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Craps Probability Solution

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There are 6 ways to roll a 7 out of 36 possible outcomes, so P(7) = 6/36 ... The 1.4% edge they enjoy is all they need to get rich because of the huge volume of play ... – PowerPoint PPT presentation

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Title: Craps Probability Solution


1
Craps Probability Solution
  • Or
  • More than you ever wanted to know about
    conditional probability!

2
Ways to Win
  • There are three ways to win the game
  • Roll a 7 on the comeout roll
  • Roll an 11 on the comeout
  • Roll a point (4, 5, 6, 8, 9, 10) on the comeout
    and roll it again before a 7 comes up
  • These three ways are mutually exclusive, so find
    each probability and add to get the overall
    probability of winning.
  • This is the disjoint or case

3
Winning on the Comeout Roll
  • There are 6 ways to roll a 7 out of 36 possible
    outcomes, so P(7) 6/36
  • There are 2 ways to roll an 11, so P(11) 2/36
  • So P(win on comeout) 6/36 2/36 8/36

4
Make a Point and Win
  • Consider the probabilities involved in rolling a
    4 on the comeout and then rolling another 4 to
    win.
  • Since this is an independent and problem, we
    multiply the appropriate probabilities
  • P(4 AND 4 before 7) P(4) x P(4 before 7)
  • P(4) is easy there are 3 ways to roll a 4, so
    P(4) 3/36
  • Now find P(4 before 7) and multiply by 3/36
  • That will give P(win by making a point of 4)
  • We will then do the same for the other 5 points

5
P(4 before 7)
  • There are three game-relevant outcomes on each
    roll
  • Roll another 4 and win P(4) 3/36
  • Roll a 7 and lose P(7) 6/36
  • Roll any other number P(not 4 or 7) 27/36
  • 1 (3/36 6/36) 27/36
  • We are finding P(win), so assume we roll anything
    but a 7.
  • That means we win on the first roll (after the
    comeout) OR the second roll OR the third roll
    etc.
  • Since these are disjoint events, we add
    probabilities

6
P(4 before 7) Continued
  • The math we just described looks like this
  • But that is just an infinite series with a first
    term of 3/36 and a common ratio of 27/36
  • Recall from your study of Sequences and Series
    that there is a formula for adding such a series
  • So the sum (and the probability we want) is

7
A Simpler Approach
  • Notice that after we established the point of 4,
    we no longer cared about any outcome other than 4
    or 7
  • The basic definition of probability is the number
    of ways to succeed divided by the number of
    possible outcomes (ways to succeed plus ways to
    fail)
  • If we ignore the non-4s and non-7s, then there
    are three ways to succeed (roll a 4) and 6 ways
    to fail (roll a 7), so P(4) 3/(36) 3/9
  • Thats the same result we got with so much effort!

8
P(4 before 7) Concluded
  • So we have found that P(4 before 7) 3/9
  • Recall that we know P(4) 3/36 and we were
    trying to evaluate
  • P(4 AND 4 before 7) P(4) x P(4 before 7)
  • So the probability of rolling a 4 and then making
    another 4 before rolling a 7 is
  • Now we need the same calculation for the other 5
    possible points

9
Probabilities of Other Points
  • P(5) x P(5 before 7) 4/36 x 4/10
  • There are 4 ways to roll a 5 and 6 ways to roll a
    7
  • P(6) x P(6 before 7) 5/36 x 5/11
  • Then we can argue by symmetry that
  • P(8) x (8 before 7) 5/36 x 5/11
  • P(9) x (9 before 7) 4/36 x 4/10
  • P(10) x (10 before 7) 3/36 x 3/9

10
Putting It All Together
  • Now lets add the probabilities of the following
    8 disjoint events in Craps
  • Roll a 7 6/36
  • Roll an 11 2/36
  • Roll a 4 and another 4 3/36 x 3/9
  • Roll a 5 and another 5 4/36 x 4/10
  • Roll a 6 and another 6 5/36 x 5/11
  • Roll a 8 and another 8 5/36 x 5/11
  • Roll a 9 and another 9 4/36 x 4/10
  • Roll a 10 and another 10 3/36 x 3/9
  • Add all these terms to get P(win) .493

11
The Only Fair Bet in the House!
  • So your probability of winning at Craps is 49.3
    and the house has a 50.7 chance.
  • The 1.4 edge they enjoy is all they need to get
    rich because of the huge volume of play
  • Theres one more bet (that they DONT advertise)
    that actually pays mathematically true odds!
  • After the comeout roll and you have established a
    point (assume you did not win or lose on the
    comeout), the odds against making the point come
    from the probabilities we just found.
  • For a 4 or 10, P(win) 3/9 or 1/3, so odds are
    21 against you
  • For a 5 or 9, P(win) 4/10 or 2/5, so odds are
    32 against you
  • For a 6 or 10, P(win) 5/11, so odds are 65
    against you
  • They will now allow you to make a side bet
    (called taking odds) that pays properly if you
    win
  • For a 4 or 10, bet an extra 1 (or multiple)
    they pay 2 if you win (and give you back your
    1)
  • For a 5 or 9, bet an extra 2 they pay 3 if you
    win (and give back)
  • For a 6 or 8, bet an extra 5 they pay 6 if you
    win (and give back)
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