Super Double Bonus (SDB) and Super Aces Bonus (SAB) are both variations of Double Bonus. In “regular” Double Bonus, four aces get paid 160 for 1, four 2s-4s get paid 80 for 1, and four 5s-Ks get paid 50 for one.
Each of the variations we’re looking at today keeps that basic structure for the quads, with one exception each. In SDB, four Js-Ks receive 120 for 1 rather than 50 for 1 (and you receive more for the straight flush as well). In SAB, four aces receive a gigantic 400 for 1. In both games, the amount for the full house and flush is adjusted downward until it gets into the “acceptable” range. This means the pay schedule returns enough to attract the players, but not so much that the casinos are afraid of it. The two pay schedules discussed in this article are the highest allowed for these particular games. In many casinos, you’ll find lower pay schedules than these, but that won’t affect the discussion that follows.
| 9/5 Super | 8/5 Super | |||||
| Double Bonus | Aces Bonus | |||||
| Royal Flush | 800 | 800 | ||||
| Straight Flush | 80 | 60 | ||||
| Four Aces | 160 | 400 | ||||
| Four Js-Ks | 120 | 50 | ||||
| Four 2s-4s | 80 | 80 | ||||
| Four 5s-Ts | 50 | 50 | ||||
| Full House | 9 | 8 | ||||
| Flush | 5 | 5 | ||||
| Straight | 4 | 4 | ||||
| Three of a Kind | 3 | 3 | ||||
| Two Pair | 1 | 1 | ||||
| Jacks or Better | 1 | 1 | ||||
| Return | 99.69% | 99.94% | ||||
| Variance | 38.0 | 63.4 | ||||
The strategies for the two games are very similar. This is largely because they receive identical amounts for flushes, straights, and two pair — which are the three pay-schedule categories that matter most when it comes to strategy.
In today’s column, I’m going to present four hands that are played differently in the two games. Your job is to figure out both plays. Even if you have never played either game, you have two important clues to help you out:
- The plays are different. This is a HUGE clue.
- The plays are different because of the pay schedule.
- 5♣ 6♣ 7♣ 8♣ 9♥
- A♥ Qâ™ J♦ 9♣ 3â™
- Aâ™ Q♥ 8♦ 4♣ 3â™
- K♥ T♥ 8♦ 7♣ 6â™
Where dollar and cent amounts are indicated, it assumes you are playing for dollars, five coins at a time.
- There are only two reasonable plays here. The “chickens” keep the straight and the “gamblers” go for the straight flush. The different returns for quads has no bearing when you hold at least four cards of different ranks, so the determining factor must be that SDB returns more for the straight flush. In SDB, ‘5678’ is better by $2.87, and in SAB, 56789 is better by $1.39. Obviously neither play is close.
- With three unsuited high cards including an ace, the “standard” play in both Jacks or Better and Double Bonus is to discard the ace and hold the other two high cards. That’s the correct play in SDB by 10.6¢. In SAB, the much greater return for four aces means that you go for them more. In SAB, holding the single ace is the better play by 20.6¢.
- This is very similar to the last hand. In SDB you hold AQ by 2.6¢. In SAB, you hold the solitary ace by 19.6¢. And the reason, again, for the difference is the large amount you receive for four aces in SAB.
- This last hand is intentionally tricky, in that there are more than two choices. Holding ‘KT’ is obvious. Holding the inside straight, T876, is also an eligible choice. It takes some experience to know that inside straights with no high cards are worth considerably less than either single high cards or a single high card with a suited ten. Perhaps the hardest option to see is holding the king by itself. Some players can’t bring themselves to break up royal combinations no matter what the pay schedule. Once you realize that the king by itself is a viable option, then since SDB pays more for four kings, holding the single king in that game is the better play by 2.8¢. In SAB, the “normal” play of ‘KT’ is better by 3.0¢.
So how did you do? As a test, this wasn’t too difficult. But as a learning experience, there were some important things to remember. First of all, each game has its own strategy and those of you who use more-or-less the same strategy for most games are taking the worst of it. Second, sometimes the reason for the differences in the strategies is obvious once you closely examine the idiosyncrasies of the pay schedule.
Finally, I want to leave you with a hand that’s played the same in both games, assuming you are playing with the best pay schedule. K♥ Kâ™ 9♥ 9♦ 3♣. Although many seat-of-the-pants players will just hold the kings, in SAB, holding KK99 is better by 79¢. In SDB it’s a closer play because four kings pay so much, but KK99 is still better in that game by 19¢. If you find yourself playing a version of SDB where the full house pays only 40 or less instead of 45, that’s enough to change the correct play to KK.