If an unbiased die, marked with on its faces, is thrown five times, then the probability that the product of the outcomes is positive, is:
- A
- B
- C
- D
If an unbiased die, marked with on its faces, is thrown five times, then the probability that the product of the outcomes is positive, is:
Correct answer:D
Standard Method
Given: The die has faces and it is thrown times.
Find: The probability that the product of the five outcomes is positive.
From the solution, the product is counted as positive when the number of negative outcomes is even and no outcome is .
There are positive faces and negative faces, so
The approach shown on the page adds the cases with an even number of negative outcomes:
Now evaluate each term:
So,
Therefore, the probability is . The solution explicitly marks the correct option as D, even though this value appears as option B in the listed options. the answer is recorded as D.
Casewise Counting
Given: Positive faces are and negative faces are . The face makes the product zero, so it is excluded in favorable cases.
Find: Probability that the product is positive after throws.
The product is positive when the number of negative outcomes is even. For throws, the possible even counts are .
Adding,
Hence the required probability is .
Ignoring the case when an outcome is . If any one throw gives , the product becomes , not positive. Exclude such outcomes from favorable cases.
Considering only the case when all outcomes are positive. A product can also be positive when the number of negative outcomes is even, such as or negatives in throws.
Using only the cases with or negatives and forgetting the case with negatives. For five throws, all even counts of negatives must be checked.
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