Alicia's professor puts the names of all 100 students in the class in a bag and draws 3 of them sequentially, without replacement, to answer questions. Define C₁, C₂, and C₃ to be the events that Alicia is called on to answer questions 1, 2, and 3, respectively.

(a)

Based on the physical situation used to select students, what is the (unconditional) probability of C₁?

 

Based on the physical situation used to select students, what is the (unconditional) probability of C₂?

 

Based on the physical situation used to select students, what is the (unconditional) probability of C₃?

 

(b)

What is the conditional probability of C₃, given that C₁ occurred?

 

(c)

Are C₁ and C₃ independent events? Explain.

Since P(C₃) ≠ P(C₃|C₁), we know the events C₁ and C₃ are independent.Since P(C₃) = P(C₁), we know the events C₁ and C₃ are dependent.     Since P(C₃) = P(C₃|C₁), we know the events C₁ and C₃ are independent.Since P(C₃) ≠ P(C₃|C₁), we know the events C₁ and C₃ are dependent.Since P(C₃) ≠ P(C₁), we know the events C₁ and C₃ are independent.