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Everyone who passes the test will be awarded a degree. The p
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24 Apr 2018, 09:33
24 Apr 2018, 09:33
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Question Stats:
90% (00:55) correct
9% (01:01) wrong based on 111 sessions
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Everyone who passes the test will be awarded a degree. The probability that Tom passes the test is 0.5, and the probability that John passes the test is 0.4. The two events are independent of each other.
Quantity A |
Quantity B |
The probability that both Tom and John get the degree |
The probability that at least one of them gets the degree |
A. The quantity in Column A is greater
B. The quantity in Column B is greater
C. The two quantities are equal
D. The relationship cannot be determined from the information given
Kudos for the right answer and solution.
Re: Everyone who passes the test will be awarded a degree. The p
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07 May 2018, 16:22
07 May 2018, 16:22
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mohan514 wrote:
I do not think we have to do serious math to answer this question. Both events happening vs any one event happening. B would be greater for obvious reason.
Both events happening = 0.5*0.4 = 0.2
any one event happening = 0.5+0.4 - 0.9
Please correct me on Math part if wrong.
Both events happening = 0.5*0.4 = 0.2
any one event happening = 0.5+0.4 - 0.9
Please correct me on Math part if wrong.
kruttikaaggarwal wrote:
I could figure out the A answer but I was not so sure of the method for B. Help please?
So lets see Quantity A: Both get degree = \(P(tom) \times P(john)=0.5 *0.4=0.2\).
Quantity B: Atleast one degree gets awarded. We can write the following cases:
Tom gets a degree John doesnot = \(0.5 * (1-0.4)=0.3\)
John gets a degree Tom doesnot = \(0.4 * (1-0.5)=0.2\)
Both get a degree = \(0.4 *0.5=0.2\)
Total probability for quantity B is \(0.7\).
Hence B is greater.
General Discussion
Re: Everyone who passes the test will be awarded a degree. The p
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04 May 2018, 04:14
04 May 2018, 04:14
1
I do not think we have to do serious math to answer this question. Both events happening vs any one event happening. B would be greater for obvious reason.
Both events happening = 0.5*0.4 = 0.2
any one event happening = 0.5+0.4 - 0.9
Please correct me on Math part if wrong.
Both events happening = 0.5*0.4 = 0.2
any one event happening = 0.5+0.4 - 0.9
Please correct me on Math part if wrong.
