Let N denote the sum of the numbers obtained when two dice are rolled. If the probability that is , where m and n are coprime, then is equal to:
- A
- B
- C
- D
Let N denote the sum of the numbers obtained when two dice are rolled. If the probability that is , where m and n are coprime, then is equal to:
Correct answer:B
Standard Method
Given: N denotes the sum obtained when two dice are rolled.
Find: The value of , where the probability of is .
We are given that is satisfied for . So the required probability is
For :
Therefore,
Using the complement rule,
Hence,
Now,
Therefore, the correct option is B.
Assuming must be checked separately for every sum without noticing the threshold . This makes the counting longer than necessary. First identify from the inequality when it becomes true, then count sums accordingly.
Forgetting that the smallest possible sum of two dice is , not . Counting as a possible case gives an incorrect probability. Always list the actual range of sums before counting outcomes.
Using the number of favorable sums instead of the number of favorable outcomes. Different sums do not have equal probability for two dice. Count ordered pairs such as and separately.
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