Answer: Option 'C'

P(B/A) = P (A n B)/P(A) 
Here, P (A n B) = P(A) × P(B) = 0.13 × 0.3 = 0.39 
P(B/A) = 0.39/0.13 = 0.3

Answer: Option 'C'

If all the 36 elementary events of the experiment are considered to be equally likely, we have
P(A) = 18/36 = 1/2 
= and P(B) = 18/36 = 1/2 
Also P(A n B) = P (odd number on both throws)
= 9/36 = 1/4 
Now P(A) P(B) = 1/2 × 1/2 = 1/4 
P(A n B) = P(A) × P(B) 
A and B are independent events

Answer: Option 'B'

The sample space has 216 outcomes.
Now X = (1,1,4) (1,2,4) ... (1,6,4) (2,1,4) (2,2,4) ... (2,6,4)
(3,1,4) (3,2,4) ... (3,6,4) (4,1,4) (4,2,4) ...(4,6,4)
(5,1,4) (5,2,4) ... (5,6,4) (6,1,4) (6,2,4) ...(6,5,4) (6,6,4)
Y = {(6,5,1), (6,5,2), (6,5,3), (6,5,4), (6,5,5), (6,5,6)}
and X n Y = {(6,5,4)}.
Now P(Y) = 6/216 
and P (X n Y) = 1/216 

Answer: Option 'B'

P(B|A) = P(A n B)/P(A) 
P(A n B) = P(B|A) × P(A) 
P(A n B) = 0.2 × 0.18 
P(A n B) = 0.36

Answer: Option 'C'

Let Q denote the event that the card drawn is queen and A be the event that 
the card drawn is an ace. Clearly, we have to find P (QQA)
Now P(Q) = 4/52 
Also, P (Q|Q) is the probability of second queen with the condition that one queen has
already been drawn. Now there are three queen in (52 - 1) = 51 cards.
Therefore P(Q|Q) = 3/51 
P(A|QQ) is the probability of third drawn card to be an ace, with the condition 
that two queens have already been drawn. Now there are four aces in left 50 cards.
Therefore P(A|QQ) = 4/50 
By multiplication law of probability, we have 
P(QQA) = P(Q) P(Q|Q) P(A|QQ) 
= 4/52 × 3/51 × 4/50 
= 2/5525.