Math, asked by kaushikvishwa22, 11 months ago

Six papers are set in an examination, of which two are Mathematics. In how many different orders can the papers he arranged so that thetwo statistic papers are not
together?

Answers

Answered by Anonymous
29

Step-by-step explanation:

hey mate..Suppose the 6 papers are A, B, C, D, M1, and M2, where M1 and M2 are the

two mathematics papers.

1. First we calculate the number of ways of arranging the 6 papers

regardless of whether M1 and M2 are together or not.

2. Then we calculate the number of those ways that the M1 and M2 are

together.

3. Then we subtract the result of 2 from the result of 1.

-------------

1. There are 6 ways to choose the top paper. For each of those choices

there are 5 ways to choose the next paper and so on. So there are

6*5*4*3*2*1 or 6! ways to arrange them regardless of whether M1 and M2

come together or not.

2. When M1 and M2 come together, we can think of using a paper clip to

clip the two mathematics papers together. Then we have only 5 things,

A,B,C,D, and (M1M2) if we clip them together with M1 on top of M2,

or else we have A,B,C,D, and (M2M1) if we clip them together with M2

on top of M1. Each of those give 5! ways each. So that's 2*5! ways

the papers can be arranged with M1 and M2 paper-clipped together.

3. So the answer is 6! - 2*5! = 720 - 2*120 = 720 - 240 = 480

Answered by anshimakushwah
0

Answer:

Two out of six papers for an examination are of physics.What are the number of ways in which the papers can be arranged so that two physics papers are not together?`

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