On this page
Riverboat Roulette
Introduction
I first noticed Riverboat Roulette at the Golden Gate casino in Las Vegaas on July 7, 2014. It is played on a standard roulette wheel, except each number is assigned two colors. Various new bets are added on the second color of each number.
Rules
- The game is based on a standard 38-number roulette wheel.
- Each number is assigned two colors. For purposes of this explanation, I will call them the "outer colors" and "inner colors."
- The outer colors can be red, black, or green in the same numbers are conventional roulette.
- The inner colors are distributed as follows:
Color Distribution
Color Number White 8 Green 2 Red 2 Black 2 Yellow 3 Teal 3 Pink 4 Purple 4 Blue 5 Orange 5 Total 38 - On the betting layout there are fields to bet on the following colors: Yellow, Teal, Pink, Purple, Blue, and Orange. A bet on one of these colors will win if the ball lands in the chosen color before it lands in white. Any other outcome shall push. The following table shows how much each bet pays.
Pay Table
Color Pays Yellow 2 Teal 2 Pink 1.6 Purple 1.6 Blue 1.4 Orange 1.4 - There is also a single spin bet on white, which pays 3.5, and loses on any other outcome.
Analysis
The following table shows my analysis of the Yellow and Teal bets. The lower right cell reflects a house edge of 5.26%, the same as conventional double-zero roulette.Yellow and Teal Analysis
| Outcome | Pays | Numbers | Probability | Return |
|---|---|---|---|---|
| Win | 2 | 3 | 0.078947 | 0.157895 |
| Push | 0 | 27 | 0.710526 | 0.000000 |
| Loss | -1 | 8 | 0.210526 | -0.210526 |
| Total | 38 | 1.000000 | -0.052632 |
Note: If we define the house edge as the expected loss to bet resolved, as it is defined for place bets in craps, the house edge would be 18.18%.
The following table shows my analysis of the Pink and Purple bets. The lower right cell reflects a house edge of 4.21%.
Pink and Purple Analysis
| Outcome | Pays | Numbers | Probability | Return |
|---|---|---|---|---|
| Win | 1.6 | 4 | 0.105263 | 0.168421 |
| Push | 0 | 26 | 0.684211 | 0.000000 |
| Loss | -1 | 8 | 0.210526 | -0.210526 |
| Total | 38 | 1.000000 | -0.042105 |
Note: If we define the house edge as the expected loss to bet resolved, as it is defined for place bets in craps, the house edge would be 13.33%.
The following table shows my analysis of the Blue and Orange bets. The lower right cell reflects a house edge of 2.63%.
Blue and Orange Analysis
| Outcome | Pays | Numbers | Probability | Return |
|---|---|---|---|---|
| Win | 1.4 | 5 | 0.131579 | 0.184211 |
| Push | 0 | 25 | 0.657895 | 0.000000 |
| Loss | -1 | 8 | 0.210526 | -0.210526 |
| Total | 38 | 1.000000 | -0.026316 |
Note: If we define the house edge as the expected loss to bet resolved, as it is defined for place bets in craps, the house edge would be 7.69%.
The following table shows my analysis of the White bet. The lower right cell reflects a house edge of 5.26%, the same as conventional double-zero roulette.
White Analysis
| Outcome | Pays | Numbers | Probability | Return |
|---|---|---|---|---|
| Win | 3.5 | 8 | 0.210526 | 0.736842 |
| Loss | -1 | 30 | 0.789474 | -0.789474 |
| Total | 38 | 1.000000 | -0.052632 |
Since the White bet has no pushes, the house edge is 5.26% no matter how you calculate it.