The random variable follows binomial distribution , for which the difference of the mean and the variance is . If , then is equal to
- A
- B
- C
- D
The random variable follows binomial distribution , for which the difference of the mean and the variance is . If , then is equal to
Correct answer:B
Standard Method
Given: follows binomial distribution . The difference between mean and variance is , and
Find: .
Using binomial probabilities,
So,
Cancelling common factors gives
Hence,
so
For a binomial distribution, mean and variance . Their difference is
Thus,
Substituting ,
Since is involved, we need . Therefore,
Then,
Now,
For ,
Therefore,
Hence,
Therefore, the correct option is B.
Answer Discrepancy in Source Solution
The solution states The Correct Option is D, but the worked calculation concludes
which matches option B. The algebra in the working supports B, so the final answer is taken as B.
Using the mean-variance condition as or any other incorrect simplification. Since mean and variance , their difference is . So the correct condition is .
Making an algebra mistake from . Expanding correctly gives , hence , not .
Accepting from the quadratic equation. This is invalid because the given relation contains , which requires at least trials. Therefore is the admissible value.
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