I have a general probability question for those in the know that is mostly conceptual in nature.
Suppose three people, A,B, and C are competing for a prize that will be determined based on a lottery format. For whatever reason, it is determined that person A should have a 50% shot at the prize and persons B and C 25% each respectively. Two lottery formats are given in which person A gets to choose. 100 balls numbered 1-100 and half of the numbers represent player A, and one is drawn, or a 0-9 format drawing system with 10000 unique 4 digit numbers in which half represent player A.
My argument is player A should always choose the first format because even though the win rate over time is equal either way, the variance around the expected 50% win rate is larger in the second scenario over smaller sample sizes.
Is this logic correct?
Thanks
Suppose three people, A,B, and C are competing for a prize that will be determined based on a lottery format. For whatever reason, it is determined that person A should have a 50% shot at the prize and persons B and C 25% each respectively. Two lottery formats are given in which person A gets to choose. 100 balls numbered 1-100 and half of the numbers represent player A, and one is drawn, or a 0-9 format drawing system with 10000 unique 4 digit numbers in which half represent player A.
My argument is player A should always choose the first format because even though the win rate over time is equal either way, the variance around the expected 50% win rate is larger in the second scenario over smaller sample sizes.
Is this logic correct?
Thanks