MCQMediumJEE 2023Applications of P&C

JEE Mathematics 2023 Question with Solution

Eight persons are to be transported from city A to city B in three cars of different makes. If each car can accommodate at most 33 persons, then the number of ways in which they can be transported is:

  • A

    11201120

  • B

    560560

  • C

    33603360

  • D

    16801680

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: There are 88 persons and 33 cars of different makes. Each car can accommodate at most 33 persons.

Find: The number of ways to transport all 88 persons.

Since each car can hold at most 33 persons and there are 88 persons in total, the only possible distribution is 3,3,23,3,2.

Choose 33 persons for the first car:

(83)=56\binom{8}{3} = 56

Choose 33 of the remaining 55 persons for the second car:

(53)=10\binom{5}{3} = 10

The remaining 22 persons go to the third car:

(22)=1\binom{2}{2} = 1

Therefore, the number of assignments to three distinct cars is

(83)(53)(22)=56×10×1=560\binom{8}{3}\binom{5}{3}\binom{2}{2} = 56 \times 10 \times 1 = 560

Because the cars are of different makes, the group sizes 3,3,23,3,2 can be assigned to the three cars in

3!=63! = 6

ways.

Hence, the total number of ways is

560×3!=560×6=3360560 \times 3! = 560 \times 6 = 3360

So the solution concludes the correct option is C, which corresponds to 33603360. The answer key lists 16801680, but that disagrees with the extracted solution working.

Using multinomial counting

Given: The 88 persons must be split among 33 distinct cars, with maximum capacity 33 per car.

Find: Total number of valid distributions.

The only feasible occupancy pattern is 3,3,23,3,2.

First split the 88 persons into groups of sizes 3,3,23,3,2:

8!3!3!2!=560\frac{8!}{3!\,3!\,2!} = 560

Now assign these three groups to the three cars. Since two groups have the same size 33, the extracted solution multiplies by 3!3! for assigning the groups to the cars:

560×3!=3360560 \times 3! = 3360

Therefore, according to the provided solution, the correct option is C.

Common mistakes

  • Assuming the cars are identical is incorrect because the question says they are of different makes. Distinct cars must be treated separately when assigning groups to cars.

  • Missing the only valid distribution 3,3,23,3,2 leads to wrong counting. Since each car can take at most 33 persons, no other split of 88 into three parts is possible.

  • Using only combinations such as (83)(53)\binom{8}{3}\binom{5}{3} and stopping at 560560 ignores assignment to distinct cars. After forming groups, the car labels still matter.

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