Final answer:
Without specific information about the 'Distribution Game', it is impossible to determine the starting quantity of products. For the raffle ticket pricing, the break-even price is calculated based on the total prize value and the number of tickets sold.
Step-by-step explanation:
The student's question does not provide enough context about the 'Distribution Game' to allow for a definitive answer regarding how many bottles of each product one should start with. Without specific details about the rules and objectives of the game, it's not possible to determine whether the correct answer would be A) 100 of each product, B) 500 of each product, C) 1,000 of each product, or D) 5,000 of each product. However, if the question refers to establishing a probability distribution in a business scenario like the one described for the baker deciding on the number of muffin batches, then the starting quantity would depend on the expected demand based on the probability distribution derived from observation or data.
For question 81 regarding the fair price of a raffle ticket, the calculation to determine the break-even price takes into account the total value of the prizes and the number of tickets. The combined value of the prizes is calculated as (250 prizes of $5) + (50 prizes of $25) + (10 prizes of $100), resulting in a total prize value, which divided by the number of tickets (10,000), will give the break-even price per ticket.