What mathematics quantifies the edge from games holding only on dealer suited naturals or 678 non-busted hands?

[James108]

The edge in games that hold only on dealer suited naturals or 678 non-busted hands can be quantified by analyzing the probability of the dealer busting or having a hand lower than the player's hand. In games where the dealer holds only on suited naturals (e.g., a suited Blackjack), the house edge can be reduced by approximately 0.2%.

 

[CR7]

In games where the dealer holds only on suited naturals or 678 non-busted hands, much of the strategy revolves around understanding the probabilities of different outcomes based on the dealer's hand. When the dealer is required to hold only on suited naturals, it impacts the player's decisions and the potential outcomes significantly.

By reducing the dealer's options to holding only on specific hands like suited naturals or 678 non-busted hands, the player gains a slight advantage in certain situations. This advantage can be quantified by comparing the probabilities of different outcomes under these specific rules compared to standard blackjack rules where the dealer may hit on any hand totaling 16 or lower.

Analyzing the probabilities of various outcomes under these specific rules allows players to adjust their strategy accordingly. This can lead to a slight reduction in the house edge, providing a more favorable playing environment for the player.

In conclusion, by understanding the probabilities and adjusting strategies accordingly in games where the dealer holds only on suited naturals or 678 non-busted hands, players can potentially reduce the house edge and improve their chances of winning.