(bigmick22 @ Mar. 06 2009,16:09) a scam scenario

(jb8 @ Mar. 06 2009,17:50) but the reality is if I walk up when there are 2 cards remaining, and offer to take the one you don't choose we both have a 50-50 shot.

(jb8 @ Mar. 08 2009,10:35) I would honestly be interested to hear the opinion of a top notch card player like Doyle Brunson, someone with card and gambling and statistic smarts.

Anyways thanks Tomcat for posting something to make us think a little bit!

Consider the simple scenario of rolling two fair six-sided dice, labelled die 1 and die 2. Define the following three events:

A: Die 1 lands on 3.
B: Die 2 lands on 1.
C: The dice sum to 8.
The prior probability of each event describes how likely the outcome is before the dice are rolled, without any knowledge of the roll's outcome. For example, die 1 is equally likely to fall on each of its 6 sides, so P(A) = 1/6. Similarly P(B) = 1/6. Likewise, of the 6 × 6 = 36 possible ways that a pair of dice can land, just 5 result in a sum of 8 (namely 2 and 6, 3 and 5, 4 and 4, 5 and 3, and 6 and 2), so P© = 5/36.

Some of these events can both occur at the same time; for example events A and C can happen at the same time, in the case where die 1 lands on 3 and die 2 lands on 5. This is the only one of the 36 outcomes where both A and C occur, so its probability is 1/36. The probability of both A and C occurring is called the joint probability of A and C and is written , so . On the other hand, if die 2 lands on 1, the dice cannot sum to 8, so .

Now suppose we roll the dice and cover up die 2, so we can only see die 1, and observe that die 1 landed on 3. Given this partial information, the probability that the dice sum to 8 is no longer 5/36; instead it is 1/6, since die 2 must land on 5 to achieve this result. This is called the conditional probability, because it is the probability of C under the condition that A is observed, and is written P(C | A), which is read "the probability of C given A." Similarly, P(C | B) = 0, since if we observe die 2 landed on 1, we already know the dice can't sum to 8, regardless of what the other die landed on.

On the other hand, if we roll the dice and cover up die 2, and observe die 1, this has no impact on the probability of event B, which only depends on die 2. We say events A and B are statistically independent or just independent and in this case


In other words, the probability of B occurring after observing that die 1 landed on 3 is the same as before we observed die 1.

Intersection events and conditional events are related by the formula:


In this example, we have:


As noted above, , so by this formula:


On multiplying across by P(A),


In other words, if two events are independent, their joint probability is the product of the prior probabilities of each event occurring by itself.

(jb8 @ Mar. 08 2009,04:21) Too bad I'm not smart enough to figure out how to pull a partial quote from a post