Suppose that a school has 20 classes: 16 with 25 students in each, three with 100 students in each, and one with 300 students, for a total of 1000 students. (a) What is the average class size? (b) Select a student randomly out of the 1000 students. Let the random variable X equal the size of the class to which this student belongs, and define the pmf of X. (c) Find E(X), the expected value of X. Does this answer surprise you?

Answera)   y    |      p(y)     25   |      0.8    100   |     0.15    300   |      0.05E(y) = ∑ y . p(y)E(y) = 25 × 0.8 + 100 × 0.15 + 300 × 0.05E(y) = 50average class size equal to E(y) = 50b)  y    |      p(y)     25   |     [tex]\dfrac{16\times 25}{1000}=0.4[/tex]    100   |     [tex]\dfrac{3\times 100}{1000}=0.3[/tex]    300   |      [tex]\dfrac{1\times 300}{1000}=0.3[/tex]E(y) = ∑ y . p(y)E(y) = 25 × 0.4 + 100 × 0.3 + 300 × 0.3E(y) = 130average class size equal to E(y) = 130c) Average Student in the class in a school = 50   Average student at the school has student = 130