ProbabilityMCQMTP Nov 21Question 3382 of 187
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A bag contains 4\displaystyle 4 Red and 5\displaystyle 5 Black balls. Another bag contains 5\displaystyle 5 Red and 3\displaystyle 3 Black balls. If one ball is drawn at random each bag. Then the probability that one red and one black is

Options

A1272\displaystyle \frac{12}{72}
B2572\displaystyle \frac{25}{72}
C3772\displaystyle \frac{37}{72}
D1372\displaystyle \frac{13}{72}
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Correct Answer

Option c3772\displaystyle \frac{37}{72}

All Options:

  • A1272\displaystyle \frac{12}{72}
  • B2572\displaystyle \frac{25}{72}
  • C3772\displaystyle \frac{37}{72}
  • D1372\displaystyle \frac{13}{72}

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Detailed Solution & Explanation

**Probability of Drawing One Red and One Black Ball** Given: - Bag 1: 4 Red, 5 Black (Total = 9) P(R1)=49,P(B1)=59P(R_1) = \frac{4}{9}, \quad P(B_1) = \frac{5}{9} - Bag 2: 5 Red, 3 Black (Total = 8) P(R2)=58,P(B2)=38P(R_2) = \frac{5}{8}, \quad P(B_2) = \frac{3}{8} One ball is drawn from each bag. The event "one red and one black ball" can happen in two mutually exclusive ways: 1. Red from Bag 1 and Black from Bag 2: P(R1B2)=P(R1)×P(B2)=49×38=1272P(R_1 \cap B_2) = P(R_1) \times P(B_2) = \frac{4}{9} \times \frac{3}{8} = \frac{12}{72} 2. Black from Bag 1 and Red from Bag 2: P(B1R2)=P(B1)×P(R2)=59×58=2572P(B_1 \cap R_2) = P(B_1) \times P(R_2) = \frac{5}{9} \times \frac{5}{8} = \frac{25}{72} Total probability is: P=1272+2572=3772P = \frac{12}{72} + \frac{25}{72} = \frac{37}{72} Hence, **Option C** is the correct answer.

About This Chapter: Probability

Paper

Paper 3: Quantitative Aptitude

Weightage

5-7 Marks

Key Topics

Probability Operations, Expected Value

A logic-heavy chapter dealing with random experiments, events (mutually exclusive, exhaustive), set theory probability, conditional probability, and Bayes' Theorem. It forms the basis for Theoretical Distributions.

View Official ICAI Syllabus

Exam Strategy Tip

Always draw a quick Venn Diagram or tree when faced with 'At least one' or 'Only A but not B' wording. It saves you from double-counting.

Key Concepts to Understand

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