Here is a set of numbered balls used for a game:
To play the game, the balls are mixed up and two balls are randomly picked out together. For example:
The numbers on the balls are added together: $4 + 5 = 9$
If the total is even, you win. If the total is odd, you lose.
How can you decide whether the game is fair?
Here are three more sets of balls:
Which set would you choose to play with, to maximise your chances of winning?
What proportion of the time would you expect to win each game?
You may wish to look at the problem Odds and Evens Made Fair to explore whether it is possible to change the number of balls to make the game fair.