A fair blue die has faces numbered 1, 1, 3, 3 and 5 - Edexcel - A-Level Maths Statistics - Question 6 - 2013 - Paper 1

The name of this probability distribution is 'Discrete Uniform'.

The expected value of B, E(B), can be calculated using the formula: E(B) = rac{1}{n} imes ext{sum of all values} In this case: E(B) = rac{1}{5}(1 + 1 + 3 + 3 + 5) = rac{13}{5} = 2.6

To find the expected value E(R), we apply the formula: $E(R) = ext{sum of (r} imes ext{P(R = r))}$ Calculating: E(R) = 2 imes rac{2}{3} + 4 imes rac{1}{6} + 6 imes rac{1}{6} E(R) = rac{4}{3} + rac{4}{6} + rac{6}{6} = rac{4}{3} + rac{2}{3} + 1 = rac{11}{3}

To find the variance Var(R), we use the formula: $Var(R) = E(R^2) - (E(R))^2$ First, we compute E(R^2): E(R^2) = 2^2 imes rac{2}{3} + 4^2 imes rac{1}{6} + 6^2 imes rac{1}{6} Calculating this gives: E(R^2) = rac{8}{3} + rac{16}{6} + rac{36}{6} = rac{8}{3} + rac{26}{6} Now, plugging into the variance formula: First convert to a common denominator: Var(R) = E(R^2) - rac{121}{9}

1. When the coin shows 2:

   • Avisha would roll the blue die (B) which has the probability of: P(B > 2) = P(B = 3) + P(B = 3) + P(B = 5) = rac{2}{5} + rac{1}{5} = rac{3}{5}

2. When the coin shows 5:

   • Avisha would roll the red die (R) since all values are less: $P(R > 5) = 0$

Thus, the overall winning probability for Avisha is: P(Avisha ext{ wins}) = rac{1}{2} imes rac{3}{5} + rac{1}{2} imes 0 = rac{3}{10}