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The probability of rain in Greg’s town on Tuesday is 0.3. Th
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05 Aug 2018, 14:46
05 Aug 2018, 14:46
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Question Stats:
68% (01:03) correct
31% (01:00) wrong based on 105 sessions
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The probability of rain in Greg’s town on Tuesday is 0.3. The probability that Greg’s teacher will give him a pop quiz on Tuesday is 0.2. The events occur independently of
each other.
A) Quantity A is greater.
B) Quantity B is greater.
C) The two quantities are equal.
D) The relationship cannot be determined from the information given.
each other.
Quantity A |
Quantity B |
The probability that either or both events occur |
The probability that neither event occurs |
A) Quantity A is greater.
B) Quantity B is greater.
C) The two quantities are equal.
D) The relationship cannot be determined from the information given.
Re: The probability of rain in Greg’s town on Tuesday is 0.3. Th
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21 Aug 2018, 18:31
21 Aug 2018, 18:31
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Explanation
The problem indicates that the events occur independently of each other. Therefore, in calculating Quantity A, do not just add both events, even though it is an “or” situation. Adding 0.3 + 0.2 = 0.5 is incorrect because the probability that both events occur is counted twice. (Only add probabilities in an “or” situation when the probabilities are mutually exclusive.)
While Quantity A’s value should include the probability that both events occur, make sure to count this probability only once, not twice. Since the probability that both events occur is 0.3(0.2) = 0.06, subtract this value from the “or” probability.
Quantity A: Add the two probabilities (rain or pop quiz) and subtract both scenarios (rain and pop quiz): 0.3 + 0.2 – (0.3)(0.2) = 0.44
Quantity B: Multiply the probability that rain does not occur (0.7) and the probability that the pop quiz does not occur (0.8): 0.7(0.8) = 0.56
Alternatively, note that the two quantities, collectively, include every possibility and are mutually exclusive of one another (Quantity A includes “rain and no quiz,” “quiz and no rain,” and “both rain and quiz,” and Quantity B includes “no rain and no quiz”). Therefore, the values of Quantities A and B must sum to 1. Calculating the value of either Quantity A or Quantity B would automatically indicate the value for the other quantity.
If you do this, calculate Quantity B first (because it’s the easier of the two quantities to calculate) and then subtract Quantity B from 1 in order to get Quantity A’s value. That is, 1 – 0.56 = 0.44.
The problem indicates that the events occur independently of each other. Therefore, in calculating Quantity A, do not just add both events, even though it is an “or” situation. Adding 0.3 + 0.2 = 0.5 is incorrect because the probability that both events occur is counted twice. (Only add probabilities in an “or” situation when the probabilities are mutually exclusive.)
While Quantity A’s value should include the probability that both events occur, make sure to count this probability only once, not twice. Since the probability that both events occur is 0.3(0.2) = 0.06, subtract this value from the “or” probability.
Quantity A: Add the two probabilities (rain or pop quiz) and subtract both scenarios (rain and pop quiz): 0.3 + 0.2 – (0.3)(0.2) = 0.44
Quantity B: Multiply the probability that rain does not occur (0.7) and the probability that the pop quiz does not occur (0.8): 0.7(0.8) = 0.56
Alternatively, note that the two quantities, collectively, include every possibility and are mutually exclusive of one another (Quantity A includes “rain and no quiz,” “quiz and no rain,” and “both rain and quiz,” and Quantity B includes “no rain and no quiz”). Therefore, the values of Quantities A and B must sum to 1. Calculating the value of either Quantity A or Quantity B would automatically indicate the value for the other quantity.
If you do this, calculate Quantity B first (because it’s the easier of the two quantities to calculate) and then subtract Quantity B from 1 in order to get Quantity A’s value. That is, 1 – 0.56 = 0.44.
General Discussion
Re: The probability of rain in Gregs town on Tuesday is 0.3. Th
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25 Apr 2022, 12:07
25 Apr 2022, 12:07
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Thanks to another GRE Prep Club member, I have just discovered this valuable topic, yet it had no discussion for over a year. I am now bumping it up - doing my job. I think you may find it valuable (esp those replies with Kudos).
Want to see all other topics I dig out? Follow me (click follow button on profile). You will receive a summary of all topics I bump in your profile area as well as via email.
