A local sports club is planning to run a weekly lotto - Leaving Cert Mathematics - Question 6 - 2016

The expected values for each event must be calculated based on the payouts and their probabilities. The payout for winning the jackpot is €1000, while matching one letter and one number yields €50.

1. Win Jackpot (1 outcome):

   • Payout: €1000,
   • Probability: rac{1}{2600}
   • Expected Value: 1000 imes rac{1}{2600} = rac{1000}{2600} = 0.3846

2. Match letter and first number (1 outcome):

   • Payout: €50,
   • Probability: rac{1}{2600}
   • Expected Value: 50 imes rac{1}{2600} = rac{50}{2600} = 0.0192

3. Match letter and second number (1 outcome):

   • Payout: €50,
   • Probability: rac{1}{2600}
   • Expected Value: 50 imes rac{1}{2600} = rac{50}{2600} = 0.0192

4. Fail to win (the rest of the outcomes):

   • Payout: €0,
   • Probability: Remaining outcomes: 2597 outcomes,
   • Expected Value: 0 imes rac{2597}{2600} = 0

Now sum these expected values:

$E = 0.3846 + 0.0192 + 0.0192 + 0 = 0.423$

Since they charge €2 per play, the expected profit or loss is:

Expected Profit/Loss = Charge - E = €2 - €0.423 = €1.577

Thus, on each play, the club expects to make approximately €1.58.

To calculate how much the club should charge per play to achieve an average profit of €600 per week when the average number of plays is 845:

1. Total Expected Profit Required per Week: €600

2. Total Number of Plays per Week: 845

3. Expected Profit per Play Required:

   ext{Expected Profit per Play} = rac{600}{845} \\ ext{Expected Profit per Play} = 0.7088

4. Charge per Play Calculation:

   • If the club wants to make a profit of approximately €0.71 per play, then the total charge per play should be the sum of the expected profit per play and the base charge for each play of €2:

   $ext{Charge per Play} = 2 + 0.7088 = 2.7088$

   Rounding to the nearest cent, the club should charge:

   €2.71 per play.