Answer:
Step-by-step explanation:
Consider the following
An urn contains one blue ball B₁
and three red balls (R₁, R₂ and R₃)
Second urn contains two red balls (R₄ and R₅) and two blue balls (B₂ and B₃)
An experiment is performedd in which one of the two urns is chosen from it, one after the other without replacement
a. We are to construct the possibility tree that contains all possible outcome of this experiment
see the attached file below
b. WeWe are to find the total number of outcome of this experiment
The total outcome of this experiment are the following
Urn 1 and Urn 2
B₁R₁ B₂B₃
B₁R₂ B₂R₄
B₁R₃ B₂R₅
R₁B₁ B₃B₂
R₁R₂ B₃R₄
R₁R₃ B₃R₅
R₂B₁ R₄B₂
R₂R₁ R₄B₃
R₂R₃ R₄R₅
R₃B₁ R₅B₂
R₃B₁ R₅B₂
R₃B₁ R₅B₂
R₃R₁ R₅B₃
R₃R₂ R₅R₄
There are 24 total possible outcome
c. We are to find the probability that two red balls are chosen
Probability
If S is a finite sample space in which all outcomes are equally likely and E is and event in S then the probability of E, denoted P(E) is as follows
P(E) = The number of successful outcomes in E / The number of outcomes in S
The chosen two balls are red
Out of the 24 outcomes the outcomes in which both are red are as follows
R₁R₂, R₁R₃, R₂R₁, R₃R₁, R₃R₂, R₄R₅, R₃R₄ and R₂R₃
The probability that the two balls chosen are red is as follows P(E) = 8/24
= 1/3
