MCQEasyJEE 2025Combinations (C(n,r))

JEE Mathematics 2025 Question with Solution

From all the English alphabets, five letters are chosen and are arranged in alphabetical order. The total number of ways, in which the middle letter is ‘M’, is :

  • A

    1495014950

  • B

    60846084

  • C

    43564356

  • D

    51485148

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: Five letters are chosen from the English alphabet and arranged in alphabetical order.

Find: The number of ways such that the middle letter is MM.

Since the letters are arranged in alphabetical order, MM must be the third letter. So we must choose:

  • two letters from AA to LL
  • two letters from NN to ZZ

There are 1212 letters before MM and 1313 letters after MM.

The number of ways to choose two letters before MM is

(122)=66\binom{12}{2} = 66

The number of ways to choose two letters after MM is

(132)=78\binom{13}{2} = 78

Since these choices are independent,

Total ways=(122)×(132)=66×78=5148\text{Total ways} = \binom{12}{2} \times \binom{13}{2} = 66 \times 78 = 5148

Therefore, the total number of ways is 51485148. The correct option is D.

Why arrangement is not needed

Given: Five letters are to be chosen and written in alphabetical order.

Find: The number of selections for which the middle letter is MM.

If MM is the middle letter, then exactly two selected letters must be smaller than MM and exactly two selected letters must be greater than MM.

Letters before MM are AA to LL, so there are 1212 such letters. Letters after MM are NN to ZZ, so there are 1313 such letters.

Choose the two smaller letters:

(122)\binom{12}{2}

Choose the two greater letters:

(132)\binom{13}{2}

Because the final arrangement is already fixed by alphabetical order, each valid choice of five letters gives exactly one arrangement. Thus,

(122)(132)=6678=5148\binom{12}{2} \cdot \binom{13}{2} = 66 \cdot 78 = 5148

Therefore, the required number of ways is 51485148, so the correct option is D.

Common mistakes

  • Choosing letters from all 2525 letters other than MM without separating those before and after MM. This is wrong because MM being the middle letter requires exactly two letters less than MM and two letters greater than MM. First split the alphabet into letters before and after MM, then choose from each group.

  • Multiplying by 5!5! or arranging the chosen letters again. This is wrong because the letters are already required to be in alphabetical order, so each valid set of five letters has only one allowed arrangement. Count only the selections, not extra permutations.

  • Taking the number of letters after MM as 1212 instead of 1313. This is wrong because the letters from NN to ZZ are 1313 in number. Count the letters on both sides of MM carefully before applying combinations.

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