MCQMediumJEE 2024Applications of P&C

JEE Mathematics 2024 Question with Solution

The total number of words (with or without meaning) that can be formed out of the letters of the word 'DISTRIBUTION' taken four at a time is:

  • A

    37343734

  • B

    40004000

  • C

    35003500

  • D

    45004500

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The word DISTRIBUTION contains the letters: I,I,I,T,T,D,S,R,B,U,O,NI, I, I, T, T, D, S, R, B, U, O, N.

Find: The total number of distinct 44-letter words that can be formed.

Count arrangements by cases based on repetition.

  1. Case 1: Three letters the same and one different, (a,a,a,b)(a,a,a,b)
(41)×4!3!=32\binom{4}{1} \times \frac{4!}{3!} = 32
  1. Case 2: Two letters each repeated twice, (a,a,b,b)(a,a,b,b)
4!2!2!=6\frac{4!}{2! \cdot 2!} = 6
  1. Case 3: Two identical letters and two distinct ones, (a,b,c,c)(a,b,c,c)
(21)×(21)×4!2!=672\binom{2}{1} \times \binom{2}{1} \times \frac{4!}{2!} = 672
  1. Case 4: All letters different, (a,b,c,d)(a,b,c,d)
(41)×4!=3024\binom{4}{1} \times 4! = 3024

Adding all cases,

Total=3024+672+6+32=3734\text{Total} = 3024 + 672 + 6 + 32 = 3734

Therefore, the total number of words is 37343734. Hence, the correct option is A.

Casewise Counting

Given: The letters in the word DISTRIBUTION are I,I,I,T,T,D,S,R,B,U,O,NI, I, I, T, T, D, S, R, B, U, O, N.

Find: Number of distinct words of length 44.

The repeated letters are II occurring thrice and TT occurring twice. So possible repetition patterns for a 44-letter word are taken casewise.

  • Selection (a,a,a,b)(a,a,a,b):
(41)×4!3!=32\binom{4}{1} \times \frac{4!}{3!} = 32
  • Selection (a,a,b,b)(a,a,b,b):
4!2!2!=6\frac{4!}{2! \cdot 2!} = 6
  • Selection (a,b,c,c)(a,b,c,c):
(21)×(21)×4!2!=672\binom{2}{1} \times \binom{2}{1} \times \frac{4!}{2!} = 672
  • Selection (a,b,c,d)(a,b,c,d):
(41)×4!=3024\binom{4}{1} \times 4! = 3024

Now sum all these values:

Total=3024+672+6+32=3734\text{Total} = 3024 + 672 + 6 + 32 = 3734

So, the required number of words is 37343734.

Common mistakes

  • Counting all 44 letters as distinct and using only 12P4^{12}P_4 is incorrect, because the letters II and TT repeat. Repeated letters require casewise counting of distinct arrangements.

  • Ignoring the repetition pattern (a,a,a,b)(a,a,a,b) or (a,a,b,b)(a,a,b,b) leads to undercounting. All valid multiplicity cases must be included before adding the totals.

  • Using arrangement formulas without dividing by factorials of repeated letters is wrong. For patterns like (a,a,b,b)(a,a,b,b) or (a,b,c,c)(a,b,c,c), divide by 2!2! or 2!2!2!2! as required to avoid overcounting identical arrangements.

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