Let's say I'm playing 10 different games. For each game, I know the probability of winning, the probability of tying, and the probability of losing (each game has different probabilities).

From these values, I can calculate the probability of winning X games, the probability of losing X games, and the probability of tying X games (for X = 0 to 10).

I'm just trying to figure out the probability of winning *W* games, tying *T* games, and losing *L* games after playing all 10 games... and hopefully do better than O(3^n). For example, what is the probability of winning 7, losing 2, and tying 1?

Any ideas? Thanks!

Edit - here's some example data for if there were only 2 games:

Game 1:

- win: 23.3%
- tie: 1.1%
- lose: 75.6%

Game 2:

- win: 29.5%
- tie: 3.2%
- lose: 67.3%

Based on this, we can calculate the probability after playing 2 games of:

- 0 wins: 54.0%
- 1 win: 39.1%
- 2 wins: 6.9%

- 0 ties: 95.8%
- 1 tie: 4.2%
- 2 ties: 0.0%

- 0 losses: 8.0%
- 1 loss: 41.1%
- 2 losses: 50.9%

Based on these numbers, is there a generic formula for finding the probability of *W* wins, *T* ties, and *L* losses? The possible outcomes (W-L-T) would be:

- 2-0-0
- 1-1-0
- 1-0-1
- 0-1-1
- 0-2-0
- 0-0-2

areindependent? If not, how do they depend on each other? – JoshD Oct 3 '10 at 2:18