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Reading 8: Probability Concepts - LOS m ~ Q1-4

1Bonds rated B have a 25 percent chance of default in five years. Bonds rated CCC have a 40 percent chance of default in five years. A portfolio consists of 30 percent B and 70 percent CCC-rated bonds. If a randomly selected bond defaults in a five-year period, what is the probability that it was a B-rated bond?

A)   0.211.

B)   0.625.

C)   0.429.

D)   0.250.

2John purchased 60 percent of the stocks in a portfolio, while Andrew purchased the other 40 percent. Half of John’s stock-picks are considered good, while a fourth of Andrew’s are considered to be good. If a randomly chosen stock is a good one, what is the probability John selected it?

A)   0.30.

B)   0.75.

C)   0.40.

D)   0.25.

3An analyst expects that 20 percent of all publicly traded companies will experience a decline in earnings next year. The analyst has developed a ratio to help forecast this decline. If the company is headed for a decline, there is a 90% chance that this ratio will be negative. If the company is not headed for a decline, there is only a 10% chance that the ratio will be negative. The analyst randomly selects a company with a negative ratio. Based on Bayes' theorem, the updated probability that the company will experience a decline is:

A)   18%.

B)   69%.

C)   26%.

D)   44%.

4The probability of A is 0.4. The probability of AC is 0.6. The probability of (B|A) is 0.5, and the probability of (B|AC) is 0.2. Using Bayes’ formula, what is the probability of (A|B)?

A)   0.625.

B)   0.875.

C)   0.125.

D)   0.375.

答案和详解如下:

1Bonds rated B have a 25 percent chance of default in five years. Bonds rated CCC have a 40 percent chance of default in five years. A portfolio consists of 30 percent B and 70 percent CCC-rated bonds. If a randomly selected bond defaults in a five-year period, what is the probability that it was a B-rated bond?

A)   0.211.

B)   0.625.

C)   0.429.

D)   0.250.

The correct answer was A)    

According to Bayes' formula: P(B/default) = P(default and B)/P(default).

P(default and B )= P(default/B) x P(B) = 0.250 x 0.300 = 0.075

P(default and CCC) = P(default/CCC) x P(CCC) = 0.400 x 0.700 = 0.280

P(default) = P(default and B) + P(default and CCC) = 0.355

P(B/default) = P(default and B)/P(default) = 0.075/0.355 = 0.211

2John purchased 60 percent of the stocks in a portfolio, while Andrew purchased the other 40 percent. Half of John’s stock-picks are considered good, while a fourth of Andrew’s are considered to be good. If a randomly chosen stock is a good one, what is the probability John selected it?

A)   0.30.

B)   0.75.

C)   0.40.

D)   0.25.

The correct answer was B)    

Using the information of the stock being good, the probability is updated to a conditional probability:

P(John | good) = P(good and John) / P(good).

P(good and John) = P(good | John) * P(John) = 0.5 * 0.6 = 0.3.

P(good and Andrew) = 0.25 * 0.40 = 0.10.

P(good) = P(good and John) + P (good and Andrew)  =  0.40.

P(John | good) = P(good and John) / P(good) = 0.3 / 0.4 = 0.75.

3An analyst expects that 20 percent of all publicly traded companies will experience a decline in earnings next year. The analyst has developed a ratio to help forecast this decline. If the company is headed for a decline, there is a 90% chance that this ratio will be negative. If the company is not headed for a decline, there is only a 10% chance that the ratio will be negative. The analyst randomly selects a company with a negative ratio. Based on Bayes' theorem, the updated probability that the company will experience a decline is:

A)   18%.

B)   69%.

C)   26%.

D)   44%.

The correct answer was B)    

Given a set of prior probabilities for an event of interest, Bayes’ formula is used to update the probability of the event, in this case that the company we have already selected will experience a decline in earnings next year. Bayes’ formula says to divide the Probability of New Information given Event by the Unconditional Probability of New Information and multiply that result by the Prior Probability of the Event. In this case, P(company having a decline in earnings next year) = 0.20 is divided by 0.26 (which is the Unconditional Probability that a company having an earnings decline will have a negative ratio (90 percent have negative ratios of the 20 percent which have earnings declines) plus (10 percent have negative ratios of the 80 percent which do not have earnings declines) or ((0.90) * (0.20)) + ((0.10) * (0.80)) = 0.26.) This result is then multiplied by the Prior Probability of the ratio being negative, 0.90. The result is (0.20/0.26) * (0.90) = 0.69 or 69 percent.

4The probability of A is 0.4. The probability of AC is 0.6. The probability of (B|A) is 0.5, and the probability of (B|AC) is 0.2. Using Bayes’ formula, what is the probability of (A|B)?

A)   0.625.

B)   0.875.

C)   0.125.

D)   0.375.

The correct answer was A)    

Using the total probability rule, we can compute the P(B):
P(B) = [P(B|A) × P(A)] + [P(B|A
C) × P(AC)]
P(B) = [0.5 × 0.4] + [0.2 × 0.6] = 0.32

Using Bayes’ formula, we can solve for P(A|B):
P(A|B) = [ P(B|A) / P(B) ] × P(A) = [0.5 / 0.32] × 0.4 = 0.625

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