Hit or stay on 16

#1
What is the mathematical statistic of hitting 16 against 7 through Ace?
What percent will you win or push by hitting it?

What percent will you win or push by not hitting it?

Can anyone direct me to a site which publishes such stats?
 

iCountNTrack

Well-Known Member
#2
Ace High said:
What is the mathematical statistic of hitting 16 against 7 through Ace?
What percent will you win or push by hitting it?

What percent will you win or push by not hitting it?

Can anyone direct me to a site which publishes such stats?
There ya go, i only posted the single deck values and S17, but you can get them for any number of cards

http://code.google.com/p/blackjack-combinatorial-analyzer/downloads/list

Code:
///////1 deck, S17//////////
********************************************
player's Hand  10,6
dealer's upCard  7
 
player's probabilities for standing
p_-1 = 0.741662210131
p_0 = 0
p_+1= 0.258337789869
p_+1.5 = 0
EV for standing= -0.483324420261 ± 0.875441320009
 
player's probabilities for doubling
p_-2 = 0.657943433709
p_0 = 0.060306641789
p_+2= 0.281749924502
EV for doubling= -0.752387018413 ± 1.78680922523
 
player's probabilities for hitting
p_-1 = 0.657943433709
p_0 = 0.060306641789
p_+1= 0.281749924502
EV for hitting= -0.376193509207 ± 0.893404612615

************************************************

player's Hand  10,6
dealer's upCard  8
 
player's probabilities for standing
p_-1 = 0.76350326193
p_0 = 0
p_+1= 0.23649673807
p_+1.5 = 0
EV for standing= -0.527006523861 ± 0.849861237973
 
player's probabilities for doubling
p_-2 = 0.681168316615
p_0 = 0.0624859167129
p_+2= 0.256345766672
EV for doubling= -0.849645099887 ± 1.74016077918
 
player's probabilities for hitting
p_-1 = 0.681168316615
p_0 = 0.0624859167129
p_+1= 0.256345766672
EV for hitting= -0.424822549943 ± 0.870080389589

**********************************************

player's Hand  10,6
dealer's upCard  9
 
player's probabilities for standing
p_-1 = 0.769615756767
p_0 = 0
p_+1= 0.230384243233
p_+1.5 = 0
EV for standing= -0.539231513534 ± 0.842157571249
 
player's probabilities for doubling
p_-2 = 0.708318244314
p_0 = 0.0626698865513
p_+2= 0.229011869135
EV for doubling= -0.958612750359 ± 1.68237393247
 
player's probabilities for hitting
p_-1 = 0.708318244314
p_0 = 0.0626698865513
p_+1= 0.229011869135
EV for hitting= -0.47930637518 ± 0.841186966233

************************************************

player's Hand  10,6
dealer's upCard  10
 
player's probabilities for standing
p_-1 = 0.790130953287
p_0 = 0
p_+1= 0.209869046713
p_+1.5 = 0
EV for standing= -0.580261906574 ± 0.814429935464
 
player's probabilities for doubling
p_-2 = 0.662971292784
p_0 = 0.0579720249632
p_+2= 0.197424029191
EV for doubling= -1.01272718025 ± 1.58037894169
 
player's probabilities for hitting
p_-1 = 0.744603945845
p_0 = 0.0579720249632
p_+1= 0.197424029191
EV for hitting= -0.547179916654 ± 0.801637146

***********************************************

player's Hand  10,6
dealer's upCard  1
 
player's probabilities for standing
p_-1 = 0.879580663876
p_0 = 0
p_+1= 0.120419336124
p_+1.5 = 0
EV for standing= -0.759161327752 ± 0.650902510708
 
player's probabilities for doubling
p_-2 = 0.501690908078
p_0 = 0.0435060431592
p_+2= 0.148680599783
EV for doubling= -1.01214306557 ± 1.37228819686
 
player's probabilities for hitting
p_-1 = 0.807813357058
p_0 = 0.0435060431592
p_+1= 0.148680599783
EV for hitting= -0.659132757275 ± 0.722521947852
10,6 vs 10 is a very close call especially for mulitple decks for examples for 6D, S17
Code:
player's Hand  10,6
dealer's upCard  10
 
player's probabilities for standing
p_-1 = 0.788304231586
p_0 = 0
p_+1= 0.211695768414
p_+1.5 = 0
EV for standing= -0.576608463173 ± 0.817020611856
 
player's probabilities for doubling
p_-2 = 0.680144821752
p_0 = 0.0551878170108
p_+2= 0.186997458325
EV for doubling= -1.06396462977 ± 1.55377549531
 
player's probabilities for hitting
p_-1 = 0.757814724664
p_0 = 0.0551878170108
p_+1= 0.186997458325
EV for hitting= -0.57081726634 ± 0.786752713016
 
#3
Ace High said:
What is the mathematical statistic of hitting 16 against 7 through Ace?
What percent will you win or push by hitting it?

What percent will you win or push by not hitting it?

Can anyone direct me to a site which publishes such stats?
You push 0% by not hitting. I hope that helps.:rolleyes:
 
#4
Ace High said:
What is the mathematical statistic of hitting 16 against 7 through Ace?
What percent will you win or push by hitting it?

What percent will you win or push by not hitting it?

Can anyone direct me to a site which publishes such stats?
Its not even close. Just trust correct basic strategy, which we are guessing you do not know. zg
 

Coach R

Well-Known Member
#6
Ace High said:
What is the mathematical statistic of hitting 16 against 7 through Ace?
What percent will you win or push by hitting it?

What percent will you win or push by not hitting it?

Can anyone direct me to a site which publishes such stats?
Just follow the basic strategy charts. What makes the difference what the odds are of the dealer busting? it's all calculated in basic strat. If you stand on a 16, you're not betting that's enough to beat the dealer, you're betting the dealer will bust. Your odds of winning by standing on a 16 vs. a dealers 7, are the exact same odds of winning by standing on an 11 (5-6). You can't win unless the dealer bust.
Pushing is impossible by standing on 16
 

BJLFS

Well-Known Member
#7
Coach R said:
Just follow the basic strategy charts. What makes the difference what the odds are of the dealer busting? it's all calculated in basic strat. If you stand on a 16, you're not betting that's enough to beat the dealer, you're betting the dealer will bust. Your odds of winning by standing on a 16 vs. a dealers 7, are the exact same odds of winning by standing on an 11 (5-6). You can't win unless the dealer bust.
Pushing is impossible by standing on 16
Also the reason you sometimes would hit on a 16 vs dealer 10 is so you will lose less, not to win.
 

iCountNTrack

Well-Known Member
#8
Coach R said:
Just follow the basic strategy charts. What makes the difference what the odds are of the dealer busting? it's all calculated in basic strat. If you stand on a 16, you're not betting that's enough to beat the dealer, you're betting the dealer will bust. Your odds of winning by standing on a 16 vs. a dealers 7, are the exact same odds of winning by standing on an 11 (5-6). You can't win unless the dealer bust.
Pushing is impossible by standing on 16
I am sorry but this is not true, the odds are different

16 vs 6
player's probabilities for standing
p_-1 = 0.589511449401
p_0 = 0
p_+1 = 0.410488550599
p_+1.5 = 0
EV for standing= -0.179022898802 ± 0.983844907343

***********************************************
11 vs 5
player's probabilities for standing
p_-1 = 0.566326835062
p_0 = 0
p_+1= 0.433673164938
p_+1.5 = 0
EV for standing= -0.132653670123 ± 0.991162450763


Basic strategy takes into account all possible combinations of playerHand/dealerHand , bust rate of the dealer is mythical figure used by scam system promoters
 
#9
iCountNTrack said:
I am sorry but this is not true, the odds are different

16 vs 6
player's probabilities for standing
p_-1 = 0.589511449401
p_0 = 0
p_+1 = 0.410488550599
p_+1.5 = 0
EV for standing= -0.179022898802 ± 0.983844907343

***********************************************
11 vs 5
player's probabilities for standing
p_-1 = 0.566326835062
p_0 = 0
p_+1= 0.433673164938
p_+1.5 = 0
EV for standing= -0.132653670123 ± 0.991162450763


Basic strategy takes into account all possible combinations of playerHand/dealerHand , bust rate of the dealer is mythical figure used by scam system promoters
I hope you realize that you did 11 and 16 v 5 and 6 respectively, not 7 as was the situation in question. Why didn't you site 11 and 16 against the same upcard?
 

Coach R

Well-Known Member
#10
tthree said:
I hope you realize that you did 11 and 16 v 5 and 6 respectively, not 7 as was the situation in question. Why didn't you site 11 and 16 against the same upcard?
I noticed that too, I think some people look way too deep for some kind of a quotion, or mathmatic formula to make something easy look complex. The dealer is either going to bust or not, that's why counters count, and understand the best times to do certain things. It doesn't matter if you have 4,7,9,12,or 16, you can't win if the dealer doesn't bust. There is a very long and complicated equation that explains why, and how gravity affects objects of all sizes, shapes, and weight. The bottom line is, if you throw a ball in the sky, it is going to drop.
 

iCountNTrack

Well-Known Member
#11
tthree said:
I hope you realize that you did 11 and 16 v 5 and 6 respectively, not 7 as was the situation in question. Why didn't you site 11 and 16 against the same upcard?
It doesnt make a difference it is still diferrent see below:

11 vs 6
player's probabilities for standing
p_-1 = 0.574852433669
p_0 = 0
p_+1= 0.425147566331
p_+1.5 = 0
EV for standing= -0.149704867338 ± 0.988730728103
*****************************
16 vs 7
player's probabilities for standing
p_-1 = 0.741662210131
p_0 = 0
p_+1= 0.258337789869
p_+1.5 = 0
EV for standing= -0.483324420261 ± 0.875441320009

the odds will always be diferrent because they depend on BOTH the players's hand and the dealer's upCard
 
#13
iCountNTrack said:
It doesnt make a difference it is still diferrent see below:

11 vs 6
player's probabilities for standing
p_-1 = 0.574852433669
p_0 = 0
p_+1= 0.425147566331
p_+1.5 = 0
EV for standing= -0.149704867338 ± 0.988730728103
*****************************
16 vs 7
player's probabilities for standing
p_-1 = 0.741662210131
p_0 = 0
p_+1= 0.258337789869
p_+1.5 = 0
EV for standing= -0.483324420261 ± 0.875441320009

the odds will always be diferrent because they depend on BOTH the players's hand and the dealer's upCard
You did it again, you used different dealer upcards for the 2 situations. You are comparing apples to oranges.
 

Cardcounter

Well-Known Member
#14
Ace High said:
What is the mathematical statistic of hitting 16 against 7 through Ace?
What percent will you win or push by hitting it?

What percent will you win or push by not hitting it?

Can anyone direct me to a site which publishes such stats?
Hitting a 16 vs a 7 is significantly better than staying. Hitting a 16 vs a 10 is only marginally better.

With 16 you are going to lose most of your hands no matter how you play it you are going to bust the hand 62% if you hit it. But the 38% of the time that you draw a hand you will be much better off especially if drawing against a 7.

If you don't hit 16 against a 7-A ace the dealer will make a hand 75% of the time on average with those hands and beat you 80% with an ace. You will win 20%-25% of the time if you don't hit. There will be a zero percent chance of a push because the dealer must draw to 17 or higher.
 

iCountNTrack

Well-Known Member
#15
tthree said:
You did it again, you used different dealer upcards for the 2 situations. You are comparing apples to oranges.
Ah, I misunderstood the poster's point i thought he meant 11 vs 5 or 6, he meant 11 composed of a 5 and 6. Nevertheless, the odds will still be different because as i have mentioned they depend on BOTH the dealer upCard and the player hand.

11 vs 7
player's probabilities for standing
p_-1 = 0.744468761037
p_0 = 0
p_+1= 0.255531238963
p_+1.5 = 0
EV for standing= -0.488937522075 ± 0.872318806118
*********************************************************
16 vs 7
player's probabilities for standing
p_-1 = 0.741662210131
p_0 = 0
p_+1= 0.258337789869
p_+1.5 = 0
EV for standing= -0.483324420261 ± 0.875441320009

There is no systematic way to "explain" optimum decisions. Some playing decisions will sometime look weird, that is because most of the time we are overlooking some cases. A combinatorial analysis takes care of that by enumerating all possible outcomes.
 
#16
iCountNTrack said:
Ah, I misunderstood the poster's point i thought he meant 11 vs 5 or 6, he meant 11 composed of a 5 and 6. Nevertheless, the odds will still be different because as i have mentioned they depend on BOTH the dealer upCard and the player hand.

11 vs 7
player's probabilities for standing
p_-1 = 0.744468761037
p_0 = 0
p_+1= 0.255531238963
p_+1.5 = 0
EV for standing= -0.488937522075 ± 0.872318806118
*********************************************************
16 vs 7
player's probabilities for standing
p_-1 = 0.741662210131
p_0 = 0
p_+1= 0.258337789869
p_+1.5 = 0
EV for standing= -0.483324420261 ± 0.875441320009

There is no systematic way to "explain" optimum decisions. Some playing decisions will sometime look weird, that is because most of the time we are overlooking some cases. A combinatorial analysis takes care of that by enumerating all possible outcomes.
Thanks. I knew there would be some difference but also knew it would be fairly insignificant. Your numbers confirm this.
 
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