Let E₁, E₂, and E₃ be the events that Bag 1, Bag 2 and Bag 3 is selected, and a ball is chosen from it.

Bag 1: 3 red balls,

Bag 2: 2 red balls and 1 white ball

Bag 3: 3 white balls.

As The probability that bag i will be chosen and a ball is selected from it is i|6.

The Law of Total Probability:

In a sample space S, let E₁,E₂,E₃…….E_n be n mutually exclusive and exhaustive events associated with a random experiment. If A is any event which occurs with E₁,E₂,E₃…….E_n, then

P(A) = P(E₁)P(A/E₁)+ P(E₂)P(A/E₂)+ …… P(E_n)P(A/E_n)

(i) Let “E” be the event that a red ball is selected.

P(E|E₁) is the probability that red ball is chosen from the bag 1.

P(E|E₂) is the probability that red ball is chosen from the bag 2.

P(E|E₃) is the probability that red ball is chosen from the bag 3.

So,

As red ball can be selected from Bag 1, Bag 2 and Bag 3.

So, probability of choosing a red ball is the sum of individual probabilities of choosing the red from the given bags.

From the law of total probability,

P(E) = P(E₁) × P(E|E₁) + P(E₂) × P(E|E₂) + P(E₃) × P(E|E₃)

(ii) Let F be the event that a white ball is selected.

So, P(F|E₁) is the probability that white ball is chosen from the bag 1.

P(F|E₂) is the probability that white ball is chosen from the bag 2.

P(F|E₃) is the probability that white ball is chosen from the bag 2.

P(F|E₁) = 0

As white ball can be selected from Bag 1, Bag 2 and Bag 3.

So, probability of choosing a white ball is the sum of individual probabilities of choosing the red from the given bags.

P(F) = P(E₁) × P(F|E₁) + P(E₂) × P(F|E₂) + P(E₃) × P(F|E₃)