In a message dated 1/12/2007 10:06:29 A.M. Pacific Standard Time,
dennis.florence@worldnet.att.net writes:

For you math wizards out there. I know this is not a positive game,
but you take a ride on a roller coaster with plenty of dips and some
rises. Were I to choose 9'6 DDB to play what is the optimum bankroll
to start to assure( within reason) that I could have a $15K gain
before completely wiping out. If there is such a bankroll what can
you say about the number of hands it would take to realize the gain.
Conversely if the answer is there is no such bankroll start short of
infinity, then what bankroll would give me the best bang for my buck
i.e. $80K or so Denny
......................................

Ok, I'll bite. I'm no math wizard but I remember the formula as being
(((bankroll/rsbait*.9898)=-.1((abs)infinity)) I'm not sure about the nested
parentheses because I forgot. Dr. Michio Kaku sent me the formula but he's not a
video poker player.

On my own I figured given $1 single line, 3000*.9898=return per hr, which
would be -$30.60 I don't know if that will come out to +$15k somewhere from here
to infinity but I'm sure any swank hotel in Vegas will send a limo to pick
you up at the airport if $80k bankroll.
HTH
JT

[Non-text portions of this message have been removed]

In a message dated 1/12/2007 10:06:29 A.M. Pacific Standard Time,
dennis.florence@... writes:

For you math wizards out there. I know this is not a positive

game,

but you take a ride on a roller coaster with plenty of dips and

some

rises. Were I to choose 9'6 DDB to play what is the optimum

bankroll

to start to assure( within reason) that I could have a $15K gain
before completely wiping out. If there is such a bankroll what

can

you say about the number of hands it would take to realize the

gain.

Conversely if the answer is there is no such bankroll start short

of

infinity, then what bankroll would give me the best bang for my

buck

i.e. $80K or so Denny
......................................

Ok, I'll bite. I'm no math wizard but I remember the formula as

being

(((bankroll/rsbait*.9898)=-.1((abs)infinity)) I'm not sure about

the nested

parentheses because I forgot. Dr. Michio Kaku sent me the formula

but he's not a

video poker player.

On my own I figured given $1 single line, 3000*.9898=return per

hr, which

would be -$30.60 I don't know if that will come out to +$15k

somewhere from here

to infinity but I'm sure any swank hotel in Vegas will send a

limo to pick

you up at the airport if $80k bankroll.
HTH
JT

Sir: This was not intended to be a smart ass question, but a real

world one for me. By the way Wynn already provides me all the limo
service I need when I am in Vegas. Now can anyone else respond with
a straight answer in the "King's English" Thank you. Denny

For you math wizards out there. I know this is not a positive

game,

but you take a ride on a roller coaster with plenty of dips and

some

rises. Were I to choose 9'6 DDB to play what is the optimum

bankroll

to start to assure( within reason) that I could have a $15K gain
before completely wiping out.

...

> Sir: This was not intended to be a smart ass question, but a

real

world one for me. By the way Wynn already provides me all the limo
service I need when I am in Vegas. Now can anyone else respond

with

a straight answer in the "King's English" Thank you. Denny

I suspect the reason you got the response you got is that the
question really does appear to be a "smart ass" question. There is no
bankroll that can "assure" you (I'm not what you mean by "within
reason") of ever being $15K ahead.

If you are seeking an improved chance of reaching your goal on a 99%
payback machine then a high volatile game like DDB is your best bet,
but the more you play (the larger your bankroll) the less likely you
will ever be $15K ahead.

Dick