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The total number of ways in which 10 students can be arrange
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Updated on: 14 Dec 2017, 15:28
Updated on: 14 Dec 2017, 15:28
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Question Stats:
46% (01:23) correct
53% (01:03) wrong based on 15 sessions
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The total number of ways in which 10 students can be arranged in a row such that A is always ahead of B?
a. \(2*10!\)
b. \(\frac{10!}{2}\)
c. \(10! * 8!\)
D. \(10!\)
d. \(none\)
a. \(2*10!\)
b. \(\frac{10!}{2}\)
c. \(10! * 8!\)
D. \(10!\)
d. \(none\)
Re: The total number of ways in which 10 students can be arrange
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16 Jun 2017, 17:23
16 Jun 2017, 17:23
1
Expert Reply
Hi 3Newton,
This is probably not a GRE question. Could you share the source?
Let us assume that there are 10 students and 10 places. We can break down the problem into 3 parts:
1. Place student A in any position.
2. Find number of options for student B
3. Arrange remaining 8 students
So let student A in position 1:
Number of options for student B = 9 (every other position is open)
Remaining 8 students: \(8!\)
So total number of combination = \(9 \times 8!\).
Let student B in position 2:
Number of options for student B = 8 (every other position is open except the position 1 and position 2 is occupied by 2)
Remaining 8 students: \(8!\)
So total number of combination = \(8 \times 8!\).
Now repeat this for all postions till student A in postion 9 and student B is 10.
Hence summing up all the options = \(9 \times 8! + 8 \times 8! ....... 1 \times 8! = 45 \times 8! = 5\times 9 \times 8! = 5 \times 9! = \frac{10!}{2}\).
Hence option B is correct!
This is probably not a GRE question. Could you share the source?
Let us assume that there are 10 students and 10 places. We can break down the problem into 3 parts:
1. Place student A in any position.
2. Find number of options for student B
3. Arrange remaining 8 students
So let student A in position 1:
Number of options for student B = 9 (every other position is open)
Remaining 8 students: \(8!\)
So total number of combination = \(9 \times 8!\).
Let student B in position 2:
Number of options for student B = 8 (every other position is open except the position 1 and position 2 is occupied by 2)
Remaining 8 students: \(8!\)
So total number of combination = \(8 \times 8!\).
Now repeat this for all postions till student A in postion 9 and student B is 10.
Hence summing up all the options = \(9 \times 8! + 8 \times 8! ....... 1 \times 8! = 45 \times 8! = 5\times 9 \times 8! = 5 \times 9! = \frac{10!}{2}\).
Hence option B is correct!
Re: The total number of ways in which 10 students can be arrange
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16 Jun 2017, 22:43
16 Jun 2017, 22:43
Hi Sandy,
Thanks for responding.
This is from some book on counting and probability sold in India. How to know what is a GRE question and which ones are not?
Could you please help me with that? Also fom where to practice?
Thanks for responding.
This is from some book on counting and probability sold in India. How to know what is a GRE question and which ones are not?
Could you please help me with that? Also fom where to practice?
