (7A) (7K) | 957 | 18.8 |
1182 | (K9) (K) (8) | 956 | 18.8 |
1183 | (A6) (K) (T) | 956 | 18.8 |
1184 | (K) (Q) (T) (9) | 956 | 18.8 |
1185 | (QK9) (Q) | 956 | 18.8 |
1186 | (A) (A) (Q) (9) | 956 | 18.8 |
1187 | (9) (9) (QT) | 956 | 18.8 |
1188 | (AQ) (96) | 955 | 18.8 |
1189 | (AT8) (K) | 955 | 18.7 |
1190 | (JT8) (J) | 955 | 18.7 |
1191 | (9A) (9) (J) | 955 | 18.7 |
1192 | (A) (QJ9) | 955 | 18.7 |
1193 | (J8) (T6) | 954 | 18.7 |
1194 | (A) (JT8) | 954 | 18.7 |
1195 | (JA) (J) (7) | 954 | 18.7 |
1196 | (QJ7) (T) | 954 | 18.7 |
1197 | (AJ6) (A) | 954 | 18.7 |
1198 | (AT) (86) | 953 | 18.7 |
1199 | (K8) (Q6) | 953 | 18.7 |
1200 | (K) (Q) (T6) | 953 | 18.7 |
Table 4: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 1201-1600
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
1201 | (J) (J) (A) (K) | 953 | 18.7 |
1202 | (KQ) (97) | 953 | 18.7 |
1203 | (A9) (T) (8) | 953 | 18.7 |
1204 | (AK7) (A) | 953 | 18.7 |
1205 | (AQ9) (K) | 953 | 18.7 |
1206 | (K) (QT8) | 953 | 18.7 |
1207 | (Q9) (T) (8) | 953 | 18.7 |
1208 | (K) (K) (T) (9) | 952 | 18.7 |
1209 | (9) (9) (KT) | 952 | 18.7 |
1210 | (QT) (87) | 952 | 18.7 |
1211 | (J) (J) (K7) | 952 | 18.7 |
1212 | (JQ) (J) (7) | 952 | 18.7 |
1213 | (A) (J) (T) (9) | 952 | 18.7 |
1214 | (T8) (T) (Q) | 952 | 18.7 |
1215 | (AQ8) (T) | 951 | 18.7 |
1216 | (AK6) (A) | 951 | 18.7 |
1217 | (KT7) (K) | 951 | 18.7 |
1218 | (K) (K) (J6) | 951 | 18.7 |
1219 | (AQ) (87) | 951 | 18.7 |
1220 | (AT) (9) (8) | 951 | 18.7 |
1221 | (T) (T) (J7) | 951 | 18.7 |
1222 | (9) (9) (AT) | 950 | 18.7 |
1223 | (9Q) (9) (J) | 950 | 18.7 |
1224 | (K) (Q) (J6) | 950 | 18.7 |
1225 | (AJ8) (Q) | 950 | 18.7 |
1226 | (J8) (J7) | 950 | 18.7 |
1227 | (K) (J) (T6) | 950 | 18.7 |
1228 | (A6) (T8) | 949 | 18.6 |
1229 | (KJT) (7) | 949 | 18.6 |
1230 | (J6) (T8) | 948 | 18.6 |
1231 | (A) (KQ) (6) | 948 | 18.6 |
1232 | (A8) (T6) | 948 | 18.6 |
1233 | (K7) (K) (7) | 948 | 18.6 |
1234 | (A6) (K7) | 948 | 18.6 |
1235 | (AQT) (8) | 947 | 18.6 |
1236 | (JQ) (J) (6) | 947 | 18.6 |
1237 | (AK) (87) | 946 | 18.6 |
1238 | (KJ7) (T) | 946 | 18.6 |
1239 | (J8) (J) (K) | 946 | 18.6 |
1240 | (T) (T) (J) (9) | 946 | 18.6 |
1241 | (Q6) (J8) | 945 | 18.6 |
1242 | (KQ8) (J) | 945 | 18.6 |
1243 | (A) (K) (J7) | 945 | 18.6 |
1244 | (KJ8) (K) | 945 | 18.5 |
1245 | (QT) (9) (8) | 944 | 18.5 |
1246 | (9T) (9) (Q) | 944 | 18.5 |
1247 | (QJ8) (Q) | 944 | 18.5 |
1248 | (A) (QT) (6) | 944 | 18.5 |
1249 | (QT6) (J) | 943 | 18.5 |
1250 | (KQ8) (K) | 943 | 18.5 |
1251 | (Q) (Q) (J7) | 943 | 18.5 |
1252 | (Q) (Q) (T6) | 942 | 18.5 |
1253 | (A) (Q6) (J) | 941 | 18.5 |
1254 | (A) (Q) (J7) | 941 | 18.5 |
1255 | (AQ8) (J) | 941 | 18.5 |
1256 | (A) (Q6) (T) | 941 | 18.5 |
1257 | (Q8) (T) (9) | 940 | 18.5 |
1258 | (TK) (T) (7) | 940 | 18.5 |
1259 | (A6) (A) (8) | 940 | 18.5 |
1260 | (Q) (JT6) | 940 | 18.5 |
1261 | (K6) (Q8) | 939 | 18.4 |
1262 | (AK9) (Q) | 939 | 18.4 |
1263 | (A7) (A) (6) | 939 | 18.4 |
1264 | (K8) (K) (9) | 939 | 18.4 |
1265 | (J9) (J6) | 939 | 18.4 |
1266 | (A) (A) (T) (8) | 938 | 18.4 |
1267 | (JT) (86) | 938 | 18.4 |
1268 | (JT) (J) (6) | 938 | 18.4 |
1269 | (A) (KJ9) | 938 | 18.4 |
1270 | (Q6) (T8) | 938 | 18.4 |
1271 | (A) (QJ) (6) | 938 | 18.4 |
1272 | (K8) (T6) | 938 | 18.4 |
1273 | (A) (QT8) | 937 | 18.4 |
1274 | (7A) (7Q) | 937 | 18.4 |
1275 | (A8) (J6) | 937 | 18.4 |
1276 | (KJ8) (Q) | 937 | 18.4 |
1277 | (K) (JT7) | 937 | 18.4 |
1278 | (A) (KT) (6) | 937 | 18.4 |
1279 | (QJT) (6) | 937 | 18.4 |
1280 | (J6) (J) (Q) | 936 | 18.4 |
1281 | (AT8) (Q) | 936 | 18.4 |
1282 | (A) (K6) (T) | 936 | 18.4 |
1283 | (QJ6) (T) | 936 | 18.4 |
1284 | (A) (KQ9) | 935 | 18.4 |
1285 | (K6) (T8) | 935 | 18.4 |
1286 | (Q7) (Q) (A) | 935 | 18.4 |
1287 | (A) (Q) (T7) | 935 | 18.4 |
1288 | (TQ) (T) (7) | 935 | 18.4 |
1289 | (JK9) (J) | 935 | 18.3 |
1290 | (KQT9) | 935 | 18.3 |
1291 | (QJ) (87) | 934 | 18.3 |
1292 | (QA9) (Q) | 934 | 18.3 |
1293 | (A6) (A) (7) | 934 | 18.3 |
1294 | (7K) (7Q) | 934 | 18.3 |
1295 | (K8) (T) (9) | 934 | 18.3 |
1296 | (QT) (86) | 933 | 18.3 |
1297 | (KJ7) (K) | 933 | 18.3 |
1298 | (K) (Q) (J) (9) | 933 | 18.3 |
1299 | (J6) (J) (T) | 933 | 18.3 |
1300 | (T) (T) (A) (Q) | 932 | 18.3 |
1301 | (AJ8) (K) | 932 | 18.3 |
1302 | (AK8) (T) | 932 | 18.3 |
1303 | (7J) (7T) | 932 | 18.3 |
1304 | (TK9) (T) | 932 | 18.3 |
1305 | (Q) (T9) (8) | 932 | 18.3 |
1306 | (A9) (J) (8) | 932 | 18.3 |
1307 | (KT6) (K) | 932 | 18.3 |
1308 | (K9) (T) (8) | 931 | 18.3 |
1309 | (AJ) (86) | 931 | 18.3 |
1310 | (KA6) (K) | 931 | 18.3 |
1311 | (KJ) (87) | 931 | 18.3 |
1312 | (A) (KJ) (6) | 931 | 18.3 |
1313 | (7A) (7T) | 931 | 18.3 |
1314 | (J7) (J) (Q) | 931 | 18.3 |
1315 | (7A) (7J) | 930 | 18.3 |
1316 | (A7) (Q6) | 930 | 18.3 |
1317 | (7Q) (7T) | 930 | 18.3 |
1318 | (T9) (T) (A) | 930 | 18.3 |
1319 | (J8) (J) (A) | 929 | 18.2 |
1320 | (A) (J6) (T) | 929 | 18.2 |
1321 | (A) (K6) (J) | 929 | 18.2 |
1322 | (AQJ) (8) | 929 | 18.2 |
1323 | (K8) (J6) | 929 | 18.2 |
1324 | (Q) (Q) (J6) | 928 | 18.2 |
1325 | (J) (J) (A7) | 928 | 18.2 |
1326 | (JK) (J) (6) | 928 | 18.2 |
1327 | (9) (9) (AJ) | 928 | 18.2 |
1328 | (K) (K) (J) (9) | 928 | 18.2 |
1329 | (J7) (T) (9) | 928 | 18.2 |
1330 | (T) (T) (K7) | 927 | 18.2 |
1331 | (A) (A) (J) (8) | 927 | 18.2 |
1332 | (9JT) (9) | 927 | 18.2 |
1333 | (KT) (86) | 927 | 18.2 |
1334 | (KT) (9) (8) | 927 | 18.2 |
1335 | (T9) (T6) | 927 | 18.2 |
1336 | (KQ) (87) | 927 | 18.2 |
1337 | (9T) (98) | 927 | 18.2 |
1338 | (A) (KT8) | 926 | 18.2 |
1339 | (9A) (9) (Q) | 926 | 18.2 |
1340 | (A) (QJ8) | 926 | 18.2 |
1341 | (AJ7) (T) | 926 | 18.2 |
1342 | (AQ) (86) | 926 | 18.2 |
1343 | (A) (JT) (6) | 926 | 18.2 |
1344 | (A) (K) (Q6) | 926 | 18.2 |
1345 | (QJT8) | 925 | 18.2 |
1346 | (KQ) (96) | 925 | 18.2 |
1347 | (Q8) (Q) (8) | 925 | 18.2 |
1348 | (K) (J) (T) (8) | 925 | 18.2 |
1349 | (TA) (T) (7) | 925 | 18.2 |
1350 | (K) (QJ8) | 925 | 18.2 |
1351 | (J) (J) (Q6) | 925 | 18.2 |
1352 | (A8) (J) (9) | 925 | 18.2 |
1353 | (A) (K) (T7) | 925 | 18.2 |
1354 | (K6) (J8) | 925 | 18.2 |
1355 | (KT7) (Q) | 924 | 18.1 |
1356 | (9K) (9) (J) | 924 | 18.1 |
1357 | (AKT) (8) | 924 | 18.1 |
1358 | (KQJ) (8) | 924 | 18.1 |
1359 | (Q) (T) (98) | 924 | 18.1 |
1360 | (Q6) (Q) (A) | 923 | 18.1 |
1361 | (7K) (7J) | 923 | 18.1 |
1362 | (JQ8) (J) | 923 | 18.1 |
1363 | (QA8) (Q) | 923 | 18.1 |
1364 | (AT7) (J) | 922 | 18.1 |
1365 | (A8) (T) (9) | 922 | 18.1 |
1366 | (A) (A) (98) | 922 | 18.1 |
1367 | (TQ) (T) (6) | 921 | 18.1 |
1368 | (AJT) (7) | 920 | 18.1 |
1369 | (Q8) (J6) | 920 | 18.1 |
1370 | (Q) (T8) (9) | 920 | 18.1 |
1371 | (AJT9) | 920 | 18.1 |
1372 | (QK7) (Q) | 920 | 18.1 |
1373 | (9A) (98) | 919 | 18.1 |
1374 | (AT) (76) | 919 | 18.1 |
1375 | (QT7) (Q) | 919 | 18.0 |
1376 | (K) (QT7) | 919 | 18.0 |
1377 | (9A) (9) (K) | 918 | 18.0 |
1378 | (KQ7) (J) | 918 | 18.0 |
1379 | (A6) (Q7) | 918 | 18.0 |
1380 | (K) (K) (T) (8) | 918 | 18.0 |
1381 | (AKQ) (9) | 918 | 18.0 |
1382 | (J7) (J) (K) | 918 | 18.0 |
1383 | (KJ7) (Q) | 915 | 18.0 |
1384 | (KQ7) (K) | 915 | 18.0 |
1385 | (A) (A) (K) (9) | 915 | 18.0 |
1386 | (K9) (K) (7) | 915 | 18.0 |
1387 | (QK8) (Q) | 915 | 18.0 |
1388 | (TJ) (T) (6) | 915 | 18.0 |
1389 | (A) (J) (T6) | 914 | 18.0 |
1390 | (AKJ) (8) | 914 | 18.0 |
1391 | (AK8) (J) | 914 | 18.0 |
1392 | (JA9) (J) | 914 | 18.0 |
1393 | (JA) (J) (6) | 914 | 18.0 |
1394 | (9) (9) (QJ) | 914 | 17.9 |
1395 | (A) (Q) (T) (9) | 914 | 17.9 |
1396 | (J9) (T) (7) | 914 | 17.9 |
1397 | (A7) (T6) | 914 | 17.9 |
1398 | (KQJ9) | 914 | 17.9 |
1399 | (A) (Q) (T6) | 913 | 17.9 |
1400 | (KQ6) (K) | 913 | 17.9 |
1401 | (Q) (J) (T) (7) | 913 | 17.9 |
1402 | (QK6) (Q) | 913 | 17.9 |
1403 | (K7) (Q6) | 913 | 17.9 |
1404 | (AK) (86) | 913 | 17.9 |
1405 | (A) (Q) (J6) | 913 | 17.9 |
1406 | (T8) (T) (K) | 912 | 17.9 |
1407 | (7K) (7T) | 912 | 17.9 |
1408 | (KQT) (7) | 912 | 17.9 |
1409 | (JT) (9) (7) | 912 | 17.9 |
1410 | (KJ) (86) | 912 | 17.9 |
1411 | (KQ7) (T) | 912 | 17.9 |
1412 | (A) (A) (T) (7) | 911 | 17.9 |
1413 | (T7) (T7) | 911 | 17.9 |
1414 | (9T) (9) (K) | 911 | 17.9 |
1415 | (KT6) (J) | 911 | 17.9 |
1416 | (A) (A) (J) (7) | 911 | 17.9 |
1417 | (Q9) (J) (8) | 911 | 17.9 |
1418 | (9J) (9) (Q) | 910 | 17.9 |
1419 | (AK8) (Q) | 910 | 17.9 |
1420 | (J98) (T) | 910 | 17.9 |
1421 | (AJ) (9) (8) | 910 | 17.9 |
1422 | (Q8) (J) (9) | 909 | 17.9 |
1423 | (A7) (J6) | 909 | 17.8 |
1424 | (A) (A) (Q) (8) | 909 | 17.8 |
1425 | (K6) (J7) | 909 | 17.8 |
1426 | (KQT) (6) | 908 | 17.8 |
1427 | (K6) (Q7) | 908 | 17.8 |
1428 | (KT) (9) (7) | 908 | 17.8 |
1429 | (T7) (T) (Q) | 908 | 17.8 |
1430 | (KQ6) (T) | 908 | 17.8 |
1431 | (AT) (9) (7) | 908 | 17.8 |
1432 | (K) (JT6) | 907 | 17.8 |
1433 | (Q7) (Q6) | 907 | 17.8 |
1434 | (T) (T) (Q7) | 907 | 17.8 |
1435 | (KJ6) (K) | 906 | 17.8 |
1436 | (Q) (Q) (J) (9) | 906 | 17.8 |
1437 | (A) (A) (8) (8) | 906 | 17.8 |
1438 | (9K) (9) (Q) | 905 | 17.8 |
1439 | (Q) (J9) (8) | 905 | 17.8 |
1440 | (K7) (J6) | 905 | 17.8 |
1441 | (TK) (T) (6) | 905 | 17.8 |
1442 | (KQJ) (7) | 905 | 17.8 |
1443 | (K) (K) (Q) (9) | 905 | 17.8 |
1444 | (T) (T) (A7) | 905 | 17.8 |
1445 | (KJT) (6) | 905 | 17.8 |
1446 | (AQ8) (K) | 904 | 17.8 |
1447 | (K9) (T) (7) | 904 | 17.8 |
1448 | (6A) (6K) | 904 | 17.8 |
1449 | (J) (T9) (7) | 904 | 17.7 |
1450 | (9) (9) (AQ) | 904 | 17.7 |
1451 | (K6) (T7) | 904 | 17.7 |
1452 | (QJ) (86) | 903 | 17.7 |
1453 | (J) (J) (K6) | 903 | 17.7 |
1454 | (A) (K) (J6) | 903 | 17.7 |
1455 | (AQT) (7) | 903 | 17.7 |
1456 | (K7) (T6) | 902 | 17.7 |
1457 | (K7) (K) (9) | 902 | 17.7 |
1458 | (A) (A) (K) (8) | 902 | 17.7 |
1459 | (A9) (T) (7) | 902 | 17.7 |
1460 | (K9) (J) (8) | 902 | 17.7 |
1461 | (A) (JT7) | 902 | 17.7 |
1462 | (A) (Q) (J) (9) | 902 | 17.7 |
1463 | (Q6) (T7) | 901 | 17.7 |
1464 | (A6) (J7) | 901 | 17.7 |
1465 | (AT7) (Q) | 900 | 17.7 |
1466 | (J7) (T6) | 900 | 17.7 |
1467 | (9J) (98) | 900 | 17.7 |
1468 | (AKQ) (8) | 900 | 17.7 |
1469 | (TQ8) (T) | 899 | 17.7 |
1470 | (A9) (Q) (8) | 899 | 17.7 |
1471 | (K9) (K) (6) | 899 | 17.6 |
1472 | (A8) (K) (9) | 898 | 17.6 |
1473 | (T8) (T) (A) | 898 | 17.6 |
1474 | (8T) (89) | 898 | 17.6 |
1475 | (A) (J) (T) (8) | 898 | 17.6 |
1476 | (J) (T7) (9) | 898 | 17.6 |
1477 | (A7) (T) (9) | 897 | 17.6 |
1478 | (J) (J) (Q) (9) | 897 | 17.6 |
1479 | (J) (J) (T6) | 897 | 17.6 |
1480 | (QJ) (9) (8) | 897 | 17.6 |
1481 | (K6) (K) (6) | 897 | 17.6 |
1482 | (7Q) (7J) | 897 | 17.6 |
1483 | (KJ6) (T) | 897 | 17.6 |
1484 | (QT6) (Q) | 896 | 17.6 |
1485 | (T6) (T) (J) | 896 | 17.6 |
1486 | (K) (T8) (9) | 896 | 17.6 |
1487 | (A) (KQ8) | 896 | 17.6 |
1488 | (J6) (T7) | 896 | 17.6 |
1489 | (JT8) (9) | 896 | 17.6 |
1490 | (Q9) (T) (7) | 896 | 17.6 |
1491 | (QT) (76) | 896 | 17.6 |
1492 | (K) (QJ7) | 896 | 17.6 |
1493 | (AQJ) (7) | 895 | 17.6 |
1494 | (KJ6) (Q) | 895 | 17.6 |
1495 | (K) (K) (A) (9) | 895 | 17.6 |
1496 | (KT) (76) | 894 | 17.6 |
1497 | (Q7) (T) (9) | 894 | 17.6 |
1498 | (9A) (96) | 894 | 17.6 |
1499 | (AJ) (76) | 894 | 17.6 |
1500 | (QT) (9) (7) | 894 | 17.5 |
1501 | (AKT) (7) | 894 | 17.5 |
1502 | (A) (KJ8) | 893 | 17.5 |
1503 | (9A) (97) | 893 | 17.5 |
1504 | (TA) (T) (6) | 893 | 17.5 |
1505 | (9J) (9) (A) | 893 | 17.5 |
1506 | (AQ) (76) | 893 | 17.5 |
1507 | (T) (T) (Q6) | 893 | 17.5 |
1508 | (A6) (T7) | 892 | 17.5 |
1509 | (K) (T9) (8) | 892 | 17.5 |
1510 | (KT6) (Q) | 892 | 17.5 |
1511 | (K) (QJ6) | 892 | 17.5 |
1512 | (J) (T) (97) | 892 | 17.5 |
1513 | (JT9) (8) | 891 | 17.5 |
1514 | (Q6) (J7) | 891 | 17.5 |
1515 | (JT) (76) | 891 | 17.5 |
1516 | (A) (A) (97) | 891 | 17.5 |
1517 | (AQ7) (T) | 891 | 17.5 |
1518 | (T) (T) (A) (K) | 891 | 17.5 |
1519 | (AT7) (K) | 891 | 17.5 |
1520 | (A98) (A) | 890 | 17.5 |
1521 | (A9) (K) (8) | 890 | 17.5 |
1522 | (AQ7) (J) | 890 | 17.5 |
1523 | (JT7) (J) | 890 | 17.5 |
1524 | (K) (QT6) | 889 | 17.5 |
1525 | (AK7) (Q) | 889 | 17.5 |
1526 | (T8) (T7) | 889 | 17.5 |
1527 | (KJ) (9) (8) | 889 | 17.5 |
1528 | (AK) (76) | 889 | 17.5 |
1529 | (AQT9) | 889 | 17.5 |
1530 | (AQ) (9) (8) | 889 | 17.5 |
1531 | (9T) (97) | 889 | 17.5 |
1532 | (T6) (T) (Q) | 889 | 17.5 |
1533 | (8A) (89) | 889 | 17.4 |
1534 | (K6) (K) (9) | 888 | 17.4 |
1535 | (KQ6) (J) | 888 | 17.4 |
1536 | (KQ) (86) | 888 | 17.4 |
1537 | (9T) (9) (A) | 888 | 17.4 |
1538 | (K7) (T) (9) | 888 | 17.4 |
1539 | (9) (9) (KJ) | 887 | 17.4 |
1540 | (Q) (J8) (9) | 887 | 17.4 |
1541 | (QJ7) (Q) | 887 | 17.4 |
1542 | (J) (J) (T) (8) | 887 | 17.4 |
1543 | (9QT) (9) | 887 | 17.4 |
1544 | (JA8) (J) | 887 | 17.4 |
1545 | (K) (K) (J) (8) | 887 | 17.4 |
1546 | (T) (T) (J6) | 887 | 17.4 |
1547 | (K) (K) (9) (9) | 886 | 17.4 |
1548 | (A) (K) (T6) | 886 | 17.4 |
1549 | (J9) (T) (6) | 886 | 17.4 |
1550 | (K) (J) (T) (7) | 886 | 17.4 |
1551 | (QJ6) (Q) | 885 | 17.4 |
1552 | (AT6) (J) | 885 | 17.4 |
1553 | (K9) (Q) (8) | 885 | 17.4 |
1554 | (J8) (J6) | 885 | 17.4 |
1555 | (TJ7) (T) | 885 | 17.4 |
1556 | (9) (9) (AK) | 885 | 17.4 |
1557 | (K) (K) (T) (7) | 885 | 17.4 |
1558 | (Q7) (J6) | 885 | 17.4 |
1559 | (AJ6) (T) | 885 | 17.4 |
1560 | (Q7) (T6) | 884 | 17.4 |
1561 | (A) (A) (Q) (7) | 884 | 17.4 |
1562 | (Q9) (Q) (8) | 884 | 17.4 |
1563 | (K) (Q) (T) (8) | 884 | 17.4 |
1564 | (6A) (6Q) | 884 | 17.4 |
1565 | (A) (KQ7) | 884 | 17.4 |
1566 | (A) (A) (K) (7) | 884 | 17.4 |
1567 | (98) (98) | 883 | 17.3 |
1568 | (AJ7) (Q) | 883 | 17.3 |
1569 | (A8) (Q) (9) | 883 | 17.3 |
1570 | (AJT) (6) | 883 | 17.3 |
1571 | (T7) (T) (K) | 882 | 17.3 |
1572 | (K8) (J) (9) | 882 | 17.3 |
1573 | (AJT8) | 882 | 17.3 |
1574 | (KJT8) | 882 | 17.3 |
1575 | (A) (A) (Q) (6) | 882 | 17.3 |
1576 | (QA7) (Q) | 881 | 17.3 |
1577 | (J7) (J) (A) | 881 | 17.3 |
1578 | (T) (T) (Q) (9) | 880 | 17.3 |
1579 | (9J) (97) | 880 | 17.3 |
1580 | (8J) (8) (T) | 880 | 17.3 |
1581 | (8J) (89) | 880 | 17.3 |
1582 | (A9) (J) (7) | 880 | 17.3 |
1583 | (6K) (6Q) | 880 | 17.3 |
1584 | (8T) (8) (J) | 879 | 17.3 |
1585 | (8) (8) (JT) | 879 | 17.3 |
1586 | (J6) (J) (K) | 879 | 17.3 |
1587 | (T) (T) (J) (8) | 879 | 17.3 |
1588 | (A) (K) (T) (9) | 878 | 17.2 |
1589 | (AQ7) (K) | 878 | 17.2 |
1590 | (AK7) (T) | 877 | 17.2 |
1591 | (J) (T98) | 877 | 17.2 |
1592 | (TA9) (T) | 877 | 17.2 |
1593 | (AKJ) (7) | 877 | 17.2 |
1594 | (A) (A) (K) (6) | 877 | 17.2 |
1595 | (9Q) (9) (K) | 876 | 17.2 |
1596 | (Q) (Q) (T) (8) | 876 | 17.2 |
1597 | (9K) (98) | 876 | 17.2 |
1598 | (KQJ) (6) | 876 | 17.2 |
1599 | (A) (A) (87) | 876 | 17.2 |
1600 | (JT) (9) (6) | 876 | 17.2 |
Table 5: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 1601-2000
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
1601 | (AQJ9) | 876 | 17.2 |
1602 | (QT) (9) (6) | 876 | 17.2 |
1603 | (Q8) (Q) (9) | 876 | 17.2 |
1604 | (9Q) (98) | 876 | 17.2 |
1605 | (Q) (Q) (K) (9) | 875 | 17.2 |
1606 | (9K) (9) (A) | 875 | 17.2 |
1607 | (A) (K) (J) (9) | 875 | 17.2 |
1608 | (K) (K) (A) (8) | 875 | 17.2 |
1609 | (AK7) (J) | 875 | 17.2 |
1610 | (9Q) (9) (A) | 874 | 17.2 |
1611 | (Q) (J) (T) (6) | 874 | 17.2 |
1612 | (9J) (9) (K) | 873 | 17.1 |
1613 | (KQ) (76) | 873 | 17.1 |
1614 | (A) (A) (96) | 873 | 17.1 |
1615 | (A) (QT7) | 873 | 17.1 |
1616 | (AJ) (9) (7) | 873 | 17.1 |
1617 | (A) (KJ7) | 872 | 17.1 |
1618 | (A) (A) (T) (6) | 872 | 17.1 |
1619 | (A) (T8) (9) | 872 | 17.1 |
1620 | (9) (9) (KQ) | 872 | 17.1 |
1621 | (J) (J) (A6) | 872 | 17.1 |
1622 | (Q) (J) (98) | 871 | 17.1 |
1623 | (K9) (J) (7) | 871 | 17.1 |
1624 | (K) (T) (98) | 871 | 17.1 |
1625 | (AK) (9) (8) | 871 | 17.1 |
1626 | (AQT) (6) | 871 | 17.1 |
1627 | (AQ6) (J) | 870 | 17.1 |
1628 | (JK8) (J) | 870 | 17.1 |
1629 | (K8) (Q) (9) | 870 | 17.1 |
1630 | (A) (T9) (8) | 870 | 17.1 |
1631 | (8K) (89) | 870 | 17.1 |
1632 | (KJ) (76) | 870 | 17.1 |
1633 | (J8) (J) (8) | 870 | 17.1 |
1634 | (Q) (T9) (7) | 869 | 17.1 |
1635 | (A97) (A) | 869 | 17.1 |
1636 | (JQ7) (J) | 868 | 17.0 |
1637 | (AT6) (Q) | 868 | 17.0 |
1638 | (T8) (T6) | 868 | 17.0 |
1639 | (T) (T) (A6) | 867 | 17.0 |
1640 | (AJ7) (K) | 867 | 17.0 |
1641 | (T) (T) (K6) | 867 | 17.0 |
1642 | (AJ6) (Q) | 867 | 17.0 |
1643 | (Q6) (T) (9) | 866 | 17.0 |
1644 | (A) (KT7) | 866 | 17.0 |
1645 | (8Q) (8) (T) | 866 | 17.0 |
1646 | (A) (QJ6) | 866 | 17.0 |
1647 | (AKQ) (7) | 866 | 17.0 |
1648 | (J6) (T) (9) | 866 | 17.0 |
1649 | (Q9) (J) (7) | 866 | 17.0 |
1650 | (A7) (J) (9) | 866 | 17.0 |
1651 | (AQJ) (6) | 865 | 17.0 |
1652 | (K7) (J) (9) | 865 | 17.0 |
1653 | (J) (T9) (6) | 865 | 17.0 |
1654 | (KJT7) | 865 | 17.0 |
1655 | (JK7) (J) | 864 | 17.0 |
1656 | (A) (QJ7) | 864 | 17.0 |
1657 | (8A) (8) (T) | 864 | 17.0 |
1658 | (TA8) (T) | 863 | 17.0 |
1659 | (Q) (T7) (9) | 863 | 17.0 |
1660 | (KJ) (9) (7) | 863 | 17.0 |
1661 | (T8) (T) (8) | 863 | 16.9 |
1662 | (K) (Q) (J) (8) | 863 | 16.9 |
1663 | (JQ6) (J) | 863 | 16.9 |
1664 | (AK6) (Q) | 863 | 16.9 |
1665 | (A) (K9) (8) | 863 | 16.9 |
1666 | (QT9) (8) | 863 | 16.9 |
1667 | (J6) (J6) | 863 | 16.9 |
1668 | (Q) (Q) (J) (8) | 863 | 16.9 |
1669 | (QJ) (76) | 862 | 16.9 |
1670 | (A9) (K) (7) | 861 | 16.9 |
1671 | (J) (J) (K) (9) | 861 | 16.9 |
1672 | (6Q) (6T) | 861 | 16.9 |
1673 | (J9) (J) (8) | 860 | 16.9 |
1674 | (6J) (6T) | 860 | 16.9 |
1675 | (K) (K) (T) (6) | 860 | 16.9 |
1676 | (AQ6) (K) | 860 | 16.9 |
1677 | (A) (Q) (T) (8) | 859 | 16.9 |
1678 | (Q9) (T) (6) | 859 | 16.9 |
1679 | (9) (9) (J) (T) | 859 | 16.9 |
1680 | (AT) (8) (7) | 859 | 16.9 |
1681 | (KQT8) | 859 | 16.9 |
1682 | (6A) (6J) | 859 | 16.9 |
1683 | (Q7) (J) (9) | 859 | 16.9 |
1684 | (K8) (K) (6) | 859 | 16.9 |
1685 | (K) (K) (A) (7) | 859 | 16.9 |
1686 | (9KT) (9) | 859 | 16.9 |
1687 | (8) (8) (AT) | 859 | 16.9 |
1688 | (A8) (T) (7) | 858 | 16.9 |
1689 | (J8) (T) (7) | 858 | 16.8 |
1690 | (KQ) (9) (8) | 858 | 16.8 |
1691 | (A9) (T) (6) | 858 | 16.8 |
1692 | (A) (K) (Q) (9) | 858 | 16.8 |
1693 | (A) (J9) (8) | 857 | 16.8 |
1694 | (T) (T) (98) | 857 | 16.8 |
1695 | (K7) (K) (8) | 857 | 16.8 |
1696 | (K) (K) (J) (7) | 857 | 16.8 |
1697 | (QJT6) | 857 | 16.8 |
1698 | (K9) (T) (6) | 857 | 16.8 |
1699 | (JT6) (J) | 857 | 16.8 |
1700 | (8) (8) (KT) | 857 | 16.8 |
1701 | (QA6) (Q) | 857 | 16.8 |
1702 | (QJT7) | 857 | 16.8 |
1703 | (Q98) (T) | 857 | 16.8 |
1704 | (Q) (T) (97) | 857 | 16.8 |
1705 | (K8) (K) (7) | 857 | 16.8 |
1706 | (TK8) (T) | 857 | 16.8 |
1707 | (A8) (97) | 857 | 16.8 |
1708 | (J97) (T) | 857 | 16.8 |
1709 | (AT) (9) (6) | 856 | 16.8 |
1710 | (K) (J8) (9) | 856 | 16.8 |
1711 | (QT8) (9) | 856 | 16.8 |
1712 | (8K) (8) (T) | 856 | 16.8 |
1713 | (A) (A) (86) | 856 | 16.8 |
1714 | (A) (J8) (9) | 856 | 16.8 |
1715 | (AKT) (6) | 856 | 16.8 |
1716 | (A) (K8) (9) | 855 | 16.8 |
1717 | (A) (KT6) | 855 | 16.8 |
1718 | (AQ) (9) (7) | 855 | 16.8 |
1719 | (A) (T) (98) | 855 | 16.8 |
1720 | (8A) (8) (J) | 854 | 16.8 |
1721 | (A) (A) (J) (6) | 854 | 16.8 |
1722 | (9AT) (9) | 854 | 16.8 |
1723 | (6Q) (6J) | 854 | 16.8 |
1724 | (Q) (T9) (6) | 853 | 16.8 |
1725 | (A7) (Q) (9) | 853 | 16.8 |
1726 | (T7) (98) | 853 | 16.8 |
1727 | (K) (K) (98) | 853 | 16.7 |
1728 | (J) (T6) (9) | 853 | 16.7 |
1729 | (Q9) (Q) (7) | 852 | 16.7 |
1730 | (A9) (Q) (7) | 852 | 16.7 |
1731 | (9T) (96) | 851 | 16.7 |
1732 | (K) (Q9) (8) | 851 | 16.7 |
1733 | (6A) (6T) | 851 | 16.7 |
1734 | (6K) (6T) | 851 | 16.7 |
1735 | (K) (Q8) (9) | 851 | 16.7 |
1736 | (T) (T) (9) (9) | 850 | 16.7 |
1737 | (AJ6) (K) | 850 | 16.7 |
1738 | (A6) (T) (9) | 850 | 16.7 |
1739 | (Q) (J9) (7) | 850 | 16.7 |
1740 | (A) (Q) (J) (8) | 850 | 16.7 |
1741 | (J8) (J) (9) | 850 | 16.7 |
1742 | (T8) (T) (9) | 850 | 16.7 |
1743 | (JT) (8) (7) | 850 | 16.7 |
1744 | (AQ6) (T) | 849 | 16.7 |
1745 | (T9) (T) (8) | 849 | 16.7 |
1746 | (AKQ) (6) | 849 | 16.7 |
1747 | (A) (KQ6) | 848 | 16.7 |
1748 | (8Q) (89) | 848 | 16.7 |
1749 | (A96) (A) | 848 | 16.6 |
1750 | (A) (JT6) | 848 | 16.6 |
1751 | (9K) (96) | 847 | 16.6 |
1752 | (QJ) (9) (7) | 847 | 16.6 |
1753 | (K) (Q) (T) (7) | 847 | 16.6 |
1754 | (KT) (9) (6) | 847 | 16.6 |
1755 | (K) (T9) (7) | 847 | 16.6 |
1756 | (K) (J9) (8) | 846 | 16.6 |
1757 | (A9) (Q) (6) | 846 | 16.6 |
1758 | (JA7) (J) | 846 | 16.6 |
1759 | (A9) (J) (6) | 846 | 16.6 |
1760 | (K6) (T) (9) | 846 | 16.6 |
1761 | (KQJ7) | 846 | 16.6 |
1762 | (J) (T) (96) | 846 | 16.6 |
1763 | (A) (QT6) | 846 | 16.6 |
1764 | (J7) (T) (8) | 846 | 16.6 |
1765 | (JT7) (9) | 845 | 16.6 |
1766 | (A7) (T) (8) | 845 | 16.6 |
1767 | (A) (Q9) (8) | 845 | 16.6 |
1768 | (T8) (97) | 845 | 16.6 |
1769 | (A9) (87) | 844 | 16.6 |
1770 | (8) (8) (QT) | 844 | 16.6 |
1771 | (AKT9) | 843 | 16.6 |
1772 | (J) (T7) (8) | 843 | 16.6 |
1773 | (K7) (Q) (9) | 843 | 16.6 |
1774 | (8) (8) (AJ) | 843 | 16.6 |
1775 | (Q7) (Q) (9) | 843 | 16.6 |
1776 | (AKJ) (6) | 843 | 16.5 |
1777 | (9K) (97) | 843 | 16.5 |
1778 | (K9) (Q) (7) | 843 | 16.5 |
1779 | (T) (T) (K) (9) | 842 | 16.5 |
1780 | (K) (K) (Q) (7) | 842 | 16.5 |
1781 | (9Q) (96) | 841 | 16.5 |
1782 | (K) (K) (A) (6) | 841 | 16.5 |
1783 | (K) (K) (Q) (8) | 841 | 16.5 |
1784 | (A) (A) (76) | 841 | 16.5 |
1785 | (A7) (K) (9) | 841 | 16.5 |
1786 | (K9) (J) (6) | 841 | 16.5 |
1787 | (AJ) (9) (6) | 841 | 16.5 |
1788 | (Q) (Q) (T) (7) | 840 | 16.5 |
1789 | (K) (Q) (J) (7) | 840 | 16.5 |
1790 | (9Q) (97) | 840 | 16.5 |
1791 | (AJT7) | 840 | 16.5 |
1792 | (Q9) (J) (6) | 840 | 16.5 |
1793 | (J6) (J) (A) | 840 | 16.5 |
1794 | (TQ6) (T) | 839 | 16.5 |
1795 | (K7) (98) | 839 | 16.5 |
1796 | (Q) (Q) (A) (9) | 839 | 16.5 |
1797 | (K7) (T) (8) | 839 | 16.5 |
1798 | (Q) (Q) (98) | 838 | 16.5 |
1799 | (9QJ) (9) | 838 | 16.5 |
1800 | (T9) (87) | 838 | 16.4 |
1801 | (A) (Q8) (9) | 837 | 16.4 |
1802 | (J) (T8) (7) | 837 | 16.4 |
1803 | (A7) (98) | 836 | 16.4 |
1804 | (6K) (6J) | 836 | 16.4 |
1805 | (KT9) (8) | 836 | 16.4 |
1806 | (Q) (T98) | 836 | 16.4 |
1807 | (K) (J) (98) | 836 | 16.4 |
1808 | (A86) (A) | 836 | 16.4 |
1809 | (J7) (J6) | 836 | 16.4 |
1810 | (AKQ9) | 835 | 16.4 |
1811 | (J) (J) (98) | 835 | 16.4 |
1812 | (Q) (Q) (K) (7) | 835 | 16.4 |
1813 | (8T) (8) (Q) | 835 | 16.4 |
1814 | (AK6) (T) | 835 | 16.4 |
1815 | (K8) (97) | 834 | 16.4 |
1816 | (T7) (T) (A) | 834 | 16.4 |
1817 | (Q7) (Q) (7) | 834 | 16.4 |
1818 | (K) (J) (T) (6) | 833 | 16.4 |
1819 | (A) (J) (98) | 833 | 16.4 |
1820 | (A) (K) (J) (8) | 833 | 16.4 |
1821 | (AT6) (K) | 833 | 16.4 |
1822 | (TQ7) (T) | 833 | 16.4 |
1823 | (K7) (K) (6) | 833 | 16.4 |
1824 | (8A) (8) (Q) | 833 | 16.4 |
1825 | (Q6) (J) (9) | 833 | 16.4 |
1826 | (KT8) (9) | 833 | 16.4 |
1827 | (K98) (T) | 833 | 16.3 |
1828 | (QJ) (9) (6) | 832 | 16.3 |
1829 | (K) (T7) (9) | 832 | 16.3 |
1830 | (Q) (J7) (9) | 832 | 16.3 |
1831 | (QT) (8) (7) | 832 | 16.3 |
1832 | (AK) (9) (7) | 832 | 16.3 |
1833 | (TK7) (T) | 832 | 16.3 |
1834 | (K8) (T) (7) | 832 | 16.3 |
1835 | (9AJ) (9) | 832 | 16.3 |
1836 | (8A) (8) (K) | 832 | 16.3 |
1837 | (T6) (T) (K) | 831 | 16.3 |
1838 | (JT9) (7) | 831 | 16.3 |
1839 | (Q) (T6) (9) | 831 | 16.3 |
1840 | (A87) (A) | 831 | 16.3 |
1841 | (A) (K) (T) (8) | 831 | 16.3 |
1842 | (KT) (8) (7) | 831 | 16.3 |
1843 | (K) (K) (J) (6) | 831 | 16.3 |
1844 | (9J) (96) | 831 | 16.3 |
1845 | (JT98) | 830 | 16.3 |
1846 | (A) (J) (T) (7) | 830 | 16.3 |
1847 | (J) (J) (Q) (8) | 830 | 16.3 |
1848 | (KQ) (9) (7) | 830 | 16.3 |
1849 | (A7) (J) (8) | 830 | 16.3 |
1850 | (A) (A) (7) (7) | 830 | 16.3 |
1851 | (Q98) (J) | 829 | 16.3 |
1852 | (JK6) (J) | 829 | 16.3 |
1853 | (AK6) (J) | 829 | 16.3 |
1854 | (Q) (T) (96) | 829 | 16.3 |
1855 | (TJ6) (T) | 829 | 16.3 |
1856 | (8A) (87) | 829 | 16.3 |
1857 | (AKJ9) | 829 | 16.3 |
1858 | (K) (K) (97) | 829 | 16.3 |
1859 | (K) (K) (Q) (6) | 829 | 16.3 |
1860 | (K) (T) (97) | 828 | 16.3 |
1861 | (K) (J9) (7) | 828 | 16.3 |
1862 | (AJ) (8) (7) | 828 | 16.3 |
1863 | (T6) (T6) | 828 | 16.3 |
1864 | (J) (J) (T) (7) | 827 | 16.2 |
1865 | (Q) (Q) (9) (9) | 827 | 16.2 |
1866 | (QJ8) (9) | 827 | 16.2 |
1867 | (K98) (K) | 827 | 16.2 |
1868 | (Q9) (Q) (6) | 827 | 16.2 |
1869 | (T) (T) (J) (7) | 827 | 16.2 |
1870 | (Q) (Q) (K) (8) | 827 | 16.2 |
1871 | (A) (K) (Q) (8) | 827 | 16.2 |
1872 | (AQT8) | 827 | 16.2 |
1873 | (Q8) (T) (7) | 827 | 16.2 |
1874 | (A7) (K) (8) | 827 | 16.2 |
1875 | (A98) (T) | 826 | 16.2 |
1876 | (K6) (K) (8) | 826 | 16.2 |
1877 | (A9) (K) (6) | 826 | 16.2 |
1878 | (A) (K9) (7) | 825 | 16.2 |
1879 | (A) (K7) (9) | 825 | 16.2 |
1880 | (8) (8) (AQ) | 825 | 16.2 |
1881 | (A8) (Q) (7) | 825 | 16.2 |
1882 | (T) (T) (Q) (8) | 825 | 16.2 |
1883 | (Q6) (Q) (9) | 825 | 16.2 |
1884 | (Q7) (T) (8) | 825 | 16.2 |
1885 | (A8) (J) (7) | 825 | 16.2 |
1886 | (A8) (K) (7) | 825 | 16.2 |
1887 | (QJ9) (8) | 825 | 16.2 |
1888 | (9KJ) (9) | 824 | 16.2 |
1889 | (AQJ8) | 824 | 16.2 |
1890 | (K9) (87) | 824 | 16.2 |
1891 | (T9) (86) | 823 | 16.2 |
1892 | (A9) (86) | 823 | 16.2 |
1893 | (Q) (Q) (A) (8) | 823 | 16.1 |
1894 | (K) (Q) (T) (6) | 822 | 16.1 |
1895 | (A6) (J) (9) | 822 | 16.1 |
1896 | (J9) (87) | 822 | 16.1 |
1897 | (KQJ8) | 822 | 16.1 |
1898 | (Q) (J) (97) | 822 | 16.1 |
1899 | (J9) (J) (7) | 822 | 16.1 |
1900 | (J) (T97) | 821 | 16.1 |
1901 | (KJ) (9) (6) | 821 | 16.1 |
1902 | (J) (T) (9) (8) | 821 | 16.1 |
1903 | (J8) (97) | 821 | 16.1 |
1904 | (AT) (8) (6) | 820 | 16.1 |
1905 | (Q) (J9) (6) | 820 | 16.1 |
1906 | (K6) (J) (9) | 820 | 16.1 |
1907 | (8Q) (8) (J) | 820 | 16.1 |
1908 | (8K) (8) (J) | 820 | 16.1 |
1909 | (A) (KJ6) | 819 | 16.1 |
1910 | (AT9) (8) | 819 | 16.1 |
1911 | (K6) (K) (7) | 819 | 16.1 |
1912 | (8JT) (8) | 819 | 16.1 |
1913 | (A7) (Q) (8) | 819 | 16.1 |
1914 | (Q) (Q) (K) (6) | 819 | 16.1 |
1915 | (97) (97) | 818 | 16.1 |
1916 | (A) (T9) (7) | 818 | 16.1 |
1917 | (AQ) (9) (6) | 818 | 16.1 |
1918 | (K8) (J) (7) | 818 | 16.1 |
1919 | (K9) (Q) (6) | 818 | 16.1 |
1920 | (A6) (Q) (9) | 817 | 16.0 |
1921 | (Q8) (97) | 817 | 16.0 |
1922 | (A8) (96) | 817 | 16.0 |
1923 | (Q) (Q) (T) (6) | 817 | 16.0 |
1924 | (KQT7) | 817 | 16.0 |
1925 | (K) (J7) (9) | 817 | 16.0 |
1926 | (Q98) (Q) | 817 | 16.0 |
1927 | (AT8) (9) | 816 | 16.0 |
1928 | (A) (T7) (9) | 816 | 16.0 |
1929 | (K) (Q) (J) (6) | 816 | 16.0 |
1930 | (J) (T) (87) | 816 | 16.0 |
1931 | (Q7) (98) | 816 | 16.0 |
1932 | (K) (T98) | 815 | 16.0 |
1933 | (Q) (J6) (9) | 815 | 16.0 |
1934 | (K) (Q) (98) | 815 | 16.0 |
1935 | (AQ) (8) (7) | 815 | 16.0 |
1936 | (JT) (8) (6) | 815 | 16.0 |
1937 | (K) (Q9) (7) | 815 | 16.0 |
1938 | (J7) (98) | 815 | 16.0 |
1939 | (J) (J) (A) (9) | 815 | 16.0 |
1940 | (QT7) (9) | 815 | 16.0 |
1941 | (A6) (K) (9) | 815 | 16.0 |
1942 | (A) (T) (97) | 813 | 16.0 |
1943 | (7A) (79) | 813 | 16.0 |
1944 | (8J) (8) (Q) | 812 | 16.0 |
1945 | (J7) (J) (9) | 812 | 15.9 |
1946 | (A) (A) (6) (6) | 812 | 15.9 |
1947 | (7T) (79) | 812 | 15.9 |
1948 | (K) (Q7) (9) | 812 | 15.9 |
1949 | (Q) (Q) (J) (7) | 812 | 15.9 |
1950 | (A) (Q7) (9) | 811 | 15.9 |
1951 | (J) (J) (9) (9) | 811 | 15.9 |
1952 | (Q) (J98) | 810 | 15.9 |
1953 | (A8) (T) (6) | 810 | 15.9 |
1954 | (K) (Q9) (6) | 810 | 15.9 |
1955 | (Q) (T7) (8) | 810 | 15.9 |
1956 | (A) (Q) (98) | 810 | 15.9 |
1957 | (Q97) (T) | 810 | 15.9 |
1958 | (AKQ8) | 809 | 15.9 |
1959 | (8T) (8) (K) | 809 | 15.9 |
1960 | (T8) (96) | 809 | 15.9 |
1961 | (8A) (86) | 809 | 15.9 |
1962 | (Q8) (T) (6) | 808 | 15.9 |
1963 | (AK) (9) (6) | 808 | 15.9 |
1964 | (KQJ6) | 808 | 15.9 |
1965 | (AK) (8) (7) | 807 | 15.9 |
1966 | (A) (Q9) (7) | 807 | 15.8 |
1967 | (KQ) (9) (6) | 806 | 15.8 |
1968 | (QT9) (7) | 806 | 15.8 |
1969 | (8) (8) (KJ) | 806 | 15.8 |
1970 | (T7) (T) (9) | 806 | 15.8 |
1971 | (A6) (98) | 805 | 15.8 |
1972 | (T6) (98) | 805 | 15.8 |
1973 | (T9) (T) (7) | 805 | 15.8 |
1974 | (QT) (8) (6) | 805 | 15.8 |
1975 | (K6) (Q) (9) | 805 | 15.8 |
1976 | (Q) (T97) | 805 | 15.8 |
1977 | (Q8) (Q) (7) | 805 | 15.8 |
1978 | (TA7) (T) | 805 | 15.8 |
1979 | (8) (8) (QJ) | 804 | 15.8 |
1980 | (K7) (J) (8) | 804 | 15.8 |
1981 | (K) (K) (96) | 804 | 15.8 |
1982 | (K97) (K) | 804 | 15.8 |
1983 | (TK6) (T) | 804 | 15.8 |
1984 | (T7) (T6) | 804 | 15.8 |
1985 | (8K) (8) (A) | 803 | 15.8 |
1986 | (A76) (A) | 803 | 15.8 |
1987 | (Q8) (J) (7) | 803 | 15.8 |
1988 | (Q7) (J) (8) | 803 | 15.8 |
1989 | (T6) (T) (A) | 803 | 15.8 |
1990 | (KJ) (8) (7) | 802 | 15.8 |
1991 | (A6) (T) (8) | 802 | 15.8 |
1992 | (Q) (Q) (J) (6) | 802 | 15.8 |
1993 | (A8) (J) (6) | 802 | 15.8 |
1994 | (JT9) (6) | 802 | 15.7 |
1995 | (AKT8) | 802 | 15.7 |
1996 | (A) (Q) (J) (7) | 802 | 15.7 |
1997 | (J6) (T) (8) | 801 | 15.7 |
1998 | (K96) (K) | 801 | 15.7 |
1999 | (A) (J9) (7) | 801 | 15.7 |
2000 | (Q6) (98) | 801 | 15.7 |
Table 6: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 2001-2400
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
2001 | (9) (9) (Q) (T) | 801 | 15.7 |
2002 | (J7) (J) (7) | 801 | 15.7 |
2003 | (AJ) (8) (6) | 801 | 15.7 |
2004 | (KJ9) (8) | 801 | 15.7 |
2005 | (T98) (T) | 801 | 15.7 |
2006 | (8K) (8) (Q) | 800 | 15.7 |
2007 | (J8) (T) (6) | 800 | 15.7 |
2008 | (A98) (J) | 800 | 15.7 |
2009 | (A) (A) (9) (8) | 800 | 15.7 |
2010 | (Q) (Q) (97) | 800 | 15.7 |
2011 | (J6) (98) | 800 | 15.7 |
2012 | (A) (K8) (7) | 799 | 15.7 |
2013 | (8) (8) (AK) | 799 | 15.7 |
2014 | (Q) (J) (96) | 799 | 15.7 |
2015 | (A) (J7) (9) | 799 | 15.7 |
2016 | (KT7) (9) | 799 | 15.7 |
2017 | (QJ) (8) (7) | 799 | 15.7 |
2018 | (AJ8) (9) | 798 | 15.7 |
2019 | (Q6) (Q) (6) | 798 | 15.7 |
2020 | (AQT7) | 798 | 15.7 |
2021 | (A) (K9) (6) | 798 | 15.7 |
2022 | (Q) (T8) (7) | 798 | 15.7 |
2023 | (KQT6) | 798 | 15.7 |
2024 | (K) (T) (96) | 798 | 15.7 |
2025 | (AKJ8) | 798 | 15.7 |
2026 | (K8) (T) (6) | 797 | 15.7 |
2027 | (A) (K) (T) (7) | 797 | 15.7 |
2028 | (A) (K) (98) | 797 | 15.6 |
2029 | (9AQ) (9) | 797 | 15.6 |
2030 | (J) (T8) (6) | 797 | 15.6 |
2031 | (K) (K) (87) | 797 | 15.6 |
2032 | (A) (K) (Q) (7) | 796 | 15.6 |
2033 | (J) (T6) (8) | 796 | 15.6 |
2034 | (J) (T96) | 796 | 15.6 |
2035 | (7K) (79) | 796 | 15.6 |
2036 | (Q9) (87) | 795 | 15.6 |
2037 | (JT6) (9) | 795 | 15.6 |
2038 | (A) (K) (J) (7) | 795 | 15.6 |
2039 | (K) (J) (97) | 795 | 15.6 |
2040 | (A8) (K) (6) | 795 | 15.6 |
2041 | (KJT6) | 795 | 15.6 |
2042 | (K6) (98) | 794 | 15.6 |
2043 | (K) (J9) (6) | 794 | 15.6 |
2044 | (J96) (T) | 794 | 15.6 |
2045 | (K8) (96) | 793 | 15.6 |
2046 | (K98) (J) | 793 | 15.6 |
2047 | (K8) (Q) (7) | 793 | 15.6 |
2048 | (AQ9) (8) | 792 | 15.6 |
2049 | (Q7) (Q) (8) | 792 | 15.6 |
2050 | (K9) (86) | 792 | 15.5 |
2051 | (KT) (8) (6) | 792 | 15.5 |
2052 | (K) (T6) (9) | 791 | 15.5 |
2053 | (Q) (T) (87) | 791 | 15.5 |
2054 | (AJ9) (8) | 791 | 15.5 |
2055 | (AQ) (8) (6) | 791 | 15.5 |
2056 | (A) (J) (97) | 791 | 15.5 |
2057 | (A) (Q) (T) (7) | 791 | 15.5 |
2058 | (K) (T9) (6) | 790 | 15.5 |
2059 | (A8) (Q) (6) | 790 | 15.5 |
2060 | (Q) (Q) (96) | 790 | 15.5 |
2061 | (A) (J) (T) (6) | 790 | 15.5 |
2062 | (A98) (Q) | 789 | 15.5 |
2063 | (Q) (J7) (8) | 789 | 15.5 |
2064 | (A) (Q9) (6) | 789 | 15.5 |
2065 | (T) (T) (97) | 789 | 15.5 |
2066 | (K) (Q6) (9) | 789 | 15.5 |
2067 | (J) (J) (T) (6) | 788 | 15.5 |
2068 | (8J) (8) (A) | 788 | 15.5 |
2069 | (K6) (T) (8) | 788 | 15.5 |
2070 | (KQ) (8) (7) | 788 | 15.5 |
2071 | (J9) (86) | 787 | 15.5 |
2072 | (Q9) (86) | 787 | 15.5 |
2073 | (Q) (J8) (7) | 787 | 15.5 |
2074 | (A) (K7) (8) | 787 | 15.5 |
2075 | (A) (K) (Q) (6) | 787 | 15.5 |
2076 | (96) (96) | 787 | 15.4 |
2077 | (K7) (Q) (8) | 787 | 15.4 |
2078 | (K) (T8) (7) | 787 | 15.4 |
2079 | (8T) (87) | 786 | 15.4 |
2080 | (A6) (Q) (8) | 786 | 15.4 |
2081 | (J) (J) (Q) (6) | 786 | 15.4 |
2082 | (AT7) (9) | 786 | 15.4 |
2083 | (KJ8) (9) | 786 | 15.4 |
2084 | (8T) (8) (A) | 786 | 15.4 |
2085 | (K97) (T) | 786 | 15.4 |
2086 | (J98) (J) | 786 | 15.4 |
2087 | (JA6) (J) | 785 | 15.4 |
2088 | (T) (T) (A) (9) | 785 | 15.4 |
2089 | (A9) (76) | 785 | 15.4 |
2090 | (JT8) (7) | 785 | 15.4 |
2091 | (K98) (Q) | 785 | 15.4 |
2092 | (J) (J) (97) | 785 | 15.4 |
2093 | (Q) (T) (9) (8) | 784 | 15.4 |
2094 | (A6) (J) (8) | 783 | 15.4 |
2095 | (7) (7) (AT) | 783 | 15.4 |
2096 | (A) (Q) (J) (6) | 783 | 15.4 |
2097 | (7J) (7) (T) | 783 | 15.4 |
2098 | (Q8) (J) (6) | 783 | 15.4 |
2099 | (9AK) (9) | 783 | 15.4 |
2100 | (Q) (T8) (6) | 783 | 15.4 |
2101 | (J8) (96) | 783 | 15.4 |
2102 | (Q6) (T) (8) | 783 | 15.4 |
2103 | (Q96) (T) | 782 | 15.4 |
2104 | (8K) (87) | 782 | 15.4 |
2105 | (A) (T98) | 782 | 15.4 |
2106 | (Q8) (Q) (6) | 782 | 15.4 |
2107 | (QJ7) (9) | 782 | 15.3 |
2108 | (8Q) (8) (A) | 782 | 15.3 |
2109 | (JT7) (8) | 782 | 15.3 |
2110 | (K) (T7) (8) | 781 | 15.3 |
2111 | (A) (K6) (9) | 781 | 15.3 |
2112 | (J9) (J) (6) | 781 | 15.3 |
2113 | (QJ) (8) (6) | 781 | 15.3 |
2114 | (Q97) (Q) | 781 | 15.3 |
2115 | (J) (T) (86) | 781 | 15.3 |
2116 | (Q) (T6) (8) | 781 | 15.3 |
2117 | (KT9) (7) | 780 | 15.3 |
2118 | (A6) (K) (8) | 780 | 15.3 |
2119 | (QJ9) (7) | 780 | 15.3 |
2120 | (8QT) (8) | 780 | 15.3 |
2121 | (A) (Q) (T) (6) | 780 | 15.3 |
2122 | (A) (A) (9) (7) | 780 | 15.3 |
2123 | (J) (J) (K) (8) | 780 | 15.3 |
2124 | (7J) (79) | 780 | 15.3 |
2125 | (A) (T8) (7) | 779 | 15.3 |
2126 | (K) (Q) (97) | 779 | 15.3 |
2127 | (AT) (7) (6) | 779 | 15.3 |
2128 | (A97) (T) | 779 | 15.3 |
2129 | (K) (K) (8) (8) | 779 | 15.3 |
2130 | (9) (9) (K) (T) | 779 | 15.3 |
2131 | (Q8) (96) | 779 | 15.3 |
2132 | (8J) (87) | 778 | 15.3 |
2133 | (AQ8) (9) | 778 | 15.3 |
2134 | (J) (J) (Q) (7) | 778 | 15.3 |
2135 | (K) (J98) | 778 | 15.3 |
2136 | (K) (J6) (9) | 777 | 15.3 |
2137 | (J) (J) (A) (8) | 777 | 15.2 |
2138 | (KJ) (8) (6) | 776 | 15.2 |
2139 | (A7) (96) | 776 | 15.2 |
2140 | (AT9) (7) | 776 | 15.2 |
2141 | (9KQ) (9) | 776 | 15.2 |
2142 | (A98) (K) | 776 | 15.2 |
2143 | (J6) (J) (9) | 776 | 15.2 |
2144 | (QT6) (9) | 776 | 15.2 |
2145 | (7T) (7) (J) | 776 | 15.2 |
2146 | (7Q) (79) | 775 | 15.2 |
2147 | (AK9) (8) | 775 | 15.2 |
2148 | (7) (7) (KT) | 775 | 15.2 |
2149 | (K) (T) (87) | 775 | 15.2 |
2150 | (T) (T) (J) (6) | 775 | 15.2 |
2151 | (K8) (Q) (6) | 775 | 15.2 |
2152 | (8J) (8) (K) | 774 | 15.2 |
2153 | (7K) (7) (T) | 774 | 15.2 |
2154 | (Q6) (J) (8) | 774 | 15.2 |
2155 | (T9) (T) (6) | 774 | 15.2 |
2156 | (J87) (T) | 774 | 15.2 |
2157 | (Q97) (J) | 773 | 15.2 |
2158 | (K) (Q8) (7) | 773 | 15.2 |
2159 | (K) (Q7) (8) | 773 | 15.2 |
2160 | (AKQ7) | 773 | 15.2 |
2161 | (AJT6) | 773 | 15.2 |
2162 | (Q) (J97) | 772 | 15.2 |
2163 | (A) (T9) (6) | 772 | 15.2 |
2164 | (K) (J8) (7) | 772 | 15.2 |
2165 | (AK) (8) (6) | 772 | 15.2 |
2166 | (Q) (Q) (A) (7) | 772 | 15.2 |
2167 | (9) (9) (T8) | 772 | 15.2 |
2168 | (T) (T) (Q) (7) | 772 | 15.2 |
2169 | (KJ9) (7) | 772 | 15.1 |
2170 | (K) (T97) | 772 | 15.1 |
2171 | (8) (8) (KQ) | 772 | 15.1 |
2172 | (7A) (78) | 771 | 15.1 |
2173 | (A) (Q8) (7) | 771 | 15.1 |
2174 | (K8) (J) (6) | 771 | 15.1 |
2175 | (7Q) (7) (T) | 770 | 15.1 |
2176 | (A) (J9) (6) | 770 | 15.1 |
2177 | (JT) (J) (J) | 770 | 15.1 |
2178 | (7A) (7) (T) | 770 | 15.1 |
2179 | (8Q) (8) (K) | 770 | 15.1 |
2180 | (J) (T) (9) (7) | 770 | 15.1 |
2181 | (T) (T) (K) (8) | 770 | 15.1 |
2182 | (A) (J98) | 769 | 15.1 |
2183 | (9T) (9) (8) | 769 | 15.1 |
2184 | (A) (T6) (9) | 769 | 15.1 |
2185 | (TJ) (T) (T) | 769 | 15.1 |
2186 | (Q) (J6) (8) | 768 | 15.1 |
2187 | (K97) (J) | 768 | 15.1 |
2188 | (T7) (96) | 768 | 15.1 |
2189 | (7) (7) (JT) | 768 | 15.1 |
2190 | (Q6) (Q) (8) | 768 | 15.1 |
2191 | (9) (9) (Q) (J) | 768 | 15.1 |
2192 | (A) (T7) (8) | 767 | 15.1 |
2193 | (AQJ7) | 767 | 15.1 |
2194 | (K6) (J) (8) | 767 | 15.1 |
2195 | (K7) (T) (6) | 767 | 15.1 |
2196 | (AJ) (A) (A) | 767 | 15.1 |
2197 | (QT9) (6) | 767 | 15.1 |
2198 | (KT) (7) (6) | 766 | 15.0 |
2199 | (TA6) (T) | 766 | 15.0 |
2200 | (A) (K) (97) | 766 | 15.0 |
2201 | (A6) (97) | 766 | 15.0 |
2202 | (A) (K98) | 766 | 15.0 |
2203 | (7A) (7) (J) | 765 | 15.0 |
2204 | (9A) (9) (8) | 765 | 15.0 |
2205 | (98) (97) | 765 | 15.0 |
2206 | (A7) (K) (6) | 765 | 15.0 |
2207 | (KQ8) (9) | 765 | 15.0 |
2208 | (T6) (T) (9) | 765 | 15.0 |
2209 | (98) (9) (T) | 765 | 15.0 |
2210 | (AJ9) (7) | 764 | 15.0 |
2211 | (AK) (7) (6) | 764 | 15.0 |
2212 | (A) (K8) (6) | 764 | 15.0 |
2213 | (AQT6) | 764 | 15.0 |
2214 | (T7) (T) (7) | 764 | 15.0 |
2215 | (A7) (T) (6) | 764 | 15.0 |
2216 | (AK8) (9) | 764 | 15.0 |
2217 | (KQ9) (8) | 763 | 15.0 |
2218 | (J) (T87) | 763 | 15.0 |
2219 | (K) (J) (96) | 763 | 15.0 |
2220 | (7K) (7) (J) | 763 | 15.0 |
2221 | (A) (Q) (97) | 763 | 15.0 |
2222 | (T9) (76) | 763 | 15.0 |
2223 | (Q) (Q) (A) (6) | 763 | 15.0 |
2224 | (QT8) (7) | 763 | 15.0 |
2225 | (87) (87) | 762 | 15.0 |
2226 | (K6) (97) | 762 | 15.0 |
2227 | (A) (T) (96) | 762 | 15.0 |
2228 | (A) (J6) (9) | 762 | 15.0 |
2229 | (K) (J7) (8) | 762 | 15.0 |
2230 | (KT6) (9) | 762 | 15.0 |
2231 | (AT) (A) (A) | 761 | 14.9 |
2232 | (KQ) (8) (6) | 761 | 14.9 |
2233 | (J8) (J) (7) | 761 | 14.9 |
2234 | (A) (T) (87) | 761 | 14.9 |
2235 | (AKJ7) | 761 | 14.9 |
2236 | (8Q) (87) | 761 | 14.9 |
2237 | (QT98) | 761 | 14.9 |
2238 | (A) (Q6) (9) | 761 | 14.9 |
2239 | (Q) (T96) | 761 | 14.9 |
2240 | (A8) (76) | 761 | 14.9 |
2241 | (Q) (J8) (6) | 760 | 14.9 |
2242 | (Q) (J) (87) | 760 | 14.9 |
2243 | (A) (Q7) (8) | 760 | 14.9 |
2244 | (A) (J7) (8) | 760 | 14.9 |
2245 | (J) (J) (K) (7) | 760 | 14.9 |
2246 | (7A) (7) (K) | 760 | 14.9 |
2247 | (Q) (Q) (87) | 760 | 14.9 |
2248 | (K9) (76) | 760 | 14.9 |
2249 | (7) (7) (QT) | 760 | 14.9 |
2250 | (AJ) (7) (6) | 759 | 14.9 |
2251 | (A6) (K) (7) | 759 | 14.9 |
2252 | (8K) (86) | 759 | 14.9 |
2253 | (KJ7) (9) | 758 | 14.9 |
2254 | (8AT) (8) | 758 | 14.9 |
2255 | (A97) (J) | 758 | 14.9 |
2256 | (K7) (96) | 758 | 14.9 |
2257 | (K87) (K) | 758 | 14.9 |
2258 | (J7) (96) | 758 | 14.9 |
2259 | (J7) (J) (8) | 758 | 14.9 |
2260 | (AJ7) (9) | 758 | 14.9 |
2261 | (7A) (7) (Q) | 757 | 14.9 |
2262 | (K) (K) (86) | 757 | 14.9 |
2263 | (9) (9) (A8) | 757 | 14.9 |
2264 | (7) (7) (AJ) | 757 | 14.9 |
2265 | (KT9) (6) | 757 | 14.9 |
2266 | (A6) (T) (7) | 757 | 14.9 |
2267 | (Q) (T) (86) | 757 | 14.9 |
2268 | (QJ6) (9) | 757 | 14.9 |
2269 | (K) (Q98) | 756 | 14.9 |
2270 | (9) (9) (A) (T) | 756 | 14.8 |
2271 | (K) (Q) (96) | 756 | 14.8 |
2272 | (T97) (T) | 756 | 14.8 |
2273 | (Q96) (J) | 756 | 14.8 |
2274 | (K96) (T) | 756 | 14.8 |
2275 | (A) (J) (96) | 756 | 14.8 |
2276 | (Q7) (T) (6) | 755 | 14.8 |
2277 | (K) (J97) | 755 | 14.8 |
2278 | (A) (Q98) | 755 | 14.8 |
2279 | (T6) (97) | 755 | 14.8 |
2280 | (QJ9) (6) | 755 | 14.8 |
2281 | (QT) (7) (6) | 755 | 14.8 |
2282 | (A) (K) (J) (6) | 755 | 14.8 |
2283 | (T) (T) (96) | 754 | 14.8 |
2284 | (A) (J8) (7) | 754 | 14.8 |
2285 | (A) (A) (9) (6) | 754 | 14.8 |
2286 | (JT97) | 754 | 14.8 |
2287 | (A) (K6) (8) | 754 | 14.8 |
2288 | (A7) (86) | 753 | 14.8 |
2289 | (A97) (Q) | 753 | 14.8 |
2290 | (K6) (Q) (8) | 753 | 14.8 |
2291 | (A6) (87) | 753 | 14.8 |
2292 | (K) (Q97) | 752 | 14.8 |
2293 | (AQ) (7) (6) | 752 | 14.8 |
2294 | (K) (K) (9) (8) | 752 | 14.8 |
2295 | (A) (T97) | 752 | 14.8 |
2296 | (7T) (78) | 752 | 14.8 |
2297 | (J97) (J) | 752 | 14.8 |
2298 | (AKJ6) | 752 | 14.8 |
2299 | (K) (Q8) (6) | 752 | 14.8 |
2300 | (J7) (T) (6) | 751 | 14.8 |
2301 | (7) (7) (AK) | 751 | 14.7 |
2302 | (J6) (97) | 751 | 14.7 |
2303 | (8A) (8) (9) | 751 | 14.7 |
2304 | (A) (K) (T) (6) | 751 | 14.7 |
2305 | (K6) (T) (7) | 750 | 14.7 |
2306 | (A6) (Q) (7) | 750 | 14.7 |
2307 | (9J) (9) (8) | 750 | 14.7 |
2308 | (A7) (J) (6) | 750 | 14.7 |
2309 | (8KT) (8) | 750 | 14.7 |
2310 | (89) (87) | 750 | 14.7 |
2311 | (A) (A) (8) (7) | 750 | 14.7 |
2312 | (7K) (78) | 749 | 14.7 |
2313 | (8T) (8) (9) | 749 | 14.7 |
2314 | (KJ6) (9) | 749 | 14.7 |
2315 | (JT) (7) (6) | 748 | 14.7 |
2316 | (A6) (J) (7) | 748 | 14.7 |
2317 | (7Q) (7) (J) | 748 | 14.7 |
2318 | (AQJ6) | 748 | 14.7 |
2319 | (T7) (T) (8) | 748 | 14.7 |
2320 | (8T) (86) | 747 | 14.7 |
2321 | (K) (T8) (6) | 747 | 14.7 |
2322 | (A7) (Q) (6) | 747 | 14.7 |
2323 | (J) (J) (96) | 747 | 14.7 |
2324 | (Q7) (96) | 747 | 14.7 |
2325 | (AT9) (6) | 746 | 14.7 |
2326 | (K7) (J) (6) | 746 | 14.7 |
2327 | (K) (K) (7) (7) | 746 | 14.7 |
2328 | (Q6) (97) | 746 | 14.6 |
2329 | (A) (Q8) (6) | 746 | 14.6 |
2330 | (8J) (86) | 746 | 14.6 |
2331 | (98) (9) (8) | 745 | 14.6 |
2332 | (J6) (T) (7) | 745 | 14.6 |
2333 | (7Q) (78) | 745 | 14.6 |
2334 | (QT7) (8) | 745 | 14.6 |
2335 | (J9) (76) | 745 | 14.6 |
2336 | (K86) (K) | 744 | 14.6 |
2337 | (Q) (J96) | 744 | 14.6 |
2338 | (97) (9) (T) | 744 | 14.6 |
2339 | (KJ9) (6) | 744 | 14.6 |
2340 | (J) (T6) (7) | 744 | 14.6 |
2341 | (8) (8) (A9) | 744 | 14.6 |
2342 | (T) (T) (Q) (6) | 743 | 14.6 |
2343 | (9A) (9) (7) | 743 | 14.6 |
2344 | (6A) (69) | 743 | 14.6 |
2345 | (7T) (7) (Q) | 743 | 14.6 |
2346 | (KQ9) (7) | 743 | 14.6 |
2347 | (9K) (9) (8) | 743 | 14.6 |
2348 | (K) (T96) | 743 | 14.6 |
2349 | (KT7) (8) | 742 | 14.6 |
2350 | (9T) (9) (7) | 742 | 14.6 |
2351 | (7) (7) (KJ) | 742 | 14.6 |
2352 | (8Q) (86) | 742 | 14.6 |
2353 | (AK7) (9) | 742 | 14.6 |
2354 | (98) (96) | 742 | 14.6 |
2355 | (7K) (7) (Q) | 742 | 14.6 |
2356 | (Q6) (T) (7) | 742 | 14.6 |
2357 | (K) (J) (87) | 742 | 14.6 |
2358 | (K) (K) (76) | 741 | 14.6 |
2359 | (AKT6) | 741 | 14.6 |
2360 | (K7) (Q) (6) | 741 | 14.6 |
2361 | (AQ) (A) (A) | 741 | 14.5 |
2362 | (J) (J) (87) | 741 | 14.5 |
2363 | (8AJ) (8) | 741 | 14.5 |
2364 | (7A) (76) | 741 | 14.5 |
2365 | (JT6) (8) | 741 | 14.5 |
2366 | (K) (T) (9) (8) | 741 | 14.5 |
2367 | (J) (T86) | 741 | 14.5 |
2368 | (9) (9) (T7) | 741 | 14.5 |
2369 | (T8) (T) (7) | 740 | 14.5 |
2370 | (Q96) (Q) | 740 | 14.5 |
2371 | (7K) (7) (A) | 740 | 14.5 |
2372 | (A97) (K) | 740 | 14.5 |
2373 | (A) (K6) (7) | 740 | 14.5 |
2374 | (A87) (T) | 740 | 14.5 |
2375 | (K96) (J) | 739 | 14.5 |
2376 | (K6) (J) (7) | 739 | 14.5 |
2377 | (K6) (Q) (7) | 739 | 14.5 |
2378 | (QT) (Q) (Q) | 739 | 14.5 |
2379 | (K) (T6) (8) | 739 | 14.5 |
2380 | (KQ) (K) (K) | 739 | 14.5 |
2381 | (A) (J) (87) | 738 | 14.5 |
2382 | (KJ) (K) (K) | 738 | 14.5 |
2383 | (AT6) (9) | 738 | 14.5 |
2384 | (KQ) (7) (6) | 738 | 14.5 |
2385 | (A96) (T) | 738 | 14.5 |
2386 | (A) (A) (8) (6) | 738 | 14.5 |
2387 | (7J) (78) | 737 | 14.5 |
2388 | (J) (J) (A) (7) | 737 | 14.5 |
2389 | (QJ) (Q) (Q) | 737 | 14.5 |
2390 | (7) (7) (AQ) | 737 | 14.5 |
2391 | (AKT7) | 737 | 14.5 |
2392 | (Q7) (J) (6) | 736 | 14.5 |
2393 | (QT8) (6) | 736 | 14.5 |
2394 | (6T) (69) | 736 | 14.5 |
2395 | (Q) (J) (86) | 736 | 14.4 |
2396 | (K97) (Q) | 736 | 14.4 |
2397 | (KQ7) (9) | 736 | 14.4 |
2398 | (Q) (J) (9) (8) | 735 | 14.4 |
2399 | (A) (K7) (6) | 735 | 14.4 |
2400 | (QJ98) | 735 | 14.4 |
Table 7: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 2401-2800
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
2401 | (A) (Q) (96) | 735 | 14.4 |
2402 | (Q87) (T) | 735 | 14.4 |
2403 | (9Q) (9) (8) | 735 | 14.4 |
2404 | (AJ6) (9) | 735 | 14.4 |
2405 | (T) (T) (K) (7) | 735 | 14.4 |
2406 | (KT98) | 734 | 14.4 |
2407 | (KT) (K) (K) | 734 | 14.4 |
2408 | (9) (9) (J8) | 734 | 14.4 |
2409 | (K87) (T) | 734 | 14.4 |
2410 | (JT8) (6) | 734 | 14.4 |
2411 | (J) (T7) (6) | 733 | 14.4 |
2412 | (AK) (A) (A) | 733 | 14.4 |
2413 | (Q) (T87) | 733 | 14.4 |
2414 | (A) (J8) (6) | 733 | 14.4 |
2415 | (QK) (Q) (Q) | 733 | 14.4 |
2416 | (JQ) (J) (J) | 733 | 14.4 |
2417 | (KT8) (7) | 733 | 14.4 |
2418 | (Q87) (J) | 733 | 14.4 |
2419 | (J86) (T) | 732 | 14.4 |
2420 | (AQ7) (9) | 732 | 14.4 |
2421 | (Q) (T) (9) (7) | 732 | 14.4 |
2422 | (QT97) | 732 | 14.4 |
2423 | (Q7) (Q) (6) | 732 | 14.4 |
2424 | (A) (J6) (8) | 732 | 14.4 |
2425 | (7J) (7) (Q) | 731 | 14.4 |
2426 | (AT7) (8) | 731 | 14.4 |
2427 | (A) (Q97) | 731 | 14.4 |
2428 | (K) (Q6) (8) | 731 | 14.4 |
2429 | (J) (J) (K) (6) | 731 | 14.4 |
2430 | (K) (T) (86) | 731 | 14.3 |
2431 | (7T) (7) (K) | 730 | 14.3 |
2432 | (AT8) (7) | 730 | 14.3 |
2433 | (A) (Q6) (8) | 730 | 14.3 |
2434 | (8) (8) (T9) | 730 | 14.3 |
2435 | (89) (8) (T) | 730 | 14.3 |
2436 | (Q6) (Q) (7) | 730 | 14.3 |
2437 | (Q) (Q) (86) | 730 | 14.3 |
2438 | (Q6) (J) (7) | 730 | 14.3 |
2439 | (T) (T) (A) (8) | 730 | 14.3 |
2440 | (A) (T8) (6) | 729 | 14.3 |
2441 | (K) (Q) (87) | 729 | 14.3 |
2442 | (QJ) (7) (6) | 729 | 14.3 |
2443 | (AKQ6) | 729 | 14.3 |
2444 | (KJ) (7) (6) | 728 | 14.3 |
2445 | (A) (J97) | 728 | 14.3 |
2446 | (Q) (Q) (8) (8) | 728 | 14.3 |
2447 | (AQ9) (7) | 728 | 14.3 |
2448 | (8) (8) (J) (T) | 728 | 14.3 |
2449 | (K) (Q7) (6) | 728 | 14.3 |
2450 | (A) (T6) (8) | 728 | 14.3 |
2451 | (A) (K) (96) | 728 | 14.3 |
2452 | (J8) (J) (6) | 727 | 14.3 |
2453 | (A) (Q) (87) | 727 | 14.3 |
2454 | (AJ9) (6) | 727 | 14.3 |
2455 | (K) (J8) (6) | 726 | 14.3 |
2456 | (9) (9) (A) (J) | 726 | 14.3 |
2457 | (6K) (69) | 726 | 14.3 |
2458 | (A) (K) (87) | 726 | 14.3 |
2459 | (KA) (K) (K) | 726 | 14.2 |
2460 | (7) (7) (QJ) | 726 | 14.2 |
2461 | (8QJ) (8) | 725 | 14.2 |
2462 | (98) (9) (J) | 725 | 14.2 |
2463 | (JT96) | 725 | 14.2 |
2464 | (9A) (9) (6) | 725 | 14.2 |
2465 | (8J) (8) (9) | 724 | 14.2 |
2466 | (Q9) (76) | 724 | 14.2 |
2467 | (J) (T) (76) | 724 | 14.2 |
2468 | (9J) (9) (7) | 724 | 14.2 |
2469 | (7) (7) (KQ) | 724 | 14.2 |
2470 | (86) (86) | 723 | 14.2 |
2471 | (Q) (T7) (6) | 723 | 14.2 |
2472 | (9T) (9) (6) | 723 | 14.2 |
2473 | (T9) (8) (7) | 723 | 14.2 |
2474 | (Q) (J7) (6) | 723 | 14.2 |
2475 | (QJ7) (8) | 723 | 14.2 |
2476 | (7J) (7) (K) | 722 | 14.2 |
2477 | (A) (K97) | 722 | 14.2 |
2478 | (AJ7) (8) | 721 | 14.2 |
2479 | (J) (T) (9) (6) | 721 | 14.2 |
2480 | (9) (9) (K8) | 721 | 14.2 |
2481 | (AT98) | 721 | 14.2 |
2482 | (T) (T) (87) | 721 | 14.2 |
2483 | (AK9) (7) | 721 | 14.2 |
2484 | (J) (J) (8) (8) | 721 | 14.2 |
2485 | (8AQ) (8) | 720 | 14.1 |
2486 | (A) (T) (9) (8) | 720 | 14.1 |
2487 | (J6) (J) (8) | 720 | 14.1 |
2488 | (QJ8) (7) | 719 | 14.1 |
2489 | (6A) (68) | 719 | 14.1 |
2490 | (Q87) (Q) | 719 | 14.1 |
2491 | (Q86) (T) | 718 | 14.1 |
2492 | (A) (A) (7) (6) | 718 | 14.1 |
2493 | (9) (9) (A7) | 718 | 14.1 |
2494 | (K) (Q96) | 717 | 14.1 |
2495 | (6Q) (69) | 717 | 14.1 |
2496 | (AQ9) (6) | 717 | 14.1 |
2497 | (79) (78) | 717 | 14.1 |
2498 | (K87) (J) | 717 | 14.1 |
2499 | (QT6) (8) | 717 | 14.1 |
2500 | (A87) (J) | 717 | 14.1 |
2501 | (7Q) (7) (K) | 716 | 14.1 |
2502 | (Q) (T6) (7) | 716 | 14.1 |
2503 | (K) (Q6) (7) | 716 | 14.1 |
2504 | (K8) (76) | 716 | 14.1 |
2505 | (T7) (86) | 716 | 14.1 |
2506 | (KQ9) (6) | 716 | 14.1 |
2507 | (A96) (K) | 716 | 14.1 |
2508 | (9) (9) (Q8) | 716 | 14.1 |
2509 | (K) (J6) (8) | 716 | 14.0 |
2510 | (Q7) (86) | 715 | 14.0 |
2511 | (A96) (Q) | 715 | 14.0 |
2512 | (K) (J96) | 715 | 14.0 |
2513 | (Q) (J87) | 715 | 14.0 |
2514 | (A) (T) (86) | 715 | 14.0 |
2515 | (T8) (76) | 714 | 14.0 |
2516 | (8KJ) (8) | 714 | 14.0 |
2517 | (A96) (J) | 714 | 14.0 |
2518 | (K) (J7) (6) | 714 | 14.0 |
2519 | (T) (T) (9) (8) | 714 | 14.0 |
2520 | (97) (96) | 714 | 14.0 |
2521 | (J6) (J) (6) | 714 | 14.0 |
2522 | (9) (9) (K) (J) | 713 | 14.0 |
2523 | (K) (T87) | 713 | 14.0 |
2524 | (KJ8) (7) | 713 | 14.0 |
2525 | (9K) (9) (7) | 712 | 14.0 |
2526 | (KQ6) (9) | 712 | 14.0 |
2527 | (8KQ) (8) | 712 | 14.0 |
2528 | (A) (T96) | 712 | 14.0 |
2529 | (K7) (86) | 712 | 14.0 |
2530 | (7Q) (7) (A) | 711 | 14.0 |
2531 | (K6) (87) | 711 | 14.0 |
2532 | (A9) (8) (7) | 711 | 14.0 |
2533 | (AQ6) (9) | 710 | 13.9 |
2534 | (T8) (T) (6) | 710 | 13.9 |
2535 | (6J) (6) (T) | 710 | 13.9 |
2536 | (T6) (T) (8) | 710 | 13.9 |
2537 | (9) (9) (T6) | 710 | 13.9 |
2538 | (K96) (Q) | 710 | 13.9 |
2539 | (8AK) (8) | 710 | 13.9 |
2540 | (9T8) (9) | 709 | 13.9 |
2541 | (Q) (T86) | 709 | 13.9 |
2542 | (AJ8) (7) | 709 | 13.9 |
2543 | (6Q) (6) (T) | 709 | 13.9 |
2544 | (6A) (6) (Q) | 709 | 13.9 |
2545 | (Q86) (J) | 709 | 13.9 |
2546 | (T6) (87) | 709 | 13.9 |
2547 | (K) (T7) (6) | 709 | 13.9 |
2548 | (A) (T87) | 708 | 13.9 |
2549 | (K) (K) (9) (7) | 708 | 13.9 |
2550 | (KJ7) (8) | 708 | 13.9 |
2551 | (6) (6) (QT) | 708 | 13.9 |
2552 | (K76) (K) | 708 | 13.9 |
2553 | (K) (Q87) | 708 | 13.9 |
2554 | (Q) (J6) (7) | 708 | 13.9 |
2555 | (6A) (6) (K) | 707 | 13.9 |
2556 | (6J) (69) | 707 | 13.9 |
2557 | (9) (9) (A) (Q) | 707 | 13.9 |
2558 | (8) (8) (K9) | 707 | 13.9 |
2559 | (8Q) (8) (9) | 707 | 13.9 |
2560 | (A) (Q7) (6) | 707 | 13.9 |
2561 | (7JT) (7) | 706 | 13.9 |
2562 | (Q6) (87) | 706 | 13.9 |
2563 | (A8) (9) (7) | 706 | 13.9 |
2564 | (K) (K) (6) (6) | 705 | 13.9 |
2565 | (A) (J) (86) | 705 | 13.8 |
2566 | (T) (98) (7) | 705 | 13.8 |
2567 | (8K) (8) (9) | 705 | 13.8 |
2568 | (T8) (9) (7) | 705 | 13.8 |
2569 | (K) (J) (86) | 705 | 13.8 |
2570 | (Q8) (76) | 705 | 13.8 |
2571 | (Q) (Q) (9) (8) | 704 | 13.8 |
2572 | (K) (K) (9) (6) | 704 | 13.8 |
2573 | (96) (9) (T) | 704 | 13.8 |
2574 | (9) (9) (K) (Q) | 704 | 13.8 |
2575 | (J) (J) (9) (8) | 704 | 13.8 |
2576 | (6) (6) (AQ) | 704 | 13.8 |
2577 | (K) (T) (9) (7) | 704 | 13.8 |
2578 | (9) (9) (J7) | 704 | 13.8 |
2579 | (T) (97) (8) | 704 | 13.8 |
2580 | (A) (J96) | 703 | 13.8 |
2581 | (9Q) (9) (7) | 703 | 13.8 |
2582 | (89) (86) | 703 | 13.8 |
2583 | (A) (J) (9) (8) | 702 | 13.8 |
2584 | (A87) (Q) | 702 | 13.8 |
2585 | (8) (8) (Q) (T) | 702 | 13.8 |
2586 | (6) (6) (AK) | 702 | 13.8 |
2587 | (Q86) (Q) | 702 | 13.8 |
2588 | (J96) (J) | 701 | 13.8 |
2589 | (J7) (86) | 701 | 13.8 |
2590 | (A) (K) (86) | 701 | 13.8 |
2591 | (Q) (J) (76) | 701 | 13.8 |
2592 | (TQ) (T) (T) | 701 | 13.8 |
2593 | (Q) (J86) | 700 | 13.8 |
2594 | (Q) (T) (9) (6) | 700 | 13.8 |
2595 | (6K) (6) (Q) | 700 | 13.7 |
2596 | (Q) (T) (76) | 700 | 13.7 |
2597 | (6) (6) (AT) | 700 | 13.7 |
2598 | (T) (T) (8) (8) | 700 | 13.7 |
2599 | (6) (6) (JT) | 700 | 13.7 |
2600 | (K) (J) (9) (8) | 700 | 13.7 |
2601 | (8) (8) (J9) | 700 | 13.7 |
2602 | (A87) (K) | 699 | 13.7 |
2603 | (6A) (6) (T) | 699 | 13.7 |
2604 | (K) (T6) (7) | 699 | 13.7 |
2605 | (AJ98) | 698 | 13.7 |
2606 | (7J) (7) (A) | 698 | 13.7 |
2607 | (A) (Q96) | 698 | 13.7 |
2608 | (KT6) (8) | 698 | 13.7 |
2609 | (J87) (J) | 698 | 13.7 |
2610 | (9) (9) (K7) | 698 | 13.7 |
2611 | (6T) (6) (J) | 697 | 13.7 |
2612 | (K) (J6) (7) | 697 | 13.7 |
2613 | (7KT) (7) | 697 | 13.7 |
2614 | (6) (6) (QJ) | 697 | 13.7 |
2615 | (J8) (76) | 697 | 13.7 |
2616 | (6K) (6) (T) | 696 | 13.7 |
2617 | (JT87) | 696 | 13.7 |
2618 | (98) (9) (Q) | 696 | 13.7 |
2619 | (J) (T) (8) (7) | 696 | 13.7 |
2620 | (KT8) (6) | 696 | 13.7 |
2621 | (T96) (T) | 696 | 13.7 |
2622 | (KQ98) | 696 | 13.7 |
2623 | (AQ7) (8) | 695 | 13.7 |
2624 | (K) (Q) (86) | 695 | 13.7 |
2625 | (A) (Q6) (7) | 695 | 13.6 |
2626 | (7T) (7) (A) | 695 | 13.6 |
2627 | (6T) (68) | 694 | 13.6 |
2628 | (T7) (9) (8) | 694 | 13.6 |
2629 | (89) (8) (J) | 694 | 13.6 |
2630 | (A) (K87) | 694 | 13.6 |
2631 | (QJ6) (8) | 694 | 13.6 |
2632 | (A) (Q) (86) | 693 | 13.6 |
2633 | (J) (J) (86) | 693 | 13.6 |
2634 | (6Q) (6) (J) | 693 | 13.6 |
2635 | (K87) (Q) | 693 | 13.6 |
2636 | (J6) (87) | 693 | 13.6 |
2637 | (97) (9) (J) | 693 | 13.6 |
2638 | (AT6) (8) | 692 | 13.6 |
2639 | (T) (T) (86) | 692 | 13.6 |
2640 | (T) (T) (K) (6) | 692 | 13.6 |
2641 | (K) (J87) | 692 | 13.6 |
2642 | (A86) (T) | 692 | 13.6 |
2643 | (AK7) (8) | 692 | 13.6 |
2644 | (QJ8) (6) | 691 | 13.6 |
2645 | (AQ8) (7) | 691 | 13.6 |
2646 | (AK8) (7) | 691 | 13.6 |
2647 | (6K) (6) (J) | 691 | 13.6 |
2648 | (A) (J7) (6) | 691 | 13.6 |
2649 | (A7) (9) (8) | 691 | 13.6 |
2650 | (Q) (J) (9) (7) | 690 | 13.5 |
2651 | (AK9) (6) | 690 | 13.5 |
2652 | (7QT) (7) | 690 | 13.5 |
2653 | (KQ7) (8) | 690 | 13.5 |
2654 | (K86) (T) | 690 | 13.5 |
2655 | (9T7) (9) | 689 | 13.5 |
2656 | (6K) (68) | 689 | 13.5 |
2657 | (T) (T) (A) (7) | 689 | 13.5 |
2658 | (A) (K96) | 689 | 13.5 |
2659 | (8) (8) (Q9) | 688 | 13.5 |
2660 | (6A) (6) (J) | 688 | 13.5 |
2661 | (J76) (T) | 687 | 13.5 |
2662 | (KQ8) (7) | 687 | 13.5 |
2663 | (AT8) (6) | 687 | 13.5 |
2664 | (7K) (76) | 686 | 13.5 |
2665 | (9) (9) (Q7) | 686 | 13.5 |
2666 | (6K) (6) (A) | 686 | 13.5 |
2667 | (J) (J) (A) (6) | 686 | 13.5 |
2668 | (Q) (Q) (76) | 686 | 13.5 |
2669 | (9K) (9) (6) | 685 | 13.5 |
2670 | (6A) (67) | 685 | 13.5 |
2671 | (T) (9) (87) | 685 | 13.5 |
2672 | (KJ6) (8) | 685 | 13.5 |
2673 | (JT6) (7) | 685 | 13.4 |
2674 | (KT97) | 685 | 13.4 |
2675 | (6) (6) (KQ) | 684 | 13.4 |
2676 | (6) (6) (AJ) | 684 | 13.4 |
2677 | (9J) (9) (6) | 683 | 13.4 |
2678 | (9) (9) (K6) | 683 | 13.4 |
2679 | (7T) (76) | 683 | 13.4 |
2680 | (6) (6) (KJ) | 683 | 13.4 |
2681 | (JT7) (6) | 683 | 13.4 |
2682 | (6) (6) (KT) | 682 | 13.4 |
2683 | (AK6) (9) | 682 | 13.4 |
2684 | (AJ8) (6) | 682 | 13.4 |
2685 | (AJ6) (8) | 682 | 13.4 |
2686 | (K86) (Q) | 682 | 13.4 |
2687 | (K) (T86) | 682 | 13.4 |
2688 | (9) (9) (A6) | 681 | 13.4 |
2689 | (KJ98) | 681 | 13.4 |
2690 | (7Q) (76) | 681 | 13.4 |
2691 | (J6) (J) (7) | 681 | 13.4 |
2692 | (A) (J87) | 680 | 13.4 |
2693 | (A) (Q87) | 680 | 13.4 |
2694 | (A) (T6) (7) | 680 | 13.4 |
2695 | (76) (76) | 680 | 13.4 |
2696 | (K) (T) (76) | 680 | 13.4 |
2697 | (J) (T76) | 680 | 13.4 |
2698 | (9Q) (9) (6) | 680 | 13.4 |
2699 | (J7) (J) (6) | 680 | 13.4 |
2700 | (AQ8) (6) | 680 | 13.4 |
2701 | (T9) (8) (6) | 680 | 13.3 |
2702 | (K) (Q) (76) | 680 | 13.3 |
2703 | (J7) (9) (8) | 680 | 13.3 |
2704 | (AK8) (6) | 679 | 13.3 |
2705 | (QT96) | 679 | 13.3 |
2706 | (K8) (9) (7) | 679 | 13.3 |
2707 | (K) (Q) (9) (8) | 677 | 13.3 |
2708 | (QA) (Q) (Q) | 677 | 13.3 |
2709 | (T87) (T) | 677 | 13.3 |
2710 | (6K) (67) | 677 | 13.3 |
2711 | (A) (T86) | 677 | 13.3 |
2712 | (A) (T7) (6) | 677 | 13.3 |
2713 | (K9) (8) (7) | 677 | 13.3 |
2714 | (6Q) (6) (K) | 677 | 13.3 |
2715 | (KJ97) | 676 | 13.3 |
2716 | (6T) (6) (Q) | 676 | 13.3 |
2717 | (J8) (9) (7) | 676 | 13.3 |
2718 | (9) (9) (A) (K) | 676 | 13.3 |
2719 | (A9) (8) (6) | 676 | 13.3 |
2720 | (JK) (J) (J) | 676 | 13.3 |
2721 | (6J) (6) (Q) | 675 | 13.3 |
2722 | (A8) (9) (6) | 675 | 13.3 |
2723 | (9) (9) (J6) | 675 | 13.3 |
2724 | (J9) (8) (7) | 674 | 13.2 |
2725 | (A) (Q) (9) (8) | 674 | 13.2 |
2726 | (6Q) (68) | 674 | 13.2 |
2727 | (QJ96) | 674 | 13.2 |
2728 | (T6) (T) (6) | 674 | 13.2 |
2729 | (98) (9) (A) | 673 | 13.2 |
2730 | (AQ98) | 673 | 13.2 |
2731 | (K7) (9) (8) | 673 | 13.2 |
2732 | (KJ8) (6) | 672 | 13.2 |
2733 | (Q) (Q) (9) (7) | 672 | 13.2 |
2734 | (T8) (9) (6) | 672 | 13.2 |
2735 | (QT6) (7) | 672 | 13.2 |
2736 | (K) (J) (76) | 672 | 13.2 |
2737 | (A) (J6) (7) | 671 | 13.2 |
2738 | (AT97) | 671 | 13.2 |
2739 | (AQ6) (8) | 671 | 13.2 |
2740 | (A) (T) (76) | 671 | 13.2 |
2741 | (Q9) (8) (7) | 671 | 13.2 |
2742 | (A86) (J) | 671 | 13.2 |
2743 | (K86) (J) | 671 | 13.2 |
2744 | (A) (K86) | 671 | 13.2 |
2745 | (A) (K) (76) | 670 | 13.2 |
2746 | (Q) (J) (9) (6) | 670 | 13.2 |
2747 | (8T9) (8) | 670 | 13.2 |
2748 | (K) (K) (8) (7) | 670 | 13.2 |
2749 | (6J) (68) | 670 | 13.1 |
2750 | (K) (Q86) | 669 | 13.1 |
2751 | (T) (98) (6) | 669 | 13.1 |
2752 | (8A) (8) (7) | 669 | 13.1 |
2753 | (97) (9) (7) | 668 | 13.1 |
2754 | (9J8) (9) | 668 | 13.1 |
2755 | (K) (J) (9) (7) | 667 | 13.1 |
2756 | (A86) (Q) | 667 | 13.1 |
2757 | (89) (8) (Q) | 667 | 13.1 |
2758 | (AK6) (8) | 666 | 13.1 |
2759 | (98) (9) (K) | 666 | 13.1 |
2760 | (QT7) (6) | 665 | 13.1 |
2761 | (T) (T) (9) (7) | 665 | 13.1 |
2762 | (Q8) (9) (7) | 665 | 13.0 |
2763 | (KT6) (7) | 664 | 13.0 |
2764 | (T) (T) (A) (6) | 664 | 13.0 |
2765 | (A) (K) (9) (8) | 664 | 13.0 |
2766 | (7KJ) (7) | 664 | 13.0 |
2767 | (A) (T) (9) (7) | 664 | 13.0 |
2768 | (Q7) (9) (8) | 664 | 13.0 |
2769 | (7) (7) (A9) | 663 | 13.0 |
2770 | (J) (97) (8) | 663 | 13.0 |
2771 | (97) (9) (Q) | 663 | 13.0 |
2772 | (K) (J86) | 663 | 13.0 |
2773 | (96) (9) (J) | 663 | 13.0 |
2774 | (8) (8) (K) (T) | 663 | 13.0 |
2775 | (KQ8) (6) | 662 | 13.0 |
2776 | (KT7) (6) | 662 | 13.0 |
2777 | (J86) (J) | 661 | 13.0 |
2778 | (QJ97) | 661 | 13.0 |
2779 | (A86) (K) | 661 | 13.0 |
2780 | (Q76) (Q) | 661 | 13.0 |
2781 | (QT87) | 660 | 13.0 |
2782 | (7A) (7) (9) | 659 | 12.9 |
2783 | (7J) (76) | 659 | 12.9 |
2784 | (Q76) (J) | 658 | 12.9 |
2785 | (KQ6) (8) | 658 | 12.9 |
2786 | (9) (9) (Q6) | 658 | 12.9 |
2787 | (T) (9) (86) | 658 | 12.9 |
2788 | (T) (96) (8) | 658 | 12.9 |
2789 | (JT86) | 657 | 12.9 |
2790 | (Q) (T76) | 657 | 12.9 |
2791 | (T6) (T) (7) | 657 | 12.9 |
2792 | (Q76) (T) | 657 | 12.9 |
2793 | (A6) (9) (8) | 657 | 12.9 |
2794 | (J) (J) (9) (7) | 656 | 12.9 |
2795 | (AJ97) | 656 | 12.9 |
2796 | (87) (86) | 656 | 12.9 |
2797 | (TK) (T) (T) | 656 | 12.9 |
2798 | (K) (T76) | 656 | 12.9 |
2799 | (T87) (9) | 656 | 12.9 |
2800 | (A) (Q86) | 656 | 12.9 |
Table 8: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 2801-3200
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
2801 | (K) (T) (9) (6) | 655 | 12.9 |
2802 | (K76) (T) | 655 | 12.9 |
2803 | (T6) (9) (8) | 655 | 12.9 |
2804 | (KJ7) (6) | 655 | 12.9 |
2805 | (9A8) (9) | 654 | 12.9 |
2806 | (Q) (T) (8) (7) | 654 | 12.8 |
2807 | (A) (Q) (76) | 654 | 12.8 |
2808 | (KT96) | 654 | 12.8 |
2809 | (A) (J86) | 654 | 12.8 |
2810 | (K76) (Q) | 654 | 12.8 |
2811 | (AQ97) | 653 | 12.8 |
2812 | (6T) (6) (K) | 653 | 12.8 |
2813 | (A) (J) (76) | 653 | 12.8 |
2814 | (J) (9) (87) | 653 | 12.8 |
2815 | (7QJ) (7) | 653 | 12.8 |
2816 | (6QT) (6) | 653 | 12.8 |
2817 | (KQ7) (6) | 653 | 12.8 |
2818 | (AT6) (7) | 652 | 12.8 |
2819 | (AK98) | 652 | 12.8 |
2820 | (7T) (7) (9) | 652 | 12.8 |
2821 | (K9) (8) (6) | 651 | 12.8 |
2822 | (97) (86) | 651 | 12.8 |
2823 | (96) (9) (Q) | 651 | 12.8 |
2824 | (7AT) (7) | 651 | 12.8 |
2825 | (QJ87) | 651 | 12.8 |
2826 | (9J7) (9) | 651 | 12.8 |
2827 | (J) (98) (7) | 650 | 12.8 |
2828 | (8A) (8) (6) | 650 | 12.8 |
2829 | (T7) (T) (6) | 650 | 12.8 |
2830 | (QJ7) (6) | 650 | 12.8 |
2831 | (8) (8) (Q) (J) | 650 | 12.8 |
2832 | (6Q) (6) (A) | 649 | 12.8 |
2833 | (7KQ) (7) | 649 | 12.7 |
2834 | (6JT) (6) | 649 | 12.7 |
2835 | (97) (9) (K) | 649 | 12.7 |
2836 | (KQ97) | 649 | 12.7 |
2837 | (97) (9) (A) | 649 | 12.7 |
2838 | (79) (7) (T) | 649 | 12.7 |
2839 | (79) (76) | 649 | 12.7 |
2840 | (6Q) (67) | 648 | 12.7 |
2841 | (A) (J) (9) (7) | 648 | 12.7 |
2842 | (J) (T) (8) (6) | 648 | 12.7 |
2843 | (K) (K) (8) (6) | 646 | 12.7 |
2844 | (6J) (6) (K) | 646 | 12.7 |
2845 | (7AK) (7) | 646 | 12.7 |
2846 | (AT96) | 646 | 12.7 |
2847 | (9T6) (9) | 646 | 12.7 |
2848 | (QJ6) (7) | 646 | 12.7 |
2849 | (T98) (7) | 646 | 12.7 |
2850 | (K8) (9) (6) | 646 | 12.7 |
2851 | (K76) (J) | 646 | 12.7 |
2852 | (6T) (67) | 646 | 12.7 |
2853 | (7) (7) (T9) | 646 | 12.7 |
2854 | (J9) (8) (6) | 646 | 12.7 |
2855 | (Q) (Q) (9) (6) | 645 | 12.7 |
2856 | (7AJ) (7) | 645 | 12.7 |
2857 | (AJ6) (7) | 645 | 12.7 |
2858 | (89) (8) (A) | 645 | 12.7 |
2859 | (89) (8) (K) | 645 | 12.7 |
2860 | (QT86) | 644 | 12.7 |
2861 | (JA) (J) (J) | 644 | 12.7 |
2862 | (8J9) (8) | 644 | 12.6 |
2863 | (9Q8) (9) | 644 | 12.6 |
2864 | (J8) (9) (6) | 644 | 12.6 |
2865 | (AK97) | 644 | 12.6 |
2866 | (8) (8) (A) (T) | 644 | 12.6 |
2867 | (AT7) (6) | 643 | 12.6 |
2868 | (J) (J) (76) | 643 | 12.6 |
2869 | (8T) (8) (7) | 643 | 12.6 |
2870 | (96) (9) (6) | 643 | 12.6 |
2871 | (T86) (T) | 643 | 12.6 |
2872 | (A9) (7) (6) | 642 | 12.6 |
2873 | (K) (T) (8) (7) | 642 | 12.6 |
2874 | (Q8) (9) (6) | 642 | 12.6 |
2875 | (Q) (J76) | 642 | 12.6 |
2876 | (AQ7) (6) | 642 | 12.6 |
2877 | (96) (87) | 642 | 12.6 |
2878 | (K6) (9) (8) | 642 | 12.6 |
2879 | (Q) (Q) (7) (7) | 641 | 12.6 |
2880 | (6QJ) (6) | 641 | 12.6 |
2881 | (7A) (7) (8) | 641 | 12.6 |
2882 | (K) (Q76) | 641 | 12.6 |
2883 | (A76) (J) | 641 | 12.6 |
2884 | (6J) (67) | 641 | 12.6 |
2885 | (KT87) | 641 | 12.6 |
2886 | (98) (76) | 640 | 12.6 |
2887 | (7AQ) (7) | 640 | 12.6 |
2888 | (A7) (9) (6) | 640 | 12.6 |
2889 | (AK7) (6) | 639 | 12.5 |
2890 | (KQ6) (7) | 639 | 12.5 |
2891 | (T9) (T) (T) | 639 | 12.5 |
2892 | (K) (Q) (9) (7) | 638 | 12.5 |
2893 | (7) (7) (K9) | 638 | 12.5 |
2894 | (Q9) (8) (6) | 638 | 12.5 |
2895 | (A76) (K) | 637 | 12.5 |
2896 | (J) (J) (J) (T) | 637 | 12.5 |
2897 | (K) (J76) | 637 | 12.5 |
2898 | (8) (8) (A7) | 637 | 12.5 |
2899 | (KJ6) (7) | 637 | 12.5 |
2900 | (J6) (9) (8) | 637 | 12.5 |
2901 | (7K) (7) (9) | 636 | 12.5 |
2902 | (Q) (T) (8) (6) | 636 | 12.5 |
2903 | (T97) (8) | 636 | 12.5 |
2904 | (Q) (98) (7) | 636 | 12.5 |
2905 | (AK6) (7) | 636 | 12.5 |
2906 | (AQ6) (7) | 635 | 12.5 |
2907 | (7) (7) (J) (T) | 635 | 12.5 |
2908 | (9) (9) (T) (8) | 635 | 12.5 |
2909 | (J) (J) (7) (7) | 634 | 12.5 |
2910 | (A76) (T) | 634 | 12.5 |
2911 | (8K) (8) (7) | 634 | 12.4 |
2912 | (A) (K76) | 633 | 12.4 |
2913 | (T7) (9) (6) | 633 | 12.4 |
2914 | (9K8) (9) | 633 | 12.4 |
2915 | (Q) (97) (8) | 632 | 12.4 |
2916 | (8) (8) (T7) | 632 | 12.4 |
2917 | (T) (987) | 632 | 12.4 |
2918 | (K) (K) (7) (6) | 632 | 12.4 |
2919 | (7J) (7) (9) | 632 | 12.4 |
2920 | (7) (7) (A8) | 631 | 12.4 |
2921 | (A76) (Q) | 631 | 12.4 |
2922 | (69) (67) | 630 | 12.4 |
2923 | (69) (68) | 630 | 12.4 |
2924 | (7Q) (7) (9) | 629 | 12.3 |
2925 | (A) (T76) | 629 | 12.3 |
2926 | (9A7) (9) | 629 | 12.3 |
2927 | (Q) (Q) (8) (7) | 628 | 12.3 |
2928 | (J) (96) (8) | 628 | 12.3 |
2929 | (AJ96) | 628 | 12.3 |
2930 | (K) (J) (9) (6) | 628 | 12.3 |
2931 | (AT87) | 627 | 12.3 |
2932 | (96) (9) (A) | 627 | 12.3 |
2933 | (A) (Q) (9) (7) | 627 | 12.3 |
2934 | (T) (T) (76) | 627 | 12.3 |
2935 | (KJ87) | 627 | 12.3 |
2936 | (A) (Q76) | 626 | 12.3 |
2937 | (8J) (8) (7) | 626 | 12.3 |
2938 | (8) (8) (K) (J) | 626 | 12.3 |
2939 | (7) (7) (Q9) | 626 | 12.3 |
2940 | (T9) (7) (6) | 626 | 12.3 |
2941 | (A) (T) (9) (6) | 626 | 12.3 |
2942 | (AJ7) (6) | 626 | 12.3 |
2943 | (A6) (9) (7) | 625 | 12.3 |
2944 | (78) (76) | 625 | 12.3 |
2945 | (T) (97) (6) | 625 | 12.3 |
2946 | (8) (8) (A) (Q) | 624 | 12.3 |
2947 | (96) (9) (K) | 624 | 12.3 |
2948 | (Q) (Q) (6) (6) | 624 | 12.2 |
2949 | (8K9) (8) | 624 | 12.2 |
2950 | (KJ96) | 624 | 12.2 |
2951 | (A) (T) (8) (7) | 624 | 12.2 |
2952 | (7) (7) (J9) | 623 | 12.2 |
2953 | (6J) (6) (A) | 623 | 12.2 |
2954 | (6T) (6) (A) | 623 | 12.2 |
2955 | (KQ96) | 623 | 12.2 |
2956 | (Q) (J) (8) (7) | 622 | 12.2 |
2957 | (87) (8) (T) | 622 | 12.2 |
2958 | (Q) (9) (87) | 622 | 12.2 |
2959 | (T6) (9) (7) | 622 | 12.2 |
2960 | (8) (8) (A) (J) | 621 | 12.2 |
2961 | (J) (98) (6) | 621 | 12.2 |
2962 | (Q6) (9) (8) | 621 | 12.2 |
2963 | (9Q7) (9) | 621 | 12.2 |
2964 | (K) (Q) (9) (6) | 619 | 12.2 |
2965 | (68) (67) | 619 | 12.1 |
2966 | (87) (8) (7) | 618 | 12.1 |
2967 | (T) (T) (7) (7) | 618 | 12.1 |
2968 | (T) (9) (76) | 616 | 12.1 |
2969 | (A) (98) (7) | 616 | 12.1 |
2970 | (8) (8) (A6) | 616 | 12.1 |
2971 | (Q) (J) (8) (6) | 616 | 12.1 |
2972 | (AJ87) | 615 | 12.1 |
2973 | (8K) (8) (6) | 615 | 12.1 |
2974 | (9J6) (9) | 615 | 12.1 |
2975 | (T) (96) (7) | 614 | 12.1 |
2976 | (T) (T) (9) (6) | 614 | 12.1 |
2977 | (A) (J76) | 614 | 12.1 |
2978 | (A9) (A) (A) | 614 | 12.0 |
2979 | (AQ87) | 613 | 12.0 |
2980 | (6KQ) (6) | 613 | 12.0 |
2981 | (A) (K) (9) (7) | 613 | 12.0 |
2982 | (9K7) (9) | 613 | 12.0 |
2983 | (K) (97) (8) | 612 | 12.0 |
2984 | (K) (9) (87) | 612 | 12.0 |
2985 | (A) (J) (9) (6) | 612 | 12.0 |
2986 | (6KJ) (6) | 612 | 12.0 |
2987 | (79) (7) (J) | 612 | 12.0 |
2988 | (98) (9) (7) | 611 | 12.0 |
2989 | (QJ86) | 611 | 12.0 |
2990 | (K9) (7) (6) | 611 | 12.0 |
2991 | (J97) (8) | 610 | 12.0 |
2992 | (8T) (8) (6) | 610 | 12.0 |
2993 | (A) (9) (87) | 610 | 12.0 |
2994 | (J76) (J) | 610 | 12.0 |
2995 | (KT86) | 609 | 12.0 |
2996 | (A6) (8) (7) | 609 | 12.0 |
2997 | (K) (J) (8) (7) | 609 | 12.0 |
2998 | (9Q6) (9) | 609 | 12.0 |
2999 | (A) (J) (8) (7) | 609 | 11.9 |
3000 | (A7) (A) (A) | 608 | 11.9 |
3001 | (A) (97) (8) | 608 | 11.9 |
3002 | (8A9) (8) | 608 | 11.9 |
3003 | (K7) (9) (6) | 608 | 11.9 |
3004 | (8) (8) (K7) | 608 | 11.9 |
3005 | (AK96) | 607 | 11.9 |
3006 | (J) (9) (86) | 607 | 11.9 |
3007 | (AQ96) | 607 | 11.9 |
3008 | (T) (T) (T) (J) | 607 | 11.9 |
3009 | (K) (98) (7) | 607 | 11.9 |
3010 | (T) (986) | 607 | 11.9 |
3011 | (A8) (7) (6) | 607 | 11.9 |
3012 | (A8) (A) (A) | 606 | 11.9 |
3013 | (J) (J) (8) (7) | 606 | 11.9 |
3014 | (8Q) (8) (7) | 606 | 11.9 |
3015 | (J) (J) (9) (6) | 606 | 11.9 |
3016 | (7T) (7) (8) | 606 | 11.9 |
3017 | (T96) (8) | 605 | 11.9 |
3018 | (TA) (T) (T) | 604 | 11.9 |
3019 | (97) (9) (8) | 603 | 11.8 |
3020 | (A7) (8) (6) | 603 | 11.8 |
3021 | (8) (8) (J7) | 603 | 11.8 |
3022 | (9) (9) (T) (7) | 603 | 11.8 |
3023 | (K6) (9) (7) | 603 | 11.8 |
3024 | (8) (8) (Q7) | 603 | 11.8 |
3025 | (8J) (8) (6) | 603 | 11.8 |
3026 | (T86) (9) | 602 | 11.8 |
3027 | (8Q9) (8) | 602 | 11.8 |
3028 | (Q) (Q) (Q) (T) | 602 | 11.8 |
3029 | (J9) (7) (6) | 602 | 11.8 |
3030 | (J87) (9) | 601 | 11.8 |
3031 | (6KT) (6) | 601 | 11.8 |
3032 | (6AK) (6) | 601 | 11.8 |
3033 | (8) (8) (A) (K) | 601 | 11.8 |
3034 | (Q) (98) (6) | 601 | 11.8 |
3035 | (AT86) | 601 | 11.8 |
3036 | (J9) (J) (J) | 601 | 11.8 |
3037 | (JT76) | 601 | 11.8 |
3038 | (9) (9) (87) | 600 | 11.8 |
3039 | (KJ86) | 600 | 11.8 |
3040 | (7Q) (7) (8) | 600 | 11.8 |
3041 | (Q) (Q) (8) (6) | 600 | 11.8 |
3042 | (8) (8) (T6) | 600 | 11.8 |
3043 | (Q9) (7) (6) | 600 | 11.8 |
3044 | (J) (987) | 599 | 11.8 |
3045 | (T) (T) (8) (7) | 599 | 11.8 |
3046 | (Q) (9) (86) | 599 | 11.8 |
3047 | (KQ87) | 599 | 11.8 |
3048 | (78) (7) (T) | 599 | 11.8 |
3049 | (6AT) (6) | 599 | 11.8 |
3050 | (Q98) (7) | 598 | 11.7 |
3051 | (J) (T) (7) (6) | 598 | 11.7 |
3052 | (8) (8) (K) (Q) | 598 | 11.7 |
3053 | (Q7) (9) (6) | 597 | 11.7 |
3054 | (79) (7) (Q) | 597 | 11.7 |
3055 | (Q) (96) (8) | 596 | 11.7 |
3056 | (J98) (7) | 596 | 11.7 |
3057 | (T76) (T) | 595 | 11.7 |
3058 | (87) (8) (J) | 595 | 11.7 |
3059 | (6) (6) (A9) | 595 | 11.7 |
3060 | (A6) (A) (A) | 594 | 11.7 |
3061 | (8Q) (8) (6) | 594 | 11.7 |
3062 | (Q6) (9) (7) | 594 | 11.7 |
3063 | (7) (7) (K8) | 594 | 11.7 |
3064 | (J6) (9) (7) | 594 | 11.7 |
3065 | (A98) (7) | 593 | 11.7 |
3066 | (K) (Q) (8) (7) | 593 | 11.6 |
3067 | (A) (K) (8) (7) | 593 | 11.6 |
3068 | (AK87) | 593 | 11.6 |
3069 | (7K) (7) (8) | 593 | 11.6 |
3070 | (86) (8) (T) | 593 | 11.6 |
3071 | (9A6) (9) | 593 | 11.6 |
3072 | (AK86) | 592 | 11.6 |
3073 | (J7) (9) (6) | 592 | 11.6 |
3074 | (K) (T) (8) (6) | 592 | 11.6 |
3075 | (9) (9) (8) (8) | 592 | 11.6 |
3076 | (7) (7) (Q) (T) | 592 | 11.6 |
3077 | (T98) (6) | 591 | 11.6 |
3078 | (Q9) (Q) (Q) | 591 | 11.6 |
3079 | (7) (7) (T8) | 591 | 11.6 |
3080 | (AJ86) | 591 | 11.6 |
3081 | (A) (Q) (9) (6) | 591 | 11.6 |
3082 | (K) (98) (6) | 591 | 11.6 |
3083 | (98) (9) (6) | 590 | 11.6 |
3084 | (9) (9) (J) (8) | 590 | 11.6 |
3085 | (7J) (7) (8) | 590 | 11.6 |
3086 | (KQ86) | 590 | 11.6 |
3087 | (A) (K) (9) (6) | 589 | 11.6 |
3088 | (K9) (K) (K) | 588 | 11.6 |
3089 | (89) (8) (7) | 587 | 11.5 |
3090 | (Q87) (9) | 587 | 11.5 |
3091 | (6A) (6) (9) | 587 | 11.5 |
3092 | (A97) (8) | 587 | 11.5 |
3093 | (96) (9) (8) | 586 | 11.5 |
3094 | (7T9) (7) | 586 | 11.5 |
3095 | (9K6) (9) | 586 | 11.5 |
3096 | (6AJ) (6) | 585 | 11.5 |
3097 | (A) (98) (6) | 585 | 11.5 |
3098 | (A) (Q) (8) (7) | 585 | 11.5 |
3099 | (K) (96) (8) | 585 | 11.5 |
3100 | (7A) (7) (6) | 585 | 11.5 |
3101 | (8) (8) (K6) | 584 | 11.5 |
3102 | (A) (T) (8) (6) | 584 | 11.5 |
3103 | (6T) (6) (9) | 584 | 11.5 |
3104 | (79) (7) (K) | 584 | 11.5 |
3105 | (Q) (Q) (Q) (J) | 583 | 11.5 |
3106 | (7) (7) (K) (T) | 583 | 11.5 |
3107 | (8) (8) (J6) | 583 | 11.4 |
3108 | (6) (6) (A8) | 582 | 11.4 |
3109 | (6AQ) (6) | 582 | 11.4 |
3110 | (A) (96) (8) | 581 | 11.4 |
3111 | (Q97) (8) | 581 | 11.4 |
3112 | (KT76) | 581 | 11.4 |
3113 | (8) (8) (97) | 581 | 11.4 |
3114 | (7) (7) (J8) | 580 | 11.4 |
3115 | (K) (J) (8) (6) | 580 | 11.4 |
3116 | (K87) (9) | 579 | 11.4 |
3117 | (Q) (987) | 579 | 11.4 |
3118 | (8) (8) (T) (9) | 579 | 11.4 |
3119 | (86) (8) (6) | 579 | 11.4 |
3120 | (K97) (8) | 578 | 11.4 |
3121 | (J) (J) (J) (Q) | 578 | 11.3 |
3122 | (QT76) | 578 | 11.3 |
3123 | (K98) (7) | 577 | 11.3 |
3124 | (6) (6) (T9) | 577 | 11.3 |
3125 | (7) (7) (Q8) | 577 | 11.3 |
3126 | (J) (96) (7) | 576 | 11.3 |
3127 | (8) (8) (Q6) | 576 | 11.3 |
3128 | (87) (8) (Q) | 576 | 11.3 |
3129 | (K) (9) (86) | 575 | 11.3 |
3130 | (97) (9) (6) | 575 | 11.3 |
3131 | (K8) (7) (6) | 575 | 11.3 |
3132 | (7) (7) (Q) (J) | 575 | 11.3 |
3133 | (8T7) (8) | 574 | 11.3 |
3134 | (J) (97) (6) | 574 | 11.3 |
3135 | (Q) (T) (7) (6) | 574 | 11.3 |
3136 | (K) (Q) (8) (6) | 574 | 11.3 |
3137 | (J98) (6) | 573 | 11.3 |
3138 | (79) (7) (A) | 573 | 11.3 |
3139 | (87) (8) (A) | 573 | 11.2 |
3140 | (T8) (7) (6) | 572 | 11.2 |
3141 | (T6) (8) (7) | 572 | 11.2 |
3142 | (6A) (6) (8) | 572 | 11.2 |
3143 | (89) (8) (6) | 572 | 11.2 |
3144 | (J86) (9) | 572 | 11.2 |
3145 | (86) (8) (J) | 572 | 11.2 |
3146 | (87) (8) (9) | 571 | 11.2 |
3147 | (69) (6) (T) | 571 | 11.2 |
3148 | (6) (6) (K9) | 571 | 11.2 |
3149 | (T7) (8) (6) | 571 | 11.2 |
3150 | (J) (9) (76) | 571 | 11.2 |
3151 | (QJ76) | 571 | 11.2 |
3152 | (A) (9) (86) | 571 | 11.2 |
3153 | (6K) (6) (9) | 570 | 11.2 |
3154 | (6J) (6) (9) | 569 | 11.2 |
3155 | (K7) (8) (6) | 569 | 11.2 |
3156 | (J96) (8) | 568 | 11.2 |
3157 | (A) (J) (8) (6) | 568 | 11.2 |
3158 | (78) (7) (J) | 568 | 11.2 |
3159 | (96) (9) (7) | 568 | 11.1 |
3160 | (Q) (J) (7) (6) | 567 | 11.1 |
3161 | (Q) (97) (6) | 567 | 11.1 |
3162 | (Q) (96) (7) | 566 | 11.1 |
3163 | (T96) (7) | 566 | 11.1 |
3164 | (9) (9) (86) | 566 | 11.1 |
3165 | (KQ76) | 565 | 11.1 |
3166 | (6Q) (6) (9) | 565 | 11.1 |
3167 | (T97) (6) | 564 | 11.1 |
3168 | (87) (8) (K) | 563 | 11.1 |
3169 | (A87) (9) | 563 | 11.1 |
3170 | (7J9) (7) | 563 | 11.1 |
3171 | (79) (7) (8) | 563 | 11.0 |
3172 | (T76) (9) | 563 | 11.0 |
3173 | (K6) (8) (7) | 562 | 11.0 |
3174 | (9) (9) (T) (6) | 562 | 11.0 |
3175 | (A) (K) (8) (6) | 562 | 11.0 |
3176 | (T) (87) (6) | 562 | 11.0 |
3177 | (K) (T) (7) (6) | 561 | 11.0 |
3178 | (K96) (8) | 561 | 11.0 |
3179 | (6) (6) (Q9) | 560 | 11.0 |
3180 | (Q) (Q) (7) (6) | 560 | 11.0 |
3181 | (Q86) (9) | 560 | 11.0 |
3182 | (Q8) (7) (6) | 560 | 11.0 |
3183 | (T987) | 560 | 11.0 |
3184 | (A) (987) | 559 | 11.0 |
3185 | (J7) (8) (6) | 559 | 11.0 |
3186 | (K) (97) (6) | 559 | 11.0 |
3187 | (J) (J) (8) (6) | 558 | 11.0 |
3188 | (7) (7) (K) (J) | 558 | 11.0 |
3189 | (6) (6) (J9) | 558 | 11.0 |
3190 | (86) (8) (9) | 558 | 11.0 |
3191 | (6A) (6) (7) | 558 | 11.0 |
3192 | (6) (6) (A7) | 558 | 11.0 |
3193 | (AQ86) | 558 | 10.9 |
3194 | (T) (9) (8) (7) | 558 | 10.9 |
3195 | (6) (6) (J) (T) | 557 | 10.9 |
3196 | (Q96) (8) | 557 | 10.9 |
3197 | (K) (K) (K) (J) | 556 | 10.9 |
3198 | (T) (8) (76) | 556 | 10.9 |
3199 | (Q98) (6) | 556 | 10.9 |
3200 | (9) (9) (Q) (8) | 556 | 10.9 |
Table 9: Best Short Deck Omaha 6-Max Starting Hands (based upon 50 million deals): Ranks 3201-3663
___ Rank ___ | Starting Hand (suit-iso bucket) | Adjusted Tally | Estimated Equity (%) |
---|---|---|---|
3201 | (7A9) (7) | 555 | 10.9 |
3202 | (Q) (9) (76) | 555 | 10.9 |
3203 | (7) (7) (98) | 555 | 10.9 |
3204 | (A) (Q) (8) (6) | 554 | 10.9 |
3205 | (8J7) (8) | 554 | 10.9 |
3206 | (AJ76) | 554 | 10.9 |
3207 | (J) (986) | 554 | 10.9 |
3208 | (K86) (9) | 554 | 10.9 |
3209 | (A) (97) (6) | 553 | 10.9 |
3210 | (A96) (8) | 552 | 10.8 |
3211 | (9) (9) (76) | 552 | 10.8 |
3212 | (AT76) | 552 | 10.8 |
3213 | (7Q9) (7) | 552 | 10.8 |
3214 | (8A7) (8) | 552 | 10.8 |
3215 | (K) (K) (K) (T) | 552 | 10.8 |
3216 | (T) (T) (8) (6) | 551 | 10.8 |
3217 | (78) (7) (Q) | 551 | 10.8 |
3218 | (7T8) (7) | 551 | 10.8 |
3219 | (K98) (6) | 551 | 10.8 |
3220 | (987) (9) | 551 | 10.8 |
3221 | (86) (8) (Q) | 551 | 10.8 |
3222 | (8T6) (8) | 551 | 10.8 |
3223 | (7) (7) (K) (Q) | 551 | 10.8 |
3224 | (Q6) (8) (7) | 550 | 10.8 |
3225 | (Q7) (8) (6) | 550 | 10.8 |
3226 | (A86) (9) | 550 | 10.8 |
3227 | (78) (7) (9) | 550 | 10.8 |
3228 | (8) (8) (96) | 550 | 10.8 |
3229 | (K) (K) (K) (Q) | 550 | 10.8 |
3230 | (A98) (6) | 550 | 10.8 |
3231 | (6T9) (6) | 549 | 10.8 |
3232 | (T) (976) | 549 | 10.8 |
3233 | (K) (96) (7) | 549 | 10.8 |
3234 | (78) (7) (A) | 549 | 10.8 |
3235 | (T) (86) (7) | 549 | 10.8 |
3236 | (J8) (7) (6) | 549 | 10.8 |
3237 | (86) (8) (A) | 548 | 10.8 |
3238 | (A) (96) (7) | 548 | 10.8 |
3239 | (T8) (T) (T) | 548 | 10.8 |
3240 | (7K) (7) (6) | 547 | 10.7 |
3241 | (7) (7) (A6) | 547 | 10.7 |
3242 | (9) (9) (J) (7) | 546 | 10.7 |
3243 | (Q) (Q) (Q) (K) | 545 | 10.7 |
3244 | (A) (A) (A) (J) | 544 | 10.7 |
3245 | (J97) (6) | 544 | 10.7 |
3246 | (78) (7) (K) | 544 | 10.7 |
3247 | (K) (987) | 543 | 10.7 |
3248 | (J6) (8) (7) | 543 | 10.7 |
3249 | (6) (6) (Q) (T) | 543 | 10.7 |
3250 | (69) (6) (J) | 542 | 10.7 |
3251 | (Q) (986) | 542 | 10.6 |
3252 | (K) (Q) (7) (6) | 542 | 10.6 |
3253 | (86) (8) (K) | 541 | 10.6 |
3254 | (7) (7) (A) (T) | 541 | 10.6 |
3255 | (K) (9) (76) | 540 | 10.6 |
3256 | (7) (7) (A) (K) | 540 | 10.6 |
3257 | (K) (J) (7) (6) | 539 | 10.6 |
3258 | (7K9) (7) | 538 | 10.6 |
3259 | (T) (T) (6) (6) | 538 | 10.6 |
3260 | (6K) (6) (8) | 538 | 10.6 |
3261 | (A) (9) (76) | 538 | 10.6 |
3262 | (KJ76) | 538 | 10.6 |
3263 | (J96) (7) | 538 | 10.6 |
3264 | (AQ76) | 537 | 10.6 |
3265 | (8) (8) (J) (9) | 537 | 10.5 |
3266 | (7) (7) (A) (J) | 537 | 10.5 |
3267 | (6) (6) (K8) | 536 | 10.5 |
3268 | (A) (T) (7) (6) | 536 | 10.5 |
3269 | (A) (K) (7) (6) | 535 | 10.5 |
3270 | (69) (6) (Q) | 535 | 10.5 |
3271 | (A) (A) (A) (T) | 534 | 10.5 |
3272 | (8J6) (8) | 534 | 10.5 |
3273 | (J) (J) (6) (6) | 534 | 10.5 |
3274 | (A) (A) (A) (K) | 533 | 10.5 |
3275 | (897) (8) | 533 | 10.5 |
3276 | (8A6) (8) | 532 | 10.4 |
3277 | (A97) (6) | 532 | 10.4 |
3278 | (986) (9) | 532 | 10.4 |
3279 | (T986) | 532 | 10.4 |
3280 | (9T) (9) (9) | 532 | 10.4 |
3281 | (9) (9) (K) (8) | 531 | 10.4 |
3282 | (8K7) (8) | 530 | 10.4 |
3283 | (6T) (6) (8) | 530 | 10.4 |
3284 | (6Q) (6) (8) | 530 | 10.4 |
3285 | (9) (9) (7) (7) | 530 | 10.4 |
3286 | (Q97) (6) | 530 | 10.4 |
3287 | (9) (9) (A) (8) | 529 | 10.4 |
3288 | (K) (986) | 529 | 10.4 |
3289 | (7) (7) (A) (Q) | 528 | 10.4 |
3290 | (A) (A) (A) (Q) | 528 | 10.4 |
3291 | (A96) (7) | 527 | 10.4 |
3292 | (8Q7) (8) | 527 | 10.3 |
3293 | (6) (6) (T8) | 527 | 10.3 |
3294 | (Q96) (7) | 527 | 10.3 |
3295 | (AK76) | 527 | 10.3 |
3296 | (J8) (J) (J) | 526 | 10.3 |
3297 | (J) (8) (76) | 525 | 10.3 |
3298 | (7J8) (7) | 525 | 10.3 |
3299 | (J76) (9) | 525 | 10.3 |
3300 | (Q8) (Q) (Q) | 525 | 10.3 |
3301 | (8Q6) (8) | 525 | 10.3 |
3302 | (K96) (7) | 524 | 10.3 |
3303 | (7T) (7) (6) | 524 | 10.3 |
3304 | (T) (9) (8) (6) | 524 | 10.3 |
3305 | (6) (6) (J8) | 523 | 10.3 |
3306 | (J) (86) (7) | 523 | 10.3 |
3307 | (Q76) (9) | 523 | 10.3 |
3308 | (7Q) (7) (6) | 523 | 10.3 |
3309 | (J987) | 523 | 10.3 |
3310 | (7) (7) (K6) | 522 | 10.3 |
3311 | (A) (986) | 522 | 10.3 |
3312 | (A) (J) (7) (6) | 522 | 10.2 |
3313 | (J) (87) (6) | 521 | 10.2 |
3314 | (J) (976) | 521 | 10.2 |
3315 | (7A8) (7) | 520 | 10.2 |
3316 | (6J) (6) (8) | 520 | 10.2 |
3317 | (76) (7) (6) | 520 | 10.2 |
3318 | (A76) (9) | 520 | 10.2 |
3319 | (7J) (7) (6) | 520 | 10.2 |
3320 | (8) (8) (Q) (9) | 520 | 10.2 |
3321 | (76) (7) (T) | 520 | 10.2 |
3322 | (9) (9) (Q) (7) | 519 | 10.2 |
3323 | (68) (6) (T) | 519 | 10.2 |
3324 | (6K) (6) (7) | 519 | 10.2 |
3325 | (6) (6) (Q) (J) | 518 | 10.2 |
3326 | (A) (Q) (7) (6) | 517 | 10.2 |
3327 | (J) (J) (7) (6) | 517 | 10.2 |
3328 | (896) (8) | 517 | 10.2 |
3329 | (A) (87) (6) | 517 | 10.1 |
3330 | (T) (T) (T) (Q) | 517 | 10.1 |
3331 | (K97) (6) | 516 | 10.1 |
3332 | (A) (86) (7) | 516 | 10.1 |
3333 | (Q) (86) (7) | 516 | 10.1 |
3334 | (J) (9) (8) (7) | 515 | 10.1 |
3335 | (T76) (8) | 515 | 10.1 |
3336 | (9) (9) (K) (7) | 514 | 10.1 |
3337 | (976) (9) | 514 | 10.1 |
3338 | (K76) (9) | 513 | 10.1 |
3339 | (6) (6) (Q8) | 513 | 10.1 |
3340 | (69) (6) (K) | 513 | 10.1 |
3341 | (A) (8) (76) | 512 | 10.1 |
3342 | (6) (6) (K7) | 512 | 10.1 |
3343 | (9) (9) (A) (7) | 512 | 10.0 |
3344 | (9) (9) (J) (6) | 512 | 10.0 |
3345 | (Q) (8) (76) | 511 | 10.0 |
3346 | (K) (87) (6) | 510 | 10.0 |
3347 | (8K6) (8) | 509 | 10.0 |
3348 | (T86) (7) | 509 | 10.0 |
3349 | (K) (86) (7) | 509 | 10.0 |
3350 | (7Q8) (7) | 509 | 10.0 |
3351 | (98) (7) (6) | 508 | 10.0 |
3352 | (K) (K) (K) (A) | 508 | 10.0 |
3353 | (7K8) (7) | 507 | 9.9 |
3354 | (T) (T) (7) (6) | 507 | 9.9 |
3355 | (K7) (K) (K) | 507 | 9.9 |
3356 | (Q) (87) (6) | 506 | 9.9 |
3357 | (69) (6) (A) | 506 | 9.9 |
3358 | (6) (6) (K) (Q) | 506 | 9.9 |
3359 | (9) (87) (6) | 505 | 9.9 |
3360 | (79) (7) (6) | 504 | 9.9 |
3361 | (69) (6) (8) | 504 | 9.9 |
3362 | (87) (8) (6) | 504 | 9.9 |
3363 | (K8) (K) (K) | 504 | 9.9 |
3364 | (68) (6) (J) | 503 | 9.9 |
3365 | (7) (7) (Q6) | 502 | 9.9 |
3366 | (9A) (9) (9) | 501 | 9.8 |
3367 | (6) (6) (K) (T) | 501 | 9.8 |
3368 | (8) (8) (K) (9) | 500 | 9.8 |
3369 | (K) (976) | 500 | 9.8 |
3370 | (A) (976) | 500 | 9.8 |
3371 | (6Q) (6) (7) | 500 | 9.8 |
3372 | (68) (6) (9) | 499 | 9.8 |
3373 | (6T) (6) (7) | 499 | 9.8 |
3374 | (7) (7) (J6) | 499 | 9.8 |
3375 | (96) (8) (7) | 499 | 9.8 |
3376 | (J) (J) (J) (K) | 498 | 9.8 |
3377 | (T87) (6) | 498 | 9.8 |
3378 | (9) (86) (7) | 498 | 9.8 |
3379 | (798) (7) | 498 | 9.8 |
3380 | (86) (8) (7) | 498 | 9.8 |
3381 | (T) (876) | 498 | 9.8 |
3382 | (A86) (7) | 498 | 9.8 |
3383 | (7) (7) (T) (9) | 497 | 9.8 |
3384 | (K) (8) (76) | 497 | 9.8 |
3385 | (K987) | 497 | 9.8 |
3386 | (97) (8) (6) | 497 | 9.8 |
3387 | (Q987) | 497 | 9.8 |
3388 | (6J) (6) (7) | 496 | 9.7 |
3389 | (6J9) (6) | 496 | 9.7 |
3390 | (K6) (K) (K) | 496 | 9.7 |
3391 | (6Q9) (6) | 495 | 9.7 |
3392 | (7) (7) (96) | 495 | 9.7 |
3393 | (J986) | 495 | 9.7 |
3394 | (Q) (976) | 495 | 9.7 |
3395 | (7) (7) (T6) | 494 | 9.7 |
3396 | (8) (8) (A) (9) | 494 | 9.7 |
3397 | (8) (8) (76) | 494 | 9.7 |
3398 | (9) (8) (76) | 493 | 9.7 |
3399 | (76) (7) (A) | 493 | 9.7 |
3400 | (J87) (6) | 491 | 9.6 |
3401 | (6T8) (6) | 491 | 9.6 |
3402 | (9) (9) (Q) (6) | 490 | 9.6 |
3403 | (6) (6) (T7) | 490 | 9.6 |
3404 | (76) (7) (9) | 490 | 9.6 |
3405 | (6) (6) (K) (J) | 490 | 9.6 |
3406 | (T) (T) (T) (9) | 489 | 9.6 |
3407 | (6) (6) (98) | 488 | 9.6 |
3408 | (J76) (8) | 488 | 9.6 |
3409 | (68) (6) (A) | 488 | 9.6 |
3410 | (6) (6) (Q7) | 487 | 9.6 |
3411 | (Q) (9) (8) (7) | 487 | 9.6 |
3412 | (9) (9) (A) (6) | 486 | 9.6 |
3413 | (6A9) (6) | 486 | 9.5 |
3414 | (6) (6) (A) (K) | 486 | 9.5 |
3415 | (67) (6) (T) | 486 | 9.5 |
3416 | (68) (6) (Q) | 485 | 9.5 |
3417 | (76) (7) (J) | 484 | 9.5 |
3418 | (6K9) (6) | 484 | 9.5 |
3419 | (9) (9) (6) (6) | 483 | 9.5 |
3420 | (6) (6) (A) (Q) | 483 | 9.5 |
3421 | (A87) (6) | 483 | 9.5 |
3422 | (78) (7) (6) | 483 | 9.5 |
3423 | (Q87) (6) | 482 | 9.5 |
3424 | (A76) (8) | 482 | 9.5 |
3425 | (9) (9) (K) (6) | 481 | 9.4 |
3426 | (Q86) (7) | 481 | 9.4 |
3427 | (J86) (7) | 481 | 9.4 |
3428 | (Q986) | 480 | 9.4 |
3429 | (Q76) (8) | 480 | 9.4 |
3430 | (A987) | 479 | 9.4 |
3431 | (76) (7) (8) | 479 | 9.4 |
3432 | (T976) | 478 | 9.4 |
3433 | (69) (6) (7) | 478 | 9.4 |
3434 | (K87) (6) | 478 | 9.4 |
3435 | (67) (6) (A) | 478 | 9.4 |
3436 | (8) (8) (T) (7) | 477 | 9.4 |
3437 | (K986) | 477 | 9.4 |
3438 | (6) (6) (J7) | 476 | 9.4 |
3439 | (6) (6) (97) | 476 | 9.4 |
3440 | (76) (7) (Q) | 476 | 9.3 |
3441 | (K86) (7) | 476 | 9.3 |
3442 | (6J8) (6) | 475 | 9.3 |
3443 | (7) (7) (J) (9) | 475 | 9.3 |
3444 | (T7) (T) (T) | 475 | 9.3 |
3445 | (76) (7) (K) | 472 | 9.3 |
3446 | (7) (7) (86) | 472 | 9.3 |
3447 | (7T6) (7) | 471 | 9.3 |
3448 | (K76) (8) | 471 | 9.2 |
3449 | (6K8) (6) | 470 | 9.2 |
3450 | (A) (876) | 470 | 9.2 |
3451 | (68) (6) (K) | 470 | 9.2 |
3452 | (J) (9) (8) (6) | 470 | 9.2 |
3453 | (68) (6) (7) | 469 | 9.2 |
3454 | (6A8) (6) | 468 | 9.2 |
3455 | (K) (9) (8) (7) | 468 | 9.2 |
3456 | (T) (9) (7) (6) | 468 | 9.2 |
3457 | (8) (8) (7) (7) | 467 | 9.2 |
3458 | (67) (6) (9) | 467 | 9.2 |
3459 | (67) (6) (J) | 467 | 9.2 |
3460 | (J7) (J) (J) | 467 | 9.2 |
3461 | (J) (876) | 466 | 9.1 |
3462 | (A) (9) (8) (7) | 464 | 9.1 |
3463 | (J976) | 460 | 9.0 |
3464 | (6) (6) (A) (J) | 460 | 9.0 |
3465 | (67) (6) (K) | 460 | 9.0 |
3466 | (9) (9) (8) (7) | 459 | 9.0 |
3467 | (Q) (876) | 458 | 9.0 |
3468 | (8) (8) (T) (6) | 457 | 9.0 |
3469 | (6) (6) (A) (T) | 457 | 9.0 |
3470 | (7A6) (7) | 456 | 9.0 |
3471 | (67) (6) (8) | 455 | 8.9 |
3472 | (6Q8) (6) | 455 | 8.9 |
3473 | (987) (6) | 454 | 8.9 |
3474 | (9J) (9) (9) | 454 | 8.9 |
3475 | (A986) | 454 | 8.9 |
3476 | (67) (6) (Q) | 453 | 8.9 |
3477 | (876) (8) | 453 | 8.9 |
3478 | (796) (7) | 452 | 8.9 |
3479 | (6A7) (6) | 451 | 8.9 |
3480 | (Q) (Q) (Q) (A) | 450 | 8.8 |
3481 | (9) (876) | 450 | 8.8 |
3482 | (7) (7) (T) (8) | 450 | 8.8 |
3483 | (Q) (9) (8) (6) | 449 | 8.8 |
3484 | (6) (6) (87) | 448 | 8.8 |
3485 | (T876) | 448 | 8.8 |
3486 | (976) (8) | 448 | 8.8 |
3487 | (8) (8) (J) (7) | 447 | 8.8 |
3488 | (698) (6) | 446 | 8.8 |
3489 | (K) (876) | 445 | 8.7 |
3490 | (986) (7) | 444 | 8.7 |
3491 | (7Q6) (7) | 443 | 8.7 |
3492 | (7J6) (7) | 443 | 8.7 |
3493 | (9) (9) (8) (6) | 443 | 8.7 |
3494 | (6T7) (6) | 442 | 8.7 |
3495 | (7K6) (7) | 442 | 8.7 |
3496 | (T) (T) (T) (K) | 441 | 8.7 |
3497 | (K) (9) (8) (6) | 441 | 8.7 |
3498 | (7) (7) (Q) (9) | 440 | 8.6 |
3499 | (8) (8) (9) (7) | 439 | 8.6 |
3500 | (K976) | 438 | 8.6 |
3501 | (J) (J) (J) (9) | 436 | 8.6 |
3502 | (Q976) | 436 | 8.6 |
3503 | (6Q7) (6) | 434 | 8.5 |
3504 | (J) (9) (7) (6) | 433 | 8.5 |
3505 | (8) (8) (6) (6) | 432 | 8.5 |
3506 | (Q7) (Q) (Q) | 430 | 8.5 |
3507 | (6J7) (6) | 430 | 8.4 |
3508 | (697) (6) | 429 | 8.4 |
3509 | (Q6) (Q) (Q) | 429 | 8.4 |
3510 | (786) (7) | 427 | 8.4 |
3511 | (A) (9) (8) (6) | 426 | 8.4 |
3512 | (6) (6) (T) (9) | 425 | 8.4 |
3513 | (8) (8) (A) (7) | 425 | 8.4 |
3514 | (6K7) (6) | 425 | 8.3 |
3515 | (8) (8) (Q) (7) | 425 | 8.3 |
3516 | (7) (7) (A) (9) | 424 | 8.3 |
3517 | (A976) | 424 | 8.3 |
3518 | (7) (7) (K) (9) | 424 | 8.3 |
3519 | (8) (8) (J) (6) | 423 | 8.3 |
3520 | (7) (7) (J) (8) | 423 | 8.3 |
3521 | (687) (6) | 423 | 8.3 |
3522 | (8T) (8) (8) | 420 | 8.3 |
3523 | (8A) (8) (8) | 419 | 8.2 |
3524 | (8) (8) (9) (6) | 418 | 8.2 |
3525 | (9Q) (9) (9) | 416 | 8.2 |
3526 | (9) (9) (7) (6) | 416 | 8.2 |
3527 | (7) (7) (A) (8) | 413 | 8.1 |
3528 | (Q) (Q) (Q) (9) | 413 | 8.1 |
3529 | (J876) | 413 | 8.1 |
3530 | (8) (8) (K) (7) | 412 | 8.1 |
3531 | (Q) (9) (7) (6) | 411 | 8.1 |
3532 | (8) (8) (A) (6) | 410 | 8.1 |
3533 | (J) (J) (J) (A) | 409 | 8.0 |
3534 | (T) (8) (7) (6) | 408 | 8.0 |
3535 | (T) (T) (T) (8) | 408 | 8.0 |
3536 | (7) (7) (9) (8) | 407 | 8.0 |
3537 | (T6) (T) (T) | 407 | 8.0 |
3538 | (98) (9) (9) | 404 | 7.9 |
3539 | (9K) (9) (9) | 404 | 7.9 |
3540 | (A876) | 403 | 7.9 |
3541 | (A) (A) (A) (9) | 403 | 7.9 |
3542 | (8) (8) (K) (6) | 400 | 7.9 |
3543 | (A) (9) (7) (6) | 400 | 7.8 |
3544 | (8) (8) (Q) (6) | 399 | 7.8 |
3545 | (K876) | 397 | 7.8 |
3546 | (K) (9) (7) (6) | 395 | 7.8 |
3547 | (6) (6) (J) (9) | 394 | 7.7 |
3548 | (97) (9) (9) | 394 | 7.7 |
3549 | (7) (7) (Q) (8) | 393 | 7.7 |
3550 | (7) (7) (K) (8) | 392 | 7.7 |
3551 | (K) (K) (K) (9) | 390 | 7.7 |
3552 | (A) (A) (A) (6) | 385 | 7.5 |
3553 | (6) (6) (T) (8) | 382 | 7.5 |
3554 | (7A) (7) (7) | 380 | 7.5 |
3555 | (J) (8) (7) (6) | 380 | 7.5 |
3556 | (8J) (8) (8) | 379 | 7.5 |
3557 | (6) (6) (Q) (9) | 378 | 7.4 |
3558 | (A) (A) (A) (8) | 373 | 7.3 |
3559 | (9876) | 372 | 7.3 |
3560 | (89) (8) (8) | 372 | 7.3 |
3561 | (T) (T) (T) (A) | 372 | 7.3 |
3562 | (Q876) | 371 | 7.3 |
3563 | (J6) (J) (J) | 371 | 7.3 |
3564 | (7) (7) (6) (6) | 370 | 7.3 |
3565 | (A) (8) (7) (6) | 363 | 7.1 |
3566 | (96) (9) (9) | 362 | 7.1 |
3567 | (J) (J) (J) (8) | 362 | 7.1 |
3568 | (A) (A) (A) (7) | 361 | 7.1 |
3569 | (Q) (8) (7) (6) | 361 | 7.1 |
3570 | (K) (8) (7) (6) | 360 | 7.1 |
3571 | (7) (7) (T) (6) | 360 | 7.1 |
3572 | (6) (6) (K) (9) | 358 | 7.0 |
3573 | (6) (6) (J) (8) | 357 | 7.0 |
3574 | (8K) (8) (8) | 357 | 7.0 |
3575 | (6) (6) (A) (9) | 353 | 6.9 |
3576 | (9) (9) (9) (T) | 353 | 6.9 |
3577 | (8) (8) (7) (6) | 352 | 6.9 |
3578 | (8Q) (8) (8) | 350 | 6.9 |
3579 | (7) (7) (J) (6) | 346 | 6.8 |
3580 | (9) (8) (7) (6) | 345 | 6.8 |
3581 | (87) (8) (8) | 342 | 6.7 |
3582 | (7) (7) (9) (6) | 342 | 6.7 |
3583 | (Q) (Q) (Q) (8) | 341 | 6.7 |
3584 | (6A) (6) (6) | 340 | 6.7 |
3585 | (7) (7) (8) (6) | 337 | 6.6 |
3586 | (7) (7) (A) (6) | 336 | 6.6 |
3587 | (6) (6) (Q) (8) | 335 | 6.6 |
3588 | (6) (6) (K) (8) | 335 | 6.6 |
3589 | (6) (6) (A) (8) | 332 | 6.5 |
3590 | (6) (6) (9) (7) | 331 | 6.5 |
3591 | (6) (6) (T) (7) | 330 | 6.5 |
3592 | (7T) (7) (7) | 329 | 6.5 |
3593 | (86) (8) (8) | 329 | 6.5 |
3594 | (6) (6) (9) (8) | 325 | 6.4 |
3595 | (7K) (7) (7) | 325 | 6.4 |
3596 | (6) (6) (A) (7) | 322 | 6.3 |
3597 | (7) (7) (K) (6) | 321 | 6.3 |
3598 | (T) (T) (T) (7) | 321 | 6.3 |
3599 | (6) (6) (J) (7) | 321 | 6.3 |
3600 | (7) (7) (Q) (6) | 320 | 6.3 |
3601 | (6) (6) (K) (7) | 318 | 6.2 |
3602 | (K) (K) (K) (8) | 316 | 6.2 |
3603 | (79) (7) (7) | 315 | 6.2 |
3604 | (6) (6) (Q) (7) | 313 | 6.1 |
3605 | (K) (K) (K) (6) | 310 | 6.1 |
3606 | (78) (7) (7) | 308 | 6.0 |
3607 | (6) (6) (8) (7) | 304 | 6.0 |
3608 | (7J) (7) (7) | 304 | 6.0 |
3609 | (7Q) (7) (7) | 304 | 6.0 |
3610 | (K) (K) (K) (7) | 300 | 5.9 |
3611 | (6K) (6) (6) | 297 | 5.8 |
3612 | (J) (J) (J) (7) | 292 | 5.7 |
3613 | (9) (9) (9) (J) | 287 | 5.6 |
3614 | (6Q) (6) (6) | 280 | 5.5 |
3615 | (6T) (6) (6) | 271 | 5.3 |
3616 | (76) (7) (7) | 270 | 5.3 |
3617 | (9) (9) (9) (8) | 264 | 5.2 |
3618 | (T) (T) (T) (6) | 263 | 5.2 |
3619 | (69) (6) (6) | 262 | 5.1 |
3620 | (68) (6) (6) | 256 | 5.0 |
3621 | (6J) (6) (6) | 252 | 4.9 |
3622 | (Q) (Q) (Q) (6) | 249 | 4.9 |
3623 | (67) (6) (6) | 248 | 4.9 |
3624 | (Q) (Q) (Q) (7) | 240 | 4.7 |
3625 | (8) (8) (8) (T) | 237 | 4.7 |
3626 | (9) (9) (9) (7) | 234 | 4.6 |
3627 | (9) (9) (9) (A) | 233 | 4.6 |
3628 | (8) (8) (8) (9) | 222 | 4.4 |
3629 | (9) (9) (9) (Q) | 222 | 4.4 |
3630 | (9) (9) (9) (6) | 215 | 4.2 |
3631 | (J) (J) (J) (6) | 208 | 4.1 |
3632 | (8) (8) (8) (J) | 199 | 3.9 |
3633 | (8) (8) (8) (6) | 188 | 3.7 |
3634 | (8) (8) (8) (7) | 185 | 3.6 |
3635 | (9) (9) (9) (K) | 183 | 3.6 |
3636 | (8) (8) (8) (A) | 183 | 3.6 |
3637 | (7) (7) (7) (T) | 167 | 3.3 |
3638 | (7) (7) (7) (8) | 161 | 3.2 |
3639 | (7) (7) (7) (9) | 161 | 3.2 |
3640 | (8) (8) (8) (Q) | 155 | 3.0 |
3641 | (7) (7) (7) (A) | 138 | 2.7 |
3642 | (8) (8) (8) (K) | 138 | 2.7 |
3643 | (7) (7) (7) (J) | 132 | 2.6 |
3644 | (7) (7) (7) (6) | 128 | 2.5 |
3645 | (6) (6) (6) (T) | 110 | 2.2 |
3646 | (7) (7) (7) (K) | 107 | 2.1 |
3647 | (6) (6) (6) (8) | 106 | 2.1 |
3648 | (7) (7) (7) (Q) | 106 | 2.1 |
3649 | (6) (6) (6) (9) | 104 | 2.0 |
3650 | (6) (6) (6) (A) | 99 | 1.9 |
3651 | (6) (6) (6) (7) | 95 | 1.9 |
3652 | (6) (6) (6) (K) | 87 | 1.7 |
3653 | (6) (6) (6) (Q) | 83 | 1.6 |
3654 | (6) (6) (6) (J) | 80 | 1.6 |
3655 | (A) (A) (A) (A) | 68 | 1.3 |
3656 | (K) (K) (K) (K) | 39 | 0.8 |
3657 | (Q) (Q) (Q) (Q) | 29 | 0.6 |
3658 | (J) (J) (J) (J) | 19 | 0.4 |
3659 | (9) (9) (9) (9) | 17 | 0.3 |
3660 | (T) (T) (T) (T) | 9 | 0.2 |
3661 | (8) (8) (8) (8) | 4 | 0.1 |
3662 | (7) (7) (7) (7) | 3 | 0.1 |
3663 | (6) (6) (6) (6) | 1 | 0.0 |
Estimated Equities appearing in the above tables are based upon the Adjusted Tallies over the 50 million deal simulation. I estimate that these hand equities are accurate within 0.3%. As many of the neighboring hand equities are quite close, this suggests that the above rankings are imprecise. However I wanted to present the entire set since (1) I have them and (2) an entire set of imprecise hand equities/rankings hopefully has some value.
My initial plan was to drill down on the hand equities of the top 100, say, hands appearing in the tables above. Like I did for short deck NLHE I was hoping to run many separate simulations of a specific starting hand (say AsAhKsKh) vs five random hands in one million deals in order to get more precise estimates of short deck omaha hand equities. Unfortunately, the runtime considerations of omaha simulations make this approach infeasible for me at the present time.
My initial plan was to drill down on the hand equities of the top 100, say, hands appearing in the tables above. Like I did for short deck NLHE I was hoping to run many separate simulations of a specific starting hand (say AsAhKsKh) vs five random hands in one million deals in order to get more precise estimates of short deck omaha hand equities. Unfortunately, the runtime considerations of omaha simulations make this approach infeasible for me at the present time.
Here are the top 25 Short Deck Omaha 6-Max starting hands based upon many separate simulations of each specific starting hand versus five other random hands over 1,000,000 deals. The equity results should be accurate to within 0.1%. (To remove any uncertainty on this issue, these simulations use the "new" short deck rules in which a flush beats a full house but a straight beats three-of-a-kind.)
The following table lists the number of deals out of the 1,000,000 which the specific starting hand wins (and where it is credited with 1/N if the hand is involved in a N-way chop). The estimated equity, of course, is simply the tally divided by 1,000,000.
Table 1: Best Short Deck Omaha 6-Max Starting Hands (based upon 1,000,000 deals involving each hand)
The following table lists the number of deals out of the 1,000,000 which the specific starting hand wins (and where it is credited with 1/N if the hand is involved in a N-way chop). The estimated equity, of course, is simply the tally divided by 1,000,000.
Table 1: Best Short Deck Omaha 6-Max Starting Hands (based upon 1,000,000 deals involving each hand)
___ Rank ___ | Starting Hand (suit-iso bucket) | ___Tally___ | Estimated Equity (%) |
---|---|---|---|
1 | (AK) (AK) | 330,160 | 33.0 |
2 | (AQ) (AQ) | 319,686 | 32.0 |
3 | (AJ) (AJ) | 312,623 | 31.3 |
4 | (AT) (AT) | 304,940 | 30.5 |
5 | (AJ) (AT) | 302,747 | 30.3 |
6 | (KQ) (KQ) | 302,130 | 30.2 |
7 | (AQ) (AJ) | 295,814 | 29.6 |
8 | (AQ) (AT) | 295,616 | 29.6 |
9 | (KJ) (KJ) | 293,949 | 29.4 |
10 | (AK) (A) (K) | 291,612 | 29.2 |
11 | (KJ) (QT) | 290,808 | 29.1 |
12 | (KT) (QJ) | 290,516 | 29.1 |
13 | (AJ) (QT) | 289,882 | 29.0 |
14 | (AT) (QJ) | 289,615 | 29.0 |
15 | (AK) (AT) | 288,882 | 28.9 |
16 | (AK) (AQ) | 288,810 | 28.9 |
17 | (AT) (KJ) | 288,303 | 28.8 |
18 | (AJ) (KT) | 288,185 | 28.8 |
19 | (AK) (AJ) | 288,066 | 28.8 |
20 | (KT) (KT) | 287,290 | 28.7 |
21 | (KQ) (JT) | 285,866 | 28.6 |
22 | (KJ) (KT) | 285,324 | 28.5 |
23 | (AJ) (KQ) | 284,820 | 28.5 |
24 | (AQ) (JT) | 284,722 | 28.5 |
25 | (AQ) (KJ) | 283,688 | 28.4 |
Just found this thread and you are an absolute legend thanks so much!
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