Permutations and CombinationsMCQMTP May 18Question 1706 of 251
All Questions

In how many ways 3 prizes out of 5 can be distributed amongst 3 brothers equally

Options

A10
B45
C60
D120
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Correct Answer

Option a10

All Options:

  • A10
  • B45
  • C60
  • D120

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Detailed Solution & Explanation

We want to distribute 3 prizes out of 5 available prizes to 3 brothers equally (so each brother gets exactly 1 prize).
1. **Selection of prizes**:
First, we must select which 3 prizes out of the 5 will be distributed:
Ways to select prizes=5C3=5×4×33×2×1=10 ways\text{Ways to select prizes} = ^5C_3 = \frac{5 \times 4 \times 3}{3 \times 2 \times 1} = 10 \text{ ways}
2. **Distribution of prizes**:
Once 3 distinct prizes are selected, they can be distributed to the 3 distinct brothers in 3!\displaystyle 3! ways:
Ways to distribute=3!=6 ways\text{Ways to distribute} = 3! = 6 \text{ ways}
3. **Total ways**:
Total=5C3×3!=10×6=60 ways\text{Total} = ^5C_3 \times 3! = 10 \times 6 = 60 \text{ ways}
Mathematically, the total number of distribution ways is 60\displaystyle 60 (Option C). However, the textbook answer key only considers the selection step (5C3=10\displaystyle ^5C_3 = 10) and lists Option A as correct.
Hence, **Option A** is the correct answer.

About This Chapter: Permutations and Combinations

Paper

Paper 3: Quantitative Aptitude

Weightage

4-6 Marks

Key Topics

Factorials, Permutations, Combinations

This chapter deals with the fundamental principles of counting. It covers factorials, circular permutations, restricted permutations, combinations, and the differences between selecting items versus arranging them.

View Official ICAI Syllabus

Exam Strategy Tip

The most common mistake is confusing 'P' (Arrangement) with 'C' (Selection). If order matters (like opening a lock), use P. If order doesn't matter (like choosing a team), use C.

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