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Re: The total number of ways in which 10 students can be arrange [#permalink]
Expert Reply
Use the satandard GRE books. Like the ones dicussed in GRE Books forum. Like: Manhattan, Kaplan etc.

The reson for the same is that GRE has a very specific set of questions. Its not an all sweeping math aptitude test. If you stick to the format you are likely to score better.
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Re: The total number of ways in which 10 students can be arrange [#permalink]
2
3Newton wrote:
The total number of ways in which 10 students can be arranged in a row such that A is always ahead of B?

a. 2x10!
b. 10! /2
c. 10! x 8!
d. none


Another approach....

We can arrange 10 students in 10! ways.
For HALF of these 10! arrangements, A is ahead of B, and for the other HALF of these 10! arrangements, B is ahead of A
So, 10!/2 = the number of arrangements where A is ahead of B.

Answer:
Show: ::
B


Cheers,
Brent
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Re: The total number of ways in which 10 students can be arrange [#permalink]
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GreenlightTestPrep wrote:
3Newton wrote:
The total number of ways in which 10 students can be arranged in a row such that A is always ahead of B?

a. 2x10!
b. 10! /2
c. 10! x 8!
d. none


Another approach....

We can arrange 10 students in 10! ways.
For HALF of these 10! arrangements, A is ahead of B, and for the other HALF of these 10! arrangements, B is ahead of A
So, 10!/2 = the number of arrangements where A is ahead of B.

Answer:
Show: ::
B



Cheers,
Brent


Brilliant!!
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Re: The total number of ways in which 10 students can be arrange [#permalink]
Thinking about this problem on a small scale might lead to the answer. As someone already did the calculation above, I'm not jumping into that. But let's try some different simulations.

Consider there is only 2 people, A and B. Their total arrangements will be:

1) A B
2) B A

Among these 2 arrangements, A is ahead of B only 1 time. (2! / 2)

Now, Consider the same situation for 3 people, A, B, C. Their total arrangements will be:

1) A B C
2) A C B
3) C A B
4) C B A
5) B C A
6) B A C

So, for these 6 arrangements, A is ahead of B only for 3 times. (3! / 2)

Now, we can 'assume' the answer will be: 10! / 2.

This not the best way to solve a mathematical problem but you may sometimes find it handy. If you have time, Do the same simulation for 4 people.
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Re: The total number of ways in which 10 students can be arrange [#permalink]
3Newton wrote:
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. \(none\)


N objects can be placed in a Line or Row in N! ways

So, Number of ways these 10 students can be placed in a row = \(10!\)

Whatever, the total cases, Half of the cases will have A before B and Half of the cases will have B before A
Since, we want A before B, just divide the Total number of ways by 2

i.e. \(\frac{10!}{2}\)

Hence, option B
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Re: The total number of ways in which 10 students can be arrange [#permalink]
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Re: The total number of ways in which 10 students can be arrange [#permalink]
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