ProbabilityMCQPYQ Sep 24Question 3294 of 187
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Two cards are drawn at random from a pack of 52 cards. The probability of getting either both the red cards or both Kings cards is:

Options

A0.4288\displaystyle 0.4288
B0.2488\displaystyle 0.2488
C0.8243\displaystyle 0.8243
D0.8428\displaystyle 0.8428
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Correct Answer

Option b0.2488\displaystyle 0.2488

All Options:

  • A0.4288\displaystyle 0.4288
  • B0.2488\displaystyle 0.2488
  • C0.8243\displaystyle 0.8243
  • D0.8428\displaystyle 0.8428

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Detailed Solution & Explanation

**Both Red Cards OR Both Kings** Total ways to choose 2 from 52: (522)=52×512=1326\binom{52}{2} = \frac{52 \times 51}{2} = 1326 **Both red cards:** 26 red cards in deck. (262)=26×252=325\binom{26}{2} = \frac{26 \times 25}{2} = 325 **Both kings:** 4 kings in deck. (42)=6\binom{4}{2} = 6 **Both red kings:** 2 red kings (King of Hearts, King of Diamonds). (22)=1\binom{2}{2} = 1 Using addition rule: Favorable=325+61=330\text{Favorable} = 325 + 6 - 1 = 330 P=3301326=552210.2489P = \frac{330}{1326} = \frac{55}{221} \approx 0.2489 Hence, **Option B** 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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