MCQEasyJEE 2023Probability Basics

JEE Mathematics 2023 Question with Solution

Three dice are rolled. If the probability of getting different numbers on the three dice is pq\frac{p}{q}, where pp and qq are co-prime, then qpq - p is equal to:

  • A

    11

  • B

    22

  • C

    44

  • D

    33

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: Three dice are rolled, and the probability of getting different numbers on the three dice is pq\frac{p}{q}, where pp and qq are co-prime.

Find: The value of qpq-p.

The number of favorable outcomes where the three dice show different numbers is:

(63)×3!=20×6=120\binom{6}{3} \times 3! = 20 \times 6 = 120

The total number of possible outcomes when rolling three dice is:

6×6×6=2166 \times 6 \times 6 = 216

Thus, the probability is:

P=120216=59P = \frac{120}{216} = \frac{5}{9}

So, p=5p = 5 and q=9q = 9, and

qp=95=4q-p = 9-5 = 4

Therefore, the correct option is C.

Common mistakes

  • Counting favorable outcomes as only (63)\binom{6}{3} is incorrect because the three selected numbers can be arranged among the three dice in 3!3! ways. Multiply by 3!3! to account for order.

  • Using 636^3 for favorable outcomes is wrong because that counts all outcomes, including repeated numbers. Use 636^3 only for the total sample space, not for distinct-number outcomes.

  • Forgetting to reduce 120216\frac{120}{216} to lowest terms leads to wrong values of pp and qq. Since pp and qq must be co-prime, simplify the fraction first to get 59\frac{5}{9}.

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