Discrete Mathematics Multiple Choice Questions on “Discrete Probability – Bayes Theorem”.
1. A single card is drawn from a standard deck of playing cards. What is the probability that the card is a face card provided that a queen is drawn from the deck of cards?
a) (frac{3}{13})
b) (frac{1}{3})
c) (frac{4}{13})
d) (frac{1}{52})
Answer: b
Clarification: The probability that the card drawn is a queen = (frac{4}{52}), since there are 4 queens in a standard deck of 52 cards. If the event is “this card is a queen” the prior probability P(queen) = (frac{4}{52} = frac{1}{13}). The posterior probability P(queen|face) can be calculated using Bayes theorem: P(king|face) = P(face|king)/P(face)*P(king). Since every queen is also a face card, P(face|queen) = 1. The probability of a face card is P(face) = ((frac{3}{13})). [since there are 3 face cards in each suit (Jack, Queen, King)]. Using Bayes theorem gives P(queen|face) = (frac{13}{3}*frac{1}{13} = frac{1}{3}).
2. Naina receives emails that consists of 18% spam of those emails. The spam filter is 93% reliable i.e., 93% of the mails it marks as spam are actually a spam and 93% of spam mails are correctly labelled as spam. If a mail marked spam by her spam filter, determine the probability that it is really spam.
a) 50%
b) 84%
c) 39%
d) 63%
Answer: a
Clarification: 18% email are spam and 82% email are not spam. Now, 18% of mail marked as spam is spam and 82% mail marked as spam are not spam. By Bayes theorem the probability that a mail marked spam is really a spam = (Probability of being spam and being detected as spam)/(Probability of being detected as spam) = (0.18 * 0.82)/(0.18 * 0.82) + (0.18 * 0.82) = 0.5 or 50%.
3. A meeting has 12 employees. Given that 8 of the employees is a woman, find the probability that all the employees are women?
a) (frac{11}{23})
b) (frac{12}{35})
c) (frac{2}{9})
d) (frac{1}{8})
Answer: c
Clarification: Assume that the probability of an employee being a man or woman is ((frac{1}{2})). By using Bayes’ theorem: let B be the event that the meeting has 3 employees who is a woman and let A be the event that all employees are women. We want to find P(A|B) = (frac{P(B|A)*P(A)}{P(B)}). P(B|A) = 1, P(A) = (frac{1}{12}) and P(B) = (frac{8}{12}). So, P(A|B) = (frac{1*frac{1}{12}}{frac{8}{12}} = frac{1}{8}).
4. A cupboard A has 4 red carpets and 4 blue carpets and a cupboard B has 3 red carpets and 5 blue carpets. A carpet is selected from a cupboard and the carpet is chosen from the selected cupboard such that each carpet in the cupboard is equally likely to be chosen. Cupboards A and B can be selected in (frac{1}{5}) and (frac{3}{5}) ways respectively. Given that a carpet selected in the above process is a blue carpet, find the probability that it came from the cupboard B.
a) (frac{2}{5})
b) (frac{15}{19})
c) (frac{31}{73})
d) (frac{4}{9})
Answer: b
Clarification: The probability of selecting a blue carpet = (frac{1}{5} * frac{4}{8} + frac{3}{5} * frac{5}{8} = frac{4}{40} + frac{15}{40} = frac{19}{40}). Probability of selecting a blue carpet from cupboard, P(B) = (frac{3}{5} * frac{5}{8} = frac{15}{40}). Given that a carpet selected in the above process is a blue carpet, the probability that it came from the cupboard A is = (frac{frac{15}{40}}{frac{19}{40}} = frac{15}{19}).
5. Mangoes numbered 1 through 18 are placed in a bag for delivery. Two mangoes are drawn out of the bag without replacement. Find the probability such that all the mangoes have even numbers on them?
a) 43.7%
b) 34%
c) 6.8%
d) 9.3%
Answer: c
Clarification: The events are not independent. There will be a (frac{10}{18} = frac{5}{9}) chance that any of the mangoes in the bag is even. The probability that the first one is even is (frac{1}{2}), for the second mango, given that the first one was even, there are only 9 even numbered balls that could be drawn from a total of 17 balls, so the probability is (frac{9}{17}). For the third mango, since the first two are both odd, there are 8 even numbered mangoes that could be drawn from a total of 16 remaining balls and so the probability is (frac{8}{16}) and for fourth mango, the probability is = (frac{7}{15}). So the probability that all 4 mangoes are even numbered is (frac{10}{18}*frac{9}{17}*frac{8}{16}*frac{7}{16}) = 0.068 or 6.8%.
6. A family has two children. Given that one of the children is a girl and that she was born on a Monday, what is the probability that both children are girls?
a) (frac{13}{27})
b) (frac{23}{54})
c) (frac{12}{19})
d) (frac{43}{58})
Answer: a
Clarification: We let Y be the event that the family has one child who is a girl born on Tuesday and X be the event that both children are boys, and apply Bayes’ Theorem. Given that there are 7 days of the week and there are 49 possible combinations for the days of the week the two girls were born on and 13 of these have a girl who was born on a Monday, so P(Y|X) = (frac{13}{49}). P(X) remains unchanged at (frac{1}{4}). To calculate P(Y), there are 142 = 196 possible ways to select the gender and the day of the week the child was born on. There are 132 = 169 ways which do not have a girl born on Monday and which 196 – 169 = 27 which do, so P(Y) = (frac{27}{196}). This gives is that P(X|Y) = (frac{frac{13}{19}*frac{1}{4}}{frac{27}{196}} = frac{13}{27}).
7. Suppose a fair eight-sided die is rolled once. If the value on the die is 1, 3, 5 or 7 the die is rolled a second time. Determine the probability that the sum of values that turn up is at least 8?
a) (frac{32}{87})
b) (frac{12}{43})
c) (frac{6}{13})
d) (frac{23}{64})
Answer: d
Clarification: Sample space consists of 8*8=64 events. While (8) has (frac{1}{8}) probability of occurrence, (1,7) has only (frac{1}{64}) probability. So, the required probability = (frac{1}{6} + (9 * frac{1}{64}) = frac{69}{192} = frac{23}{64}).
8. A jar containing 8 marbles of which 4 red and 4 blue marbles are there. Find the probability of getting a red given the first one was red too.
a) (frac{4}{13})
b) (frac{2}{11})
c) (frac{3}{7})
d) (frac{8}{15})
Answer: c
Clarification: Suppose, P (A) = getting a red marble in the first turn, P (B) = getting a black marble in the second turn. P (A) = (frac{4}{8}) and P (B) = (frac{3}{7}) and P (A and B) = (frac{4}{8}*frac{3}{7} = frac{3}{14}) P(B/A) = (frac{P(A ,and ,B)}{P(A)} = frac{frac{3}{14}}{frac{1}{2}} = frac{3}{7}).
9. A bin contains 4 red and 6 blue balls and three balls are drawn at random. Find the probability such that both are of the same color.
a) (frac{10}{28})
b) (frac{1}{5})
c) (frac{1}{10})
d) (frac{4}{7})
Answer: b
Clarification: Total no of balls = 10. Number of ways drawing 3 balls at random out of 10 = 10C3 = 120. Probability of drawing 3 balls of same colour = 4C3 + 6C3 = 24. Hence, the required probability is (frac{24}{120} = frac{1}{5}).
10. A bucket contains 6 blue, 8 red and 9 black pens. If six pens are drawn one by one without replacement, find the probability of getting all black pens?
a) (frac{8}{213})
b) (frac{8}{4807})
c) (frac{5}{1204})
d) (frac{7}{4328})
Answer: b
Clarification: Total number of pens = 23, number of pens we have chosen = 6, total number of black pens = 9. According to the combination probability formula it states that nCr = (frac{n!}{r! (n-r)!}),
where n = total number of outcomes, r = random selection, P = (frac{^9C_6}{^{23}C_6} = frac{8}{4807}).