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Rabbit Hunter
Rules
Top Software for Baccarat (56)
Sunset Station Pay Table
| Hand | Pays |
|---|---|
| Royal Flush | 500 |
| Straight Flush | 100 |
| Four of a Kind | 50 |
| Full House | 30 |
| Flush | 9 |
| Straight | 7 |
| Three of a Kind | 5 |
| Two Pairs | 2 |
| Pair of Tens or Better | 1 |
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- Rabbit Hunter offers a poker experience where players compete directly against the dealer. The aim is simple: to have a stronger five-card poker hand than the dealer.
- This game utilizes a standard deck of 52 playing cards. The rules for scoring and comparing hands follow conventional poker standards.
- Initially, the player places an Ante bet along with an optional Bonus Bet that matches their Ante.
- The dealer distributes five face-down cards to both the player and themselves. The player then reviews their cards and must choose one of the following actions:
- Fold, which means they forfeit both their Ante and any Bonus Bet made.
- Continue by placing a Play Bet equivalent to their Ante.
- Match and buy an additional card. To do this, the player must wager an amount equal to their Ante and pay an extra fee the same as their Ante to receive a sixth card. This fee does not constitute a bet; it serves as payment for the sixth card, which the player keeps in the chip rack. With the sixth card, the player chooses the best five cards out of the six received.
- Once all players have made their decisions, the dealer reveals their five cards and compares their hand against that of the player. The dealer needs to qualify with a hand that consists of at least an ace-high. If the dealer fails to qualify, the player's Ante bet is returned as a push, and only the Play Bet remains in play. If the dealer qualifies, then both the player's Ante and Play Bet are at stake.
- Should the player's hand surpass that of the dealer's, the player receives a payout at a 1 to 1 ratio on all active bets.
- However, if the dealer's hand is superior to the player's, the player loses all active bets.
- In case of a tie, all active bets result in a push.
- The Bonus Bet awards payouts based on the strength of the player's best five-card hand and is unaffected by the dealer's hand value (meaning a player can lose to the dealer but still win from a successful Bonus Bet hand). Literature from Shufflemaster, the game's distributor, shows six distinct payout tables; one in use at Sunset Station in Las Vegas is detailed as follows.
- There is also an additional Bad Beat side bet offering a payout of 10 to 1, which activates when both the player and dealer hold a pair of tens or better, resulting in one of them experiencing a 'bad beat.'
Strategy
The following table illustrates the likelihood of any specified hand overcoming the dealer's hand.Player's Hand Ranking
| Hand | Probability of Winning |
|---|---|
| Royal Flush | 0.99999923 |
| Straight Flush | 0.99999154 |
| 4 of a Kind | 0.99986456 |
| Full House | 0.99902423 |
| Flush | 0.99732124 |
| Straight | 0.99437621 |
| 3 of a Kind | 0.98184966 |
| 2PR – A up | 0.96762859 |
| 2PR – K up | 0.96061963 |
| 2 PR – Q up | 0.95422015 |
| 2 PR – J up | 0.94843014 |
| 2 PR – 10 up | 0.94324961 |
| 2 PR – 9 up | 0.93867855 |
| 2 PR – 8 up | 0.93471696 |
| 2 PR – 7 up | 0.93136485 |
| 2 PR – 6 up | 0.92862222 |
| 2 PR – 5 up | 0.92648906 |
| 2 PR – 4 up | 0.92496537 |
| 2 PR – 3 up | 0.92405116 |
| PR A | 0.90749377 |
| PR K | 0.87498846 |
| PR Q | 0.84248315 |
| PR J | 0.80997784 |
| PR 10 | 0.77747253 |
| PR 9 | 0.74496722 |
| PR 8 | 0.71246191 |
| PR 7 | 0.6799566 |
| PR 6 | 0.64745129 |
| PR 5 | 0.61494598 |
| PR 4 | 0.58244067 |
| PR 3 | 0.54993536 |
| PR 2 | 0.51743005 |
| AK High | 0.46899529 |
| AQ High | 0.41326531 |
| AJ High | 0.37323391 |
| A10 High | 0.34576138 |
| A9 High | 0.32790424 |
| A8 High | 0.31711146 |
| A7 High | 0.31122449 |
| A6 High | 0.30847724 |
| KQ High | 0.26236264 |
| KJ High | 0.23076923 |
| K10 High | 0.20918367 |
| K9 High | 0.19525118 |
| K8 High | 0.18681319 |
| K7 High | 0.18210361 |
| K6 High | 0.14717425 |
| K5 High | 0.15678964 |
| QJ High | 0.14854788 |
| Q10 High | 0.12715856 |
| Q9 High | 0.11322606 |
| Q8 High | 0.10478807 |
| Q7 High | 0.10007849 |
| Q6 High | 0.04866562 |
| Q5 High | 0.06966248 |
| J High | 0.05867347 |
| 10 High | 0.02845369 |
| 9 High | 0.01216641 |
| 8 High | 0.0043171 |
| 7 High | 0.00078493 |
Drawing from the probabilities listed in the previous table, the recommended strategy by Elliot Frome is as follows, assuming the player has opted for the Bonus Bet.
Play and Buy the Card when:
- The player holds a Straight Flush that is also a 4-Card Royal.
- The player has a Flush that consists of either a 4-Card Straight Flush or a 4-Card Inside Straight Flush.
- The player has a Straight that aligns with either a 4-Card Straight Flush or a 4-Card Inside Straight Flush.
- Player has Three of a Kind
- Player has Two Pair
- Player has a Pair
- Even if the player holds nothing more than a 4-Card Straight Flush, 4-Card Inside Straight Flush, 4-Card Flush, 4-Card Straight, or 4-Card Inside Straight.
Fold when:
If the player has an A-8 or lower and does not have a hand that qualifies for Play/Buy.
Play and not Buy when:
Any other hand
Odds
According to Elliot Frome's mathematics report, the overall payback percentage stands at 98.89%. This figure presumably reflects the return rate in relation to the total amount wagered. Consequently, the inherent risk amounts to 100% - 98.89% = 1.11%. The report also specifies that the average number of units wagered is 3.2411. This leads to an estimated expected loss per single unit of 1.11% multiplied by 3.2411, equating to approximately 3.61%. If we define the house edge according to the expected loss compared to the cumulative Ante and Bonus wagers, it amounts to 3.61% divided by 2, resulting in an edge of 1.80%.
Elliot does not discuss the odds when the player opts out of the Bonus Bet. Nevertheless, Discount Gambling he asserts that making the Bonus Bet provides a 136% advantage for the player; thus, it should always be taken.
Bad BeatElliot's report fails to mention the Bad Beat bet, prompting me to perform my calculations. My assessment yields that the chances of obtaining a pair of tens or better are 23.878% with five cards, escalating to 38.104% with six cards. According to Discount Gambling the player successfully makes the raise bet 47% of the time, leading to a probability of winning the Bad Beat bet of 7.2981%. The resulting return table for the Bad Beat indicates a house edge of 19.72%. While this is admittedly a rough calculation, it is sufficient to demonstrate that it is generally not a favorable bet.
Bad Beat
| Event | Pays | Probability | Return |
|---|---|---|---|
| Win | 10 | 0.072981 | 0.729812 |
| Loss | -1 | 0.927019 | -0.927019 |
| Total | 1.000000 | -0.197206 |
Acknowledgement
Typically, I prefer to conduct my calculations. However, a combinatorial analysis would necessitate examining 167,439,136,344,480 poker hands, requiring considerable computational resources and time. Thankfully, Shufflemaster offered their mathematical report, prepared by mathematician Elliot Frome, to alleviate me of this task. This report is grounded in Elliot's findings.
Outside Links
Discount Gambling There exists a dedicated page for the game, although it features a different payout table.