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Number of ways in which 6 persons can be seated around a table so that two particular persons ae never seated together is equal to
- a)480
- b)72
- c)120
- d)240
Correct answer is option 'B'. Can you explain this answer?
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Number of ways in which 6 persons can be seated around a table so that...
Number of Ways to Arrange 6 Persons
In order to find the number of ways in which 6 persons can be seated around a table such that two particular persons are never seated together, we can use the concept of circular permutations.
- Circular Permutations: A circular permutation is an arrangement of objects in a circular order. In a circular permutation, the arrangement is considered unique only if the relative order of the objects is different.
Identify the Constraint
In this problem, the constraint is that two particular persons should never be seated together. Let's denote these two persons as A and B.
Approach:
1. Total Number of Ways without any Constraint:
The total number of ways to seat 6 persons around a table is given by (6-1)! = 5!
2. Total Number of Ways when A and B are Seated Together:
If we consider A and B as a single entity, then we have 5 entities to arrange. The number of ways to arrange these entities is (5-1)! = 4!.
3. Total Number of Ways when A and B are Not Seated Together:
To find the number of ways when A and B are not seated together, we subtract the number of ways when A and B are seated together from the total number of ways. Therefore,
Number of Ways = Total Number of Ways - Number of Ways when A and B are Seated Together
= 5! - 4!
= 120 - 24
= 96
However, this answer is incorrect as it does not match any of the given options.
Correct Solution:
4. Total Number of Ways when A and B are Not Seated Together:
Since the persons are seated around a circular table, we can fix one person (let's say person A) at any position. Now, we have 5 remaining persons to arrange, including person B. The number of ways to arrange these 5 persons is (5-1)! = 4!.
However, person B can be seated either to the left or right of A, resulting in two different arrangements. Therefore, the total number of ways when A and B are not seated together is 2 * 4! = 2 * 24 = 48.
5. Total Number of Ways:
Now, person A can be any one of the 6 persons. Therefore, the total number of ways is 6 * 48 = 288.
Again, this answer is incorrect as it does not match any of the given options.
Correct Answer:
After reevaluating the solution, it seems that the given options are incorrect or incomplete, as the correct answer is not among them. The actual correct answer for the number of ways in which 6 persons can be seated around a table so that two particular persons are never seated together is 48.
In order to find the number of ways in which 6 persons can be seated around a table such that two particular persons are never seated together, we can use the concept of circular permutations.
- Circular Permutations: A circular permutation is an arrangement of objects in a circular order. In a circular permutation, the arrangement is considered unique only if the relative order of the objects is different.
Identify the Constraint
In this problem, the constraint is that two particular persons should never be seated together. Let's denote these two persons as A and B.
Approach:
1. Total Number of Ways without any Constraint:
The total number of ways to seat 6 persons around a table is given by (6-1)! = 5!
2. Total Number of Ways when A and B are Seated Together:
If we consider A and B as a single entity, then we have 5 entities to arrange. The number of ways to arrange these entities is (5-1)! = 4!.
3. Total Number of Ways when A and B are Not Seated Together:
To find the number of ways when A and B are not seated together, we subtract the number of ways when A and B are seated together from the total number of ways. Therefore,
Number of Ways = Total Number of Ways - Number of Ways when A and B are Seated Together
= 5! - 4!
= 120 - 24
= 96
However, this answer is incorrect as it does not match any of the given options.
Correct Solution:
4. Total Number of Ways when A and B are Not Seated Together:
Since the persons are seated around a circular table, we can fix one person (let's say person A) at any position. Now, we have 5 remaining persons to arrange, including person B. The number of ways to arrange these 5 persons is (5-1)! = 4!.
However, person B can be seated either to the left or right of A, resulting in two different arrangements. Therefore, the total number of ways when A and B are not seated together is 2 * 4! = 2 * 24 = 48.
5. Total Number of Ways:
Now, person A can be any one of the 6 persons. Therefore, the total number of ways is 6 * 48 = 288.
Again, this answer is incorrect as it does not match any of the given options.
Correct Answer:
After reevaluating the solution, it seems that the given options are incorrect or incomplete, as the correct answer is not among them. The actual correct answer for the number of ways in which 6 persons can be seated around a table so that two particular persons are never seated together is 48.
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Number of ways in which 6 persons can be seated around a table so that two particular persons ae never seated together is equal toa)480b)72c)120d)240Correct answer is option 'B'. Can you explain this answer?
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Number of ways in which 6 persons can be seated around a table so that two particular persons ae never seated together is equal toa)480b)72c)120d)240Correct answer is option 'B'. Can you explain this answer? for JEE 2025 is part of JEE preparation. The Question and answers have been prepared according to the JEE exam syllabus. Information about Number of ways in which 6 persons can be seated around a table so that two particular persons ae never seated together is equal toa)480b)72c)120d)240Correct answer is option 'B'. Can you explain this answer? covers all topics & solutions for JEE 2025 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Number of ways in which 6 persons can be seated around a table so that two particular persons ae never seated together is equal toa)480b)72c)120d)240Correct answer is option 'B'. Can you explain this answer?.
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