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20 Jun 2019, 01:10
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
75%
(hard)
Question Stats:
60% (02:44) correct
40%
(02:31)
wrong
based on 313
sessions
History
Date
Time
Result
Not Attempted Yet
\(5\) boys and \(5\) girls randomly select seats around a circular table that seats \(10\). What is the probability that two girls will sit next to one another?
\(A. \frac{11}{24}\)
\(B. \frac{23}{24}\)
\(C. \frac{23}{48}\)
\(D. \frac{47}{48}\)
\(E. \frac{125}{126}\)
\(A. \frac{11}{24}\)
\(B. \frac{23}{24}\)
\(C. \frac{23}{48}\)
\(D. \frac{47}{48}\)
\(E. \frac{125}{126}\)
23 Jun 2019, 18:26
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=>
The easiest way to solve this problem is to find the number of arrangements satisfying the complementary condition that boys and girls are arranged alternately around the table, and subtract this from the total number of arrangements of the boys and girls.
The number of arrangements of n people in a circle is \((n-1)!.\)
So, the total number of arrangements of \(10\) people is \((10-1)! = 9!\)
The number of complementary arrangements is \((5-1)!*5! = 4!*5!\)
Thus, the required probability is \(1 – \frac{[(4!)(5!)]}{(9!)} = 1 – \frac{[(1*2*3*4)}{(6*7*8*9)]} = 1 – \frac{1}{126} = \frac{125}{126}\)
Therefore, E is the answer.
Answer: E
The easiest way to solve this problem is to find the number of arrangements satisfying the complementary condition that boys and girls are arranged alternately around the table, and subtract this from the total number of arrangements of the boys and girls.
The number of arrangements of n people in a circle is \((n-1)!.\)
So, the total number of arrangements of \(10\) people is \((10-1)! = 9!\)
The number of complementary arrangements is \((5-1)!*5! = 4!*5!\)
Thus, the required probability is \(1 – \frac{[(4!)(5!)]}{(9!)} = 1 – \frac{[(1*2*3*4)}{(6*7*8*9)]} = 1 – \frac{1}{126} = \frac{125}{126}\)
Therefore, E is the answer.
Answer: E
30 Jun 2019, 21:35
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Hi NandishSS,
This question can be approached in a number of different ways (depending on how you choose to do the math involved). It's far easier to calculate the probability that NO girls will sit next to one another, so I'm going to calculate that and then subtract that fraction from the number 1; this will give us the probability that two (or more) girls will end up sitting next to one another.
To start, any of the 10 chairs can be the 'first chair' - and any of the 10 people can sit in it. Once someone is placed in that seat, we want the next seat have someone of the opposite sex (and there are 5 options for that 'second chair'). From here, the pattern is now set for the other 8 chairs (it's either BGBGBGBG or GBGBGBGB, depending on who sits in the 'first chair') - and we'll end up with 4 possible kids for the 'third chair', 4 for the 'fourth chair', 3 for the 'fifth chair', 3 for the 'sixth chair', etc.
This means that there are (10)(5)(4)(4)(3)(3)(2)(2)(1)(1) possible ways to arrange the boys and girls in every-other-seat. Do NOT multiply that out yet.
The total possible ways to place the 10 people in the 10 seats is 10!, which I'm going to expand-out in a moment. We now have our probability:
(10)(5)(4)(4)(3)(3)(2)(2)(1)(1) / (10)(9)(8)(7)(6)(5)(4)(3)(2)(1)
You can 'cancel out' a LOT of the numbers in the numerator and denominator. For example, the 10s 'cancel out', you can take the two 3s from the numerator and 'cancel out' the 9 in the denominator, etc. By doing that, I was left with:
(1) / (7)(6)(3) = 1/126
Thus, since there's a 1/126 probability of having NO girls sit next to one another, there's a 1 - (1/126) = 125/126 probability of having 2 (or more) girls sit next to each other.
Final Answer:
GMAT assassins aren't born, they're made,
Rich
This question can be approached in a number of different ways (depending on how you choose to do the math involved). It's far easier to calculate the probability that NO girls will sit next to one another, so I'm going to calculate that and then subtract that fraction from the number 1; this will give us the probability that two (or more) girls will end up sitting next to one another.
To start, any of the 10 chairs can be the 'first chair' - and any of the 10 people can sit in it. Once someone is placed in that seat, we want the next seat have someone of the opposite sex (and there are 5 options for that 'second chair'). From here, the pattern is now set for the other 8 chairs (it's either BGBGBGBG or GBGBGBGB, depending on who sits in the 'first chair') - and we'll end up with 4 possible kids for the 'third chair', 4 for the 'fourth chair', 3 for the 'fifth chair', 3 for the 'sixth chair', etc.
This means that there are (10)(5)(4)(4)(3)(3)(2)(2)(1)(1) possible ways to arrange the boys and girls in every-other-seat. Do NOT multiply that out yet.
The total possible ways to place the 10 people in the 10 seats is 10!, which I'm going to expand-out in a moment. We now have our probability:
(10)(5)(4)(4)(3)(3)(2)(2)(1)(1) / (10)(9)(8)(7)(6)(5)(4)(3)(2)(1)
You can 'cancel out' a LOT of the numbers in the numerator and denominator. For example, the 10s 'cancel out', you can take the two 3s from the numerator and 'cancel out' the 9 in the denominator, etc. By doing that, I was left with:
(1) / (7)(6)(3) = 1/126
Thus, since there's a 1/126 probability of having NO girls sit next to one another, there's a 1 - (1/126) = 125/126 probability of having 2 (or more) girls sit next to each other.
Final Answer:
GMAT assassins aren't born, they're made,
Rich
