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06 Feb 2023, 07:38
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
45%
(medium)
Question Stats:
66% (01:25) correct
34%
(01:28)
wrong
based on 639
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The probability that a customer at a certain restaurant will purchase a pie is 0.75. If four customers visit the restaurant on a certain evening, what is the probability that exactly three of them will purchase a pie ?
A. 27/256
B. 3/64
C. 27/64
D. 3/4
E. 32/81
A. 27/256
B. 3/64
C. 27/64
D. 3/4
E. 32/81
11 Feb 2023, 12:48
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Bunuel
The probability that a person will purchase the pie = \(\frac{3}{4}\)
The probability that a person will not purchase the pie = \(\frac{1}{4}\)
Exact three of them purchase a pie = \((\frac{3}{4})^3 * (\frac{1}{4}) * \frac{4!}{3!}\)
= \(\frac{3^3 }{ 4^3}\)
= \(\frac{27}{64}\)
Option C
Eeekta
Joined: 17 Jul 2021
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Schools: Booth '24 Columbia CBS '24 Darden '24 Fuqua '24 Haas '24 ISB '23 Kellogg '24 LBS '24 Said '23 Ross '24 Tuck '24 Wharton '24 Yale '24
GMAT 1: 640 Q44 V33
Schools: Booth '24 Columbia CBS '24 Darden '24 Fuqua '24 Haas '24 ISB '23 Kellogg '24 LBS '24 Said '23 Ross '24 Tuck '24 Wharton '24 Yale '24
GMAT 1: 640 Q44 V33
Posts: 14
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03 Jun 2023, 06:40
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gmatophobia
Hi I am unable to understand why 4!/3!?
We usually do this when we have similar items/letters/people etc. right, but here none of it is the case.
Can you please clarify this?
Bunuel could you please help? Thank you
